(* (c) Copyright 2006-2016 Microsoft Corporation and Inria.                  *)
(* Distributed under the terms of CeCILL-B.                                  *)
From mathcomp Require Import ssreflect ssrbool ssrfun eqtype ssrnat seq choice.
From mathcomp Require Import fintype finfun bigop finset fingroup perm order.
From mathcomp Require Import div prime binomial ssralg finalg zmodp matrix.

(*****************************************************************************)
(* In this file we develop the rank and row space theory of matrices, based  *)
(* on an extended Gaussian elimination procedure similar to LUP              *)
(* decomposition. This provides us with a concrete but generic model of      *)
(* finite dimensional vector spaces and F-algebras, in which vectors, linear *)
(* functions, families, bases, subspaces, ideals and subrings are all        *)
(* represented using matrices. This model can be used as a foundation for    *)
(* the usual theory of abstract linear algebra, but it can also be used to   *)
(* develop directly substantial theories, such as the theory of finite group *)
(* linear representation.                                                    *)
(*   Here we define the following concepts and notations:                    *)
(* Gaussian_elimination A == a permuted triangular decomposition (L, U, r)   *)
(*                   of A, with L a column permutation of a lower triangular *)
(*                   invertible matrix, U a row permutation of an upper      *)
(*                   triangular invertible matrix, and r the rank of A, all  *)
(*                   satisfying the identity L *m pid_mx r *m U = A.         *)
(*        \rank A == the rank of A.                                          *)
(*    row_free A <=> the rows of A are linearly free (i.e., the rank and     *)
(*                   height of A are equal).                                 *)
(*    row_full A <=> the row-space of A spans all row-vectors (i.e., the     *)
(*                   rank and width of A are equal).                         *)
(*    col_ebase A == the extended column basis of A (the first matrix L      *)
(*                   returned by Gaussian_elimination A).                    *)
(*    row_ebase A == the extended row base of A (the second matrix U         *)
(*                   returned by Gaussian_elimination A).                    *)
(*     col_base A == a basis for the columns of A: a row-full matrix         *)
(*                   consisting of the first \rank A columns of col_ebase A. *)
(*     row_base A == a basis for the rows of A: a row-free matrix consisting *)
(*                   of the first \rank A rows of row_ebase A.               *)
(*       pinvmx A == a partial inverse for A in its row space (or on its     *)
(*                   column space, equivalently). In particular, if u is a   *)
(*                   row vector in the row_space of A, then u *m pinvmx A is *)
(*                   the row vector of the coefficients of a decomposition   *)
(*                   of u as a sub of rows of A.                             *)
(*        kermx A == the row kernel of A : a square matrix whose row space   *)
(*                   consists of all u such that u *m A = 0 (it consists of  *)
(*                   the inverse of col_ebase A, with the top \rank A rows   *)
(*                   zeroed out). Also, kermx A is a partial right inverse   *)
(*                   to col_ebase A, in the row space anihilated by A.       *)
(*      cokermx A == the cokernel of A : a square matrix whose column space  *)
(*                   consists of all v such that A *m v = 0 (it consists of  *)
(*                   the inverse of row_ebase A, with the leftmost \rank A   *)
(*                   columns zeroed out).                                    *)
(*   maxrankfun A == injective function f so that rowsub f A is a submatrix  *)
(*                   of A with the same rank as A.                           *)
(* fullrankfun fA == injective function f so that rowsub f A is row full,    *)
(*                   where fA is a proof of row_full A                       *)
(* eigenvalue g a <=> a is an eigenvalue of the square matrix g.             *)
(* eigenspace g a == a square matrix whose row space is the eigenspace of    *)
(*                   the eigenvalue a of g (or 0 if a is not an eigenvalue). *)
(* We use a different scope %MS for matrix row-space set-like operations; to *)
(* avoid confusion, this scope should not be opened globally. Note that the  *)
(* the arguments of \rank _ and the operations below have default scope %MS. *)
(*    (A <= B)%MS <=> the row-space of A is included in the row-space of B.  *)
(*                   We test for this by testing if cokermx B anihilates A.  *)
(*     (A < B)%MS <=> the row-space of A is properly included in the         *)
(*                   row-space of B.                                         *)
(*  (A <= B <= C)%MS == (A <= B)%MS && (B <= C)%MS, and similarly for        *)
(*                   (A < B <= C)%MS, (A < B <= C)%MS and (A < B < C)%MS.    *)
(*    (A == B)%MS == (A <= B <= A)%MS (A and B have the same row-space).     *)
(*   (A :=: B)%MS == A and B behave identically wrt. \rank and <=. This      *)
(*                   triple rewrite rule is the Prop version of (A == B)%MS. *)
(*                   Note that :=: cannot be treated as a setoid-style       *)
(*                   Equivalence because its arguments can have different    *)
(*                   types: A and B need not have the same number of rows,   *)
(*                   and often don't (e.g., in row_base A :=: A).            *)
(*       <<A>>%MS == a square matrix with the same row-space as A; <<A>>%MS  *)
(*                   is a canonical representation of the subspace generated *)
(*                   by A, viewed as a list of row-vectors: if (A == B)%MS,  *)
(*                   then <<A>>%MS = <<B>>%MS.                               *)
(*     (A + B)%MS == a square matrix whose row-space is the sum of the       *)
(*                   row-spaces of A and B; thus (A + B == col_mx A B)%MS.   *)
(*  (\sum_i <expr i>)%MS == the "big" version of (_ + _)%MS; as the latter   *)
(*                   has a canonical abelian monoid structure, most generic  *)
(*                   bigop lemmas apply (the other bigop indexing notations  *)
(*                   are also defined).                                      *)
(*   (A :&: B)%MS == a square matrix whose row-space is the intersection of  *)
(*                   the row-spaces of A and B.                              *)
(*  (\bigcap_i <expr i>)%MS == the "big" version of (_ :&: _)%MS, which also *)
(*                   has a canonical abelian monoid structure.               *)
(*         A^C%MS == a square matrix whose row-space is a complement to the  *)
(*                   the row-space of A (it consists of row_ebase A with the *)
(*                   top \rank A rows zeroed out).                           *)
(*   (A :\: B)%MS == a square matrix whose row-space is a complement of the  *)
(*                   the row-space of (A :&: B)%MS in the row-space of A.    *)
(*                   We have (A :\: B := A :&: (capmx_gen A B)^C)%MS, where  *)
(*                   capmx_gen A B is a rectangular matrix equivalent to     *)
(*                   (A :&: B)%MS, i.e., (capmx_gen A B == A :&: B)%MS.      *)
(*    proj_mx A B == a square matrix that projects (A + B)%MS onto A         *)
(*                   parallel to B, when (A :&: B)%MS = 0 (A and B must also *)
(*                   be square).                                             *)
(*     mxdirect S == the sum expression S is a direct sum. This is a NON     *)
(*                   EXTENSIONAL notation: the exact boolean expression is   *)
(*                   inferred from the syntactic form of S (expanding        *)
(*                   definitions, however); both (\sum_(i | _) _)%MS and     *)
(*                   (_ + _)%MS sums are recognized. This construct uses a   *)
(*                   variant of the reflexive ("quote") canonical structure, *)
(*                   mxsum_expr. The structure also recognizes sums of       *)
(*                   matrix ranks, so that lemmas concerning the rank of     *)
(*                   direct sums can be used bidirectionally.                *)
(* stablemx V f <=> the matrix f represents an endomorphism that preserves V *)
(*               := (V *m f <= V)%MS                                         *)
(* The next set of definitions let us represent F-algebras using matrices:   *)
(*   'A[F]_(m, n) == the type of matrices encoding (sub)algebras of square   *)
(*                   n x n matrices, via mxvec; as in the matrix type        *)
(*                   notation, m and F can be omitted (m defaults to n ^ 2). *)
(*                := 'M[F]_(m, n ^ 2).                                       *)
(*   (A \in R)%MS <=> the square matrix A belongs to the linear set of       *)
(*                    matrices (most often, a sub-algebra) encoded by the    *)
(*                    row space of R. This is simply notation, so all the    *)
(*                    lemmas and rewrite rules for (_ <= _)%MS can apply.    *)
(*                := (mxvec A <= R)%MS.                                      *)
(*     (R * S)%MS == a square n^2 x n^2 matrix whose row-space encodes the   *)
(*                   linear set of n x n matrices generated by the pointwise *)
(*                   product of the sets of matrices encoded by R and S.     *)
(*       'C(R)%MS == a square matric encoding the centraliser of the set of  *)
(*                   square matrices encoded by R.                           *)
(*     'C_S(R)%MS := (S :&: 'C(R))%MS (the centraliser of R in S).           *)
(*       'Z(R)%MS == the center of R (i.e., 'C_R(R)%MS).                     *)
(*  left_mx_ideal R S <=> S is a left ideal for R (R * S <= S)%MS.           *)
(* right_mx_ideal R S <=> S is a right ideal for R (S * R <= S)%MS.          *)
(*       mx_ideal R S <=> S is a bilateral ideal for R.                      *)
(*      mxring_id R e <-> e is an identity element for R (Prop predicate).   *)
(*    has_mxring_id R <=> R has a nonzero identity element (bool predicate). *)
(*           mxring R <=> R encodes a nontrivial subring.                    *)
(*****************************************************************************)

Set Implicit Arguments.
Unset Strict Implicit.
Unset Printing Implicit Defensive.

Declare Scope matrix_set_scope.

Import GroupScope.
Import GRing.Theory.
Local Open Scope ring_scope.

Reserved Notation "\rank A" (at level 10, A at level 8, format "\rank  A").
Reserved Notation "A ^C"    (at level 8, format "A ^C").

Notation "''A_' ( m , n )" := 'M_(m, n ^ 2)
  (at level 8, format "''A_' ( m ,  n )") : type_scope.

Notation "''A_' ( n )" := 'A_(n ^ 2, n)
  (at level 8, only parsing) : type_scope.

Notation "''A_' n" := 'A_(n)
  (at level 8, n at next level, format "''A_' n") : type_scope.

Notation "''A' [ F ]_ ( m , n )" := 'M[F]_(m, n ^ 2)
  (at level 8, only parsing) : type_scope.

Notation "''A' [ F ]_ ( n )" := 'A[F]_(n ^ 2, n)
  (at level 8, only parsing) : type_scope.

Notation "''A' [ F ]_ n" := 'A[F]_(n)
  (at level 8, n at level 2, only parsing) : type_scope.

Delimit Scope matrix_set_scope with MS.

Local Notation simp := (Monoid.Theory.simpm, oppr0).

(*****************************************************************************)
(******************** Rank and row-space theory ******************************)
(*****************************************************************************)

Section RowSpaceTheory.

Variable F : fieldType.
Implicit Types m n p r : nat.

Local Notation "''M_' ( m , n )" := 'M[F]_(m, n) : type_scope.
Local Notation "''M_' n" := 'M[F]_(n, n) : type_scope.

(* Decomposition with double pivoting; computes the rank, row and column  *)
(* images, kernels, and complements of a matrix.                          *)

Fixpoint Gaussian_elimination {m n} : 'M_(m, n) -> 'M_m * 'M_n * nat :=
  match m, n with
  | _.+1, _.+1 => fun A : 'M_(1 + _, 1 + _) =>
    if [pick ij | A ij.1 ij.2 != 0] is Some (i, j) then
      let a := A i j in let A1 := xrow i 0 (xcol j 0 A) in
      let u := ursubmx A1 in let v := a^-1 *: dlsubmx A1 in
      let: (L, U, r) := Gaussian_elimination (drsubmx A1 - v *m u) in
      (xrow i 0 (block_mx 1 0 v L), xcol j 0 (block_mx a%:M u 0 U), r.+1)
    else (1%:M, 1%:M, 0%N)
  | _, _ => fun _ => (1%:M, 1%:M, 0%N)
  end.

Section Defs.

Variables (m n : nat) (A : 'M_(m, n)).

Fact Gaussian_elimination_key : unit. Proof. by []. Qed.

Let LUr := locked_with Gaussian_elimination_key (@Gaussian_elimination) m n A.

Definition col_ebase := LUr.1.1.
Definition row_ebase := LUr.1.2.
Definition mxrank := if [|| m == 0 | n == 0]%N then 0%N else LUr.2.

Definition row_free := mxrank == m.
Definition row_full := mxrank == n.

Definition row_base : 'M_(mxrank, n) := pid_mx mxrank *m row_ebase.
Definition col_base : 'M_(m, mxrank) := col_ebase *m pid_mx mxrank.

Definition complmx : 'M_n := copid_mx mxrank *m row_ebase.
Definition kermx : 'M_m := copid_mx mxrank *m invmx col_ebase.
Definition cokermx : 'M_n := invmx row_ebase *m copid_mx mxrank.

Definition pinvmx : 'M_(n, m) :=
  invmx row_ebase *m pid_mx mxrank *m invmx col_ebase.

End Defs.

Arguments mxrank {m%N n%N} A%MS.
Local Notation "\rank A" := (mxrank A) : nat_scope.
Arguments complmx {m%N n%N} A%MS.
Local Notation "A ^C" := (complmx A) : matrix_set_scope.

Definition submx_def := idfun (fun m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) =>
  A *m cokermx B == 0).
Fact submx_key : unit. Proof. by []. Qed.
Definition submx := locked_with submx_key submx_def.
Canonical submx_unlockable := [unlockable fun submx].

Arguments submx {m1%N m2%N n%N} A%MS B%MS : rename.
Local Notation "A <= B" := (submx A B) : matrix_set_scope.
Local Notation "A <= B <= C" := ((A <= B) && (B <= C))%MS : matrix_set_scope.
Local Notation "A == B" := (A <= B <= A)%MS : matrix_set_scope.

Definition ltmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :=
  (A <= B)%MS && ~~ (B <= A)%MS.
Arguments ltmx {m1%N m2%N n%N} A%MS B%MS.
Local Notation "A < B" := (ltmx A B) : matrix_set_scope.

Definition eqmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :=
  prod (\rank A = \rank B)
       (forall m3 (C : 'M_(m3, n)),
            ((A <= C) = (B <= C)) * ((C <= A) = (C <= B)))%MS.
Arguments eqmx {m1%N m2%N n%N} A%MS B%MS.
Local Notation "A :=: B" := (eqmx A B) : matrix_set_scope.

Notation stablemx V f := (V%MS *m f%R <= V%MS)%MS.

Section LtmxIdentities.

Variables (m1 m2 n : nat) (A : 'M_(m1, n)) (B : 'M_(m2, n)).

Lemma ltmxE : (A < B)%MS = ((A <= B)%MS && ~~ (B <= A)%MS). Proof. by []. Qed.

Lemma ltmxW : (A < B)%MS -> (A <= B)%MS. Proof. by case/andP. Qed.

Lemma ltmxEneq : (A < B)%MS = (A <= B)%MS && ~~ (A == B)%MS.
Proof. by apply: andb_id2l => ->. Qed.

Lemma submxElt : (A <= B)%MS = (A == B)%MS || (A < B)%MS.
Proof. by rewrite -andb_orr orbN andbT. Qed.

End LtmxIdentities.

(* The definition of the row-space operator is rigged to return the identity  *)
(* matrix for full matrices. To allow for further tweaks that will make the   *)
(* row-space intersection operator strictly commutative and monoidal, we      *)
(* slightly generalize some auxiliary definitions: we parametrize the         *)
(* "equivalent subspace and identity" choice predicate equivmx by a boolean   *)
(* determining whether the matrix should be the identity (so for genmx A its  *)
(* value is row_full A), and introduce a "quasi-identity" predicate qidmx     *)
(* that selects non-square full matrices along with the identity matrix 1%:M  *)
(* (this does not affect genmx, which chooses a square matrix).               *)
(*   The choice witness for genmx A is either 1%:M for a row-full A, or else  *)
(* row_base A padded with null rows.                                          *)
Let qidmx m n (A : 'M_(m, n)) :=
  if m == n then A == pid_mx n else row_full A.
Let equivmx m n (A : 'M_(m, n)) idA (B : 'M_n) :=
  (B == A)%MS && (qidmx B == idA).
Let equivmx_spec m n (A : 'M_(m, n)) idA (B : 'M_n) :=
  prod (B :=: A)%MS (qidmx B = idA).
Definition genmx_witness m n (A : 'M_(m, n)) : 'M_n :=
  if row_full A then 1%:M else pid_mx (\rank A) *m row_ebase A.
Definition genmx_def := idfun (fun m n (A : 'M_(m, n)) =>
   choose (equivmx A (row_full A)) (genmx_witness A) : 'M_n).
Fact genmx_key : unit. Proof. by []. Qed.
Definition genmx := locked_with genmx_key genmx_def.
Canonical genmx_unlockable := [unlockable fun genmx].
Local Notation "<< A >>" := (genmx A) : matrix_set_scope.

(* The setwise sum is tweaked so that 0 is a strict identity element for      *)
(* square matrices, because this lets us use the bigop component. As a result *)
(* setwise sum is not quite strictly extensional.                             *)
Let addsmx_nop m n (A : 'M_(m, n)) := conform_mx <<A>>%MS A.
Definition addsmx_def := idfun (fun m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) =>
  if A == 0 then addsmx_nop B else if B == 0 then addsmx_nop A else
  <<col_mx A B>>%MS : 'M_n).
Fact addsmx_key : unit. Proof. by []. Qed.
Definition addsmx := locked_with addsmx_key addsmx_def.
Canonical addsmx_unlockable := [unlockable fun addsmx].
Arguments addsmx {m1%N m2%N n%N} A%MS B%MS : rename.
Local Notation "A + B" := (addsmx A B) : matrix_set_scope.
Local Notation "\sum_ ( i | P ) B" := (\big[addsmx/0]_(i | P) B%MS)
  : matrix_set_scope.
Local Notation "\sum_ ( i <- r | P ) B" := (\big[addsmx/0]_(i <- r | P) B%MS)
  : matrix_set_scope.

(* The set intersection is similarly biased so that the identity matrix is a  *)
(* strict identity. This is somewhat more delicate than for the sum, because  *)
(* the test for the identity is non-extensional. This forces us to actually   *)
(* bias the choice operator so that it does not accidentally map an           *)
(* intersection of non-identity matrices to 1%:M; this would spoil            *)
(* associativity: if B :&: C = 1%:M but B and C are not identity, then for a  *)
(* square matrix A we have A :&: (B :&: C) = A != (A :&: B) :&: C in general. *)
(* To complicate matters there may not be a square non-singular matrix        *)
(* different than 1%:M, since we could be dealing with 'M['F_2]_1. We         *)
(* sidestep the issue by making all non-square row-full matrices identities,  *)
(* and choosing a normal representative that preserves the qidmx property.    *)
(* Thus A :&: B = 1%:M iff A and B are both identities, and this suffices for *)
(* showing that associativity is strict.                                      *)
Let capmx_witness m n (A : 'M_(m, n)) :=
  if row_full A then conform_mx 1%:M A else <<A>>%MS.
Let capmx_norm m n (A : 'M_(m, n)) :=
  choose (equivmx A (qidmx A)) (capmx_witness A).
Let capmx_nop m n (A : 'M_(m, n)) := conform_mx (capmx_norm A) A.
Definition capmx_gen m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :=
  lsubmx (kermx (col_mx A B)) *m A.
Definition capmx_def := idfun (fun m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) =>
  if qidmx A then capmx_nop B else
  if qidmx B then capmx_nop A else
  if row_full B then capmx_norm A else capmx_norm (capmx_gen A B) : 'M_n).
Fact capmx_key : unit. Proof. by []. Qed.
Definition capmx := locked_with capmx_key capmx_def.
Canonical capmx_unlockable := [unlockable fun capmx].
Arguments capmx {m1%N m2%N n%N} A%MS B%MS : rename.
Local Notation "A :&: B" := (capmx A B) : matrix_set_scope.
Local Notation "\bigcap_ ( i | P ) B" := (\big[capmx/1%:M]_(i | P) B)
  : matrix_set_scope.

Definition diffmx_def := idfun (fun m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) =>
  <<capmx_gen A (capmx_gen A B)^C>>%MS : 'M_n).
Fact diffmx_key : unit. Proof. by []. Qed.
Definition diffmx := locked_with diffmx_key diffmx_def.
Canonical diffmx_unlockable := [unlockable fun diffmx].
Arguments diffmx {m1%N m2%N n%N} A%MS B%MS : rename.
Local Notation "A :\: B" := (diffmx A B) : matrix_set_scope.

Definition proj_mx n (U V : 'M_n) : 'M_n := pinvmx (col_mx U V) *m col_mx U 0.

Local Notation GaussE := Gaussian_elimination.

Fact mxrankE m n (A : 'M_(m, n)) : \rank A = (GaussE A).2.
Proof. by rewrite /mxrank unlock /=; case: m n A => [|m] [|n]. Qed.

Lemma rank_leq_row m n (A : 'M_(m, n)) : \rank A <= m.
Proof.
rewrite mxrankE.
elim: m n A => [|m IHm] [|n] //= A; case: pickP => [[i j] _|] //=.
by move: (_ - _) => B; case: GaussE (IHm _ B) => [[L U] r] /=.
Qed.

Lemma row_leq_rank m n (A : 'M_(m, n)) : (m <= \rank A) = row_free A.
Proof. by rewrite /row_free eqn_leq rank_leq_row. Qed.

Lemma rank_leq_col m n (A : 'M_(m, n)) : \rank A <= n.
Proof.
rewrite mxrankE.
elim: m n A => [|m IHm] [|n] //= A; case: pickP => [[i j] _|] //=.
by move: (_ - _) => B; case: GaussE (IHm _ B) => [[L U] r] /=.
Qed.

Lemma col_leq_rank m n (A : 'M_(m, n)) : (n <= \rank A) = row_full A.
Proof. by rewrite /row_full eqn_leq rank_leq_col. Qed.

Lemma eq_row_full m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :=: B)%MS -> row_full A = row_full B.
Proof. by rewrite /row_full => ->. Qed.

Let unitmx1F := @unitmx1 F.
Lemma row_ebase_unit m n (A : 'M_(m, n)) : row_ebase A \in unitmx.
Proof.
rewrite /row_ebase unlock; elim: m n A => [|m IHm] [|n] //= A.
case: pickP => [[i j] /= nzAij | //=]; move: (_ - _) => B.
case: GaussE (IHm _ B) => [[L U] r] /= uU.
rewrite unitmxE xcolE det_mulmx (@det_ublock _ 1) det_scalar1 !unitrM.
by rewrite unitfE nzAij -!unitmxE uU unitmx_perm.
Qed.

Lemma col_ebase_unit m n (A : 'M_(m, n)) : col_ebase A \in unitmx.
Proof.
rewrite /col_ebase unlock; elim: m n A => [|m IHm] [|n] //= A.
case: pickP => [[i j] _|] //=; move: (_ - _) => B.
case: GaussE (IHm _ B) => [[L U] r] /= uL.
rewrite unitmxE xrowE det_mulmx (@det_lblock _ 1) det1 mul1r unitrM.
by rewrite -unitmxE unitmx_perm.
Qed.
Hint Resolve rank_leq_row rank_leq_col row_ebase_unit col_ebase_unit : core.

Lemma mulmx_ebase m n (A : 'M_(m, n)) :
  col_ebase A *m pid_mx (\rank A) *m row_ebase A = A.
Proof.
rewrite mxrankE /col_ebase /row_ebase unlock.
elim: m n A => [n A | m IHm]; first by rewrite [A]flatmx0 [_ *m _]flatmx0.
case=> [A | n]; first by rewrite [_ *m _]thinmx0 [A]thinmx0.
rewrite -(add1n m) -?(add1n n) => A /=.
case: pickP => [[i0 j0] | A0] /=; last first.
  apply/matrixP=> i j; rewrite pid_mx_0 mulmx0 mul0mx mxE.
  by move/eqP: (A0 (i, j)).
set a := A i0 j0 => nz_a; set A1 := xrow _ _ _.
set u := ursubmx _; set v := _ *: _; set B : 'M_(m, n) := _ - _.
move: (rank_leq_col B) (rank_leq_row B) {IHm}(IHm n B); rewrite mxrankE.
case: (GaussE B) => [[L U] r] /= r_m r_n defB.
have ->: pid_mx (1 + r) = block_mx 1 0 0 (pid_mx r) :> 'M[F]_(1 + m, 1 + n).
  rewrite -(subnKC r_m) -(subnKC r_n) pid_mx_block -col_mx0 -row_mx0.
  by rewrite block_mxA castmx_id col_mx0 row_mx0 -scalar_mx_block -pid_mx_block.
rewrite xcolE xrowE mulmxA -xcolE -!mulmxA.
rewrite !(addr0, add0r, mulmx0, mul0mx, mulmx_block, mul1mx) mulmxA defB.
rewrite addrC subrK mul_mx_scalar scalerA divff // scale1r.
have ->: a%:M = ulsubmx A1 by rewrite [_ A1]mx11_scalar !mxE !lshift0 !tpermR.
rewrite submxK /A1 xrowE !xcolE -!mulmxA mulmxA -!perm_mxM !tperm2 !perm_mx1.
by rewrite mulmx1 mul1mx.
Qed.

Lemma mulmx_base m n (A : 'M_(m, n)) : col_base A *m row_base A = A.
Proof. by rewrite mulmxA -[col_base A *m _]mulmxA pid_mx_id ?mulmx_ebase. Qed.

Lemma mulmx1_min_rank r m n (A : 'M_(m, n)) M N :
  M *m A *m N = 1%:M :> 'M_r -> r <= \rank A.
Proof. by rewrite -{1}(mulmx_base A) mulmxA -mulmxA; move/mulmx1_min. Qed.
Arguments mulmx1_min_rank [r m n A].

Lemma mulmx_max_rank r m n (M : 'M_(m, r)) (N : 'M_(r, n)) :
  \rank (M *m N) <= r.
Proof.
set MN := M *m N; set rMN := \rank _.
pose L : 'M_(rMN, m) := pid_mx rMN *m invmx (col_ebase MN).
pose U : 'M_(n, rMN) := invmx (row_ebase MN) *m pid_mx rMN.
suffices: L *m M *m (N *m U) = 1%:M by apply: mulmx1_min.
rewrite mulmxA -(mulmxA L) -[M *m N]mulmx_ebase -/MN.
by rewrite !mulmxA mulmxKV // mulmxK // !pid_mx_id /rMN ?pid_mx_1.
Qed.
Arguments mulmx_max_rank [r m n].

Lemma mxrank_tr m n (A : 'M_(m, n)) : \rank A^T = \rank A.
Proof.
apply/eqP; rewrite eqn_leq -{3}[A]trmxK -{1}(mulmx_base A) -{1}(mulmx_base A^T).
by rewrite !trmx_mul !mulmx_max_rank.
Qed.

Lemma mxrank_add m n (A B : 'M_(m, n)) : \rank (A + B)%R <= \rank A + \rank B.
Proof.
by rewrite -{1}(mulmx_base A) -{1}(mulmx_base B) -mul_row_col mulmx_max_rank.
Qed.

Lemma mxrankM_maxl m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  \rank (A *m B) <= \rank A.
Proof. by rewrite -{1}(mulmx_base A) -mulmxA mulmx_max_rank. Qed.

Lemma mxrankM_maxr m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  \rank (A *m B) <= \rank B.
Proof. by rewrite -mxrank_tr -(mxrank_tr B) trmx_mul mxrankM_maxl. Qed.

Lemma mxrank_scale m n a (A : 'M_(m, n)) : \rank (a *: A) <= \rank A.
Proof. by rewrite -mul_scalar_mx mxrankM_maxr. Qed.

Lemma mxrank_scale_nz m n a (A : 'M_(m, n)) :
   a != 0 -> \rank (a *: A) = \rank A.
Proof.
move=> nza; apply/eqP; rewrite eqn_leq -{3}[A]scale1r -(mulVf nza).
by rewrite -scalerA !mxrank_scale.
Qed.

Lemma mxrank_opp m n (A : 'M_(m, n)) : \rank (- A) = \rank A.
Proof. by rewrite -scaleN1r mxrank_scale_nz // oppr_eq0 oner_eq0. Qed.

Lemma mxrank0 m n : \rank (0 : 'M_(m, n)) = 0%N.
Proof. by apply/eqP; rewrite -leqn0 -(@mulmx0 _ m 0 n 0) mulmx_max_rank. Qed.

Lemma mxrank_eq0 m n (A : 'M_(m, n)) : (\rank A == 0%N) = (A == 0).
Proof.
apply/eqP/eqP=> [rA0 | ->{A}]; last exact: mxrank0.
move: (col_base A) (row_base A) (mulmx_base A); rewrite rA0 => Ac Ar <-.
by rewrite [Ac]thinmx0 mul0mx.
Qed.

Lemma mulmx_coker m n (A : 'M_(m, n)) : A *m cokermx A = 0.
Proof.
by rewrite -{1}[A]mulmx_ebase -!mulmxA mulKVmx // mul_pid_mx_copid ?mulmx0.
Qed.

Lemma submxE m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS = (A *m cokermx B == 0).
Proof. by rewrite unlock. Qed.

Lemma mulmxKpV m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS -> A *m pinvmx B *m B = A.
Proof.
rewrite submxE !mulmxA mulmxBr mulmx1 subr_eq0 => /eqP defA.
rewrite -{4}[B]mulmx_ebase -!mulmxA mulKmx //.
by rewrite (mulmxA (pid_mx _)) pid_mx_id // !mulmxA -{}defA mulmxKV.
Qed.

Lemma mulmxVp m n (A : 'M[F]_(m, n)) : row_free A -> A *m pinvmx A = 1%:M.
Proof.
move=> fA; rewrite -[X in X *m _]mulmx_ebase !mulmxA mulmxK ?row_ebase_unit//.
rewrite -[X in X *m _]mulmxA mul_pid_mx !minnn (minn_idPr _) ?rank_leq_col//.
by rewrite (eqP fA) pid_mx_1 mulmx1 mulmxV ?col_ebase_unit.
Qed.

Lemma mulmxKp p m n (B : 'M[F]_(m, n)) : row_free B ->
  cancel ((@mulmx _ p _ _)^~ B) (mulmx^~ (pinvmx B)).
Proof. by move=> ? A; rewrite -mulmxA mulmxVp ?mulmx1. Qed.

Lemma submxP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (exists D, A = D *m B) (A <= B)%MS.
Proof.
apply: (iffP idP) => [/mulmxKpV | [D ->]]; first by exists (A *m pinvmx B).
by rewrite submxE -mulmxA mulmx_coker mulmx0.
Qed.
Arguments submxP {m1 m2 n A B}.

Lemma submx_refl m n (A : 'M_(m, n)) : (A <= A)%MS.
Proof. by rewrite submxE mulmx_coker. Qed.
Hint Resolve submx_refl : core.

Lemma submxMl m n p (D : 'M_(m, n)) (A : 'M_(n, p)) : (D *m A <= A)%MS.
Proof. by rewrite submxE -mulmxA mulmx_coker mulmx0. Qed.

Lemma submxMr m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  (A <= B)%MS -> (A *m C <= B *m C)%MS.
Proof. by case/submxP=> D ->; rewrite -mulmxA submxMl. Qed.

Lemma mulmx_sub m n1 n2 p (C : 'M_(m, n1)) A (B : 'M_(n2, p)) :
  (A <= B -> C *m A <= B)%MS.
Proof. by case/submxP=> D ->; rewrite mulmxA submxMl. Qed.

Lemma submx_trans m1 m2 m3 n
                 (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A <= B -> B <= C -> A <= C)%MS.
Proof. by case/submxP=> D ->{A}; apply: mulmx_sub. Qed.

Lemma ltmx_sub_trans m1 m2 m3 n
                     (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A < B)%MS -> (B <= C)%MS -> (A < C)%MS.
Proof.
case/andP=> sAB ltAB sBC; rewrite ltmxE (submx_trans sAB) //.
by apply: contra ltAB; apply: submx_trans.
Qed.

Lemma sub_ltmx_trans m1 m2 m3 n
                     (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A <= B)%MS -> (B < C)%MS -> (A < C)%MS.
Proof.
move=> sAB /andP[sBC ltBC]; rewrite ltmxE (submx_trans sAB) //.
by apply: contra ltBC => sCA; apply: submx_trans sAB.
Qed.

Lemma ltmx_trans m n : transitive (@ltmx m m n).
Proof. by move=> A B C; move/ltmxW; apply: sub_ltmx_trans. Qed.

Lemma ltmx_irrefl m n : irreflexive (@ltmx m m n).
Proof. by move=> A; rewrite /ltmx submx_refl andbF. Qed.

Lemma sub0mx m1 m2 n (A : 'M_(m2, n)) : ((0 : 'M_(m1, n)) <= A)%MS.
Proof. by rewrite submxE mul0mx. Qed.

Lemma submx0null m1 m2 n (A : 'M[F]_(m1, n)) :
  (A <= (0 : 'M_(m2, n)))%MS -> A = 0.
Proof. by case/submxP=> D; rewrite mulmx0. Qed.

Lemma submx0 m n (A : 'M_(m, n)) : (A <= (0 : 'M_n))%MS = (A == 0).
Proof. by apply/idP/eqP=> [|->]; [apply: submx0null | apply: sub0mx]. Qed.

Lemma lt0mx m n (A : 'M_(m, n)) : ((0 : 'M_n) < A)%MS = (A != 0).
Proof. by rewrite /ltmx sub0mx submx0. Qed.

Lemma ltmx0 m n (A : 'M[F]_(m, n)) : (A < (0 : 'M_n))%MS = false.
Proof. by rewrite /ltmx sub0mx andbF. Qed.

Lemma eqmx0P m n (A : 'M_(m, n)) : reflect (A = 0) (A == (0 : 'M_n))%MS.
Proof. by rewrite submx0 sub0mx andbT; apply: eqP. Qed.

Lemma eqmx_eq0 m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :=: B)%MS -> (A == 0) = (B == 0).
Proof. by move=> eqAB; rewrite -!submx0 eqAB. Qed.

Lemma addmx_sub m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m1, n)) (C : 'M_(m2, n)) :
  (A <= C)%MS -> (B <= C)%MS -> ((A + B)%R <= C)%MS.
Proof.
by case/submxP=> A' ->; case/submxP=> B' ->; rewrite -mulmxDl submxMl.
Qed.

Lemma rowsub_sub m1 m2 n (f : 'I_m2 -> 'I_m1) (A : 'M_(m1, n)) :
  (rowsub f A <= A)%MS.
Proof. by rewrite rowsubE mulmx_sub. Qed.

Lemma summx_sub m1 m2 n (B : 'M_(m2, n))
                I (r : seq I) (P : pred I) (A_ : I -> 'M_(m1, n)) :
  (forall i, P i -> A_ i <= B)%MS -> ((\sum_(i <- r | P i) A_ i)%R <= B)%MS.
Proof.
by move=> leAB; elim/big_ind: _ => // [|C D]; [apply/sub0mx | apply/addmx_sub].
Qed.

Lemma scalemx_sub m1 m2 n a (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS -> (a *: A <= B)%MS.
Proof. by case/submxP=> A' ->; rewrite scalemxAl submxMl. Qed.

Lemma row_sub m n i (A : 'M_(m, n)) : (row i A <= A)%MS.
Proof. exact: rowsub_sub. Qed.

Lemma eq_row_sub m n v (A : 'M_(m, n)) i : row i A = v -> (v <= A)%MS.
Proof. by move <-; rewrite row_sub. Qed.
Arguments eq_row_sub [m n v A].

Lemma nz_row_sub m n (A : 'M_(m, n)) : (nz_row A <= A)%MS.
Proof. by rewrite /nz_row; case: pickP => [i|] _; rewrite ?row_sub ?sub0mx. Qed.

Lemma row_subP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (forall i, row i A <= B)%MS (A <= B)%MS.
Proof.
apply: (iffP idP) => [sAB i|sAB].
  by apply: submx_trans sAB; apply: row_sub.
rewrite submxE; apply/eqP/row_matrixP=> i; apply/eqP.
by rewrite row_mul row0 -submxE.
Qed.
Arguments row_subP {m1 m2 n A B}.

Lemma rV_subP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (forall v : 'rV_n, v <= A -> v <= B)%MS (A <= B)%MS.
Proof.
apply: (iffP idP) => [sAB v Av | sAB]; first exact: submx_trans sAB.
by apply/row_subP=> i; rewrite sAB ?row_sub.
Qed.
Arguments rV_subP {m1 m2 n A B}.

Lemma row_subPn m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (exists i, ~~ (row i A <= B)%MS) (~~ (A <= B)%MS).
Proof. by rewrite (sameP row_subP forallP); apply: forallPn. Qed.

Lemma sub_rVP n (u v : 'rV_n) : reflect (exists a, u = a *: v) (u <= v)%MS.
Proof.
apply: (iffP submxP) => [[w ->] | [a ->]].
  by exists (w 0 0); rewrite -mul_scalar_mx -mx11_scalar.
by exists a%:M; rewrite mul_scalar_mx.
Qed.

Lemma rank_rV n (v : 'rV_n) : \rank v = (v != 0).
Proof.
case: eqP => [-> | nz_v]; first by rewrite mxrank0.
by apply/eqP; rewrite eqn_leq rank_leq_row lt0n mxrank_eq0; apply/eqP.
Qed.

Lemma rowV0Pn m n (A : 'M_(m, n)) :
  reflect (exists2 v : 'rV_n, v <= A & v != 0)%MS (A != 0).
Proof.
rewrite -submx0; apply: (iffP idP) => [| [v svA]]; last first.
  by rewrite -submx0; apply: contra (submx_trans _).
by case/row_subPn=> i; rewrite submx0; exists (row i A); rewrite ?row_sub.
Qed.

Lemma rowV0P m n (A : 'M_(m, n)) :
  reflect (forall v : 'rV_n, v <= A -> v = 0)%MS (A == 0).
Proof.
rewrite -[A == 0]negbK; case: rowV0Pn => IH.
  by right; case: IH => v svA nzv IH; case/eqP: nzv; apply: IH.
by left=> v svA; apply/eqP/idPn=> nzv; case: IH; exists v.
Qed.

Lemma submx_full m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  row_full B -> (A <= B)%MS.
Proof.
by rewrite submxE /cokermx => /eqnP->; rewrite /copid_mx pid_mx_1 subrr !mulmx0.
Qed.

Lemma row_fullP m n (A : 'M_(m, n)) :
  reflect (exists B, B *m A = 1%:M) (row_full A).
Proof.
apply: (iffP idP) => [Afull | [B kA]].
  by exists (1%:M *m pinvmx A); apply: mulmxKpV (submx_full _ Afull).
by rewrite [_ A]eqn_leq rank_leq_col (mulmx1_min_rank B 1%:M) ?mulmx1.
Qed.
Arguments row_fullP {m n A}.

Lemma row_full_inj m n p A : row_full A -> injective (@mulmx _ m n p A).
Proof.
case/row_fullP=> A' A'K; apply: can_inj (mulmx A') _ => B.
by rewrite mulmxA A'K mul1mx.
Qed.

Lemma row_freeP m n (A : 'M_(m, n)) :
  reflect (exists B, A *m B = 1%:M) (row_free A).
Proof.
rewrite /row_free -mxrank_tr.
apply: (iffP row_fullP) => [] [B kA];
  by exists B^T; rewrite -trmx1 -kA trmx_mul ?trmxK.
Qed.

Lemma row_free_inj m n p A : row_free A -> injective ((@mulmx _ m n p)^~ A).
Proof.
case/row_freeP=> A' AK; apply: can_inj (mulmx^~ A') _ => B.
by rewrite -mulmxA AK mulmx1.
Qed.

(* A variant of row_free_inj that exposes mulmxr, an alias for mulmx^~ *)
(* but which is canonically additive *)
Definition row_free_injr m n p A : row_free A -> injective (mulmxr A) :=
  @row_free_inj m n p A.

Lemma row_free_unit n (A : 'M_n) : row_free A = (A \in unitmx).
Proof.
apply/row_fullP/idP=> [[A'] | uA]; first by case/mulmx1_unit.
by exists (invmx A); rewrite mulVmx.
Qed.

Lemma row_full_unit n (A : 'M_n) : row_full A = (A \in unitmx).
Proof. exact: row_free_unit. Qed.

Lemma mxrank_unit n (A : 'M_n) : A \in unitmx -> \rank A = n.
Proof. by rewrite -row_full_unit => /eqnP. Qed.

Lemma mxrank1 n : \rank (1%:M : 'M_n) = n. Proof. exact: mxrank_unit. Qed.

Lemma mxrank_delta m n i j : \rank (delta_mx i j : 'M_(m, n)) = 1%N.
Proof.
apply/eqP; rewrite eqn_leq lt0n mxrank_eq0.
rewrite -{1}(mul_delta_mx (0 : 'I_1)) mulmx_max_rank.
by apply/eqP; move/matrixP; move/(_ i j); move/eqP; rewrite !mxE !eqxx oner_eq0.
Qed.

Lemma mxrankS m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS -> \rank A <= \rank B.
Proof. by case/submxP=> D ->; rewrite mxrankM_maxr. Qed.

Lemma submx1 m n (A : 'M_(m, n)) : (A <= 1%:M)%MS.
Proof. by rewrite submx_full // row_full_unit unitmx1. Qed.

Lemma sub1mx m n (A : 'M_(m, n)) : (1%:M <= A)%MS = row_full A.
Proof.
apply/idP/idP; last exact: submx_full.
by move/mxrankS; rewrite mxrank1 col_leq_rank.
Qed.

Lemma ltmx1 m n (A : 'M_(m, n)) : (A < 1%:M)%MS = ~~ row_full A.
Proof. by rewrite /ltmx sub1mx submx1. Qed.

Lemma lt1mx m n (A : 'M_(m, n)) : (1%:M < A)%MS = false.
Proof. by rewrite /ltmx submx1 andbF. Qed.

Lemma pinvmxE n (A : 'M[F]_n) : A \in unitmx -> pinvmx A = invmx A.
Proof.
move=> A_unit; apply: (@row_free_inj _ _ _ A); rewrite ?row_free_unit//.
by rewrite -[pinvmx _]mul1mx mulmxKpV ?sub1mx ?row_full_unit// mulVmx.
Qed.

Lemma mulVpmx m n (A : 'M[F]_(m, n)) : row_full A -> pinvmx A *m A = 1%:M.
Proof. by move=> fA; rewrite -[pinvmx _]mul1mx mulmxKpV// sub1mx. Qed.

Lemma pinvmx_free m n (A : 'M[F]_(m, n)) : row_full A -> row_free (pinvmx A).
Proof. by move=> /mulVpmx pAA1; apply/row_freeP; exists A. Qed.

Lemma pinvmx_full m n (A : 'M[F]_(m, n)) : row_free A -> row_full (pinvmx A).
Proof. by move=> /mulmxVp ApA1; apply/row_fullP; exists A. Qed.

Lemma eqmxP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (A :=: B)%MS (A == B)%MS.
Proof.
apply: (iffP andP) => [[sAB sBA] | eqAB]; last by rewrite !eqAB.
split=> [|m3 C]; first by apply/eqP; rewrite eqn_leq !mxrankS.
split; first by apply/idP/idP; apply: submx_trans.
by apply/idP/idP=> sC; apply: submx_trans sC _.
Qed.
Arguments eqmxP {m1 m2 n A B}.

Lemma rV_eqP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (forall u : 'rV_n, (u <= A) = (u <= B))%MS (A == B)%MS.
Proof.
apply: (iffP idP) => [eqAB u | eqAB]; first by rewrite (eqmxP eqAB).
by apply/andP; split; apply/rV_subP=> u; rewrite eqAB.
Qed.

Lemma eqmx_refl m1 n (A : 'M_(m1, n)) : (A :=: A)%MS.
Proof. by []. Qed.

Lemma eqmx_sym m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :=: B)%MS -> (B :=: A)%MS.
Proof. by move=> eqAB; split=> [|m3 C]; rewrite !eqAB. Qed.

Lemma eqmx_trans m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A :=: B)%MS -> (B :=: C)%MS -> (A :=: C)%MS.
Proof. by move=> eqAB eqBC; split=> [|m4 D]; rewrite !eqAB !eqBC. Qed.

Lemma eqmx_rank m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A == B)%MS -> \rank A = \rank B.
Proof. by move/eqmxP->. Qed.

Lemma lt_eqmx m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
    (A :=: B)%MS ->
  forall C : 'M_(m3, n), (((A < C) = (B < C))%MS * ((C < A) = (C < B))%MS)%type.
Proof. by move=> eqAB C; rewrite /ltmx !eqAB. Qed.

Lemma eqmxMr m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  (A :=: B)%MS -> (A *m C :=: B *m C)%MS.
Proof. by move=> eqAB; apply/eqmxP; rewrite !submxMr ?eqAB. Qed.

Lemma eqmxMfull m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  row_full A -> (A *m B :=: B)%MS.
Proof.
case/row_fullP=> A' A'A; apply/eqmxP; rewrite submxMl /=.
by apply/submxP; exists A'; rewrite mulmxA A'A mul1mx.
Qed.

Lemma eqmx0 m n : ((0 : 'M[F]_(m, n)) :=: (0 : 'M_n))%MS.
Proof. by apply/eqmxP; rewrite !sub0mx. Qed.

Lemma eqmx_scale m n a (A : 'M_(m, n)) : a != 0 -> (a *: A :=: A)%MS.
Proof.
move=> nz_a; apply/eqmxP; rewrite scalemx_sub //.
by rewrite -{1}[A]scale1r -(mulVf nz_a) -scalerA scalemx_sub.
Qed.

Lemma eqmx_opp m n (A : 'M_(m, n)) : (- A :=: A)%MS.
Proof.
by rewrite -scaleN1r; apply: eqmx_scale => //; rewrite oppr_eq0 oner_eq0.
Qed.

Lemma submxMfree m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  row_free C -> (A *m C <= B *m C)%MS = (A <= B)%MS.
Proof.
case/row_freeP=> C' C_C'_1; apply/idP/idP=> sAB; last exact: submxMr.
by rewrite -[A]mulmx1 -[B]mulmx1 -C_C'_1 !mulmxA submxMr.
Qed.

Lemma eqmxMfree m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  row_free C -> (A *m C :=: B *m C)%MS -> (A :=: B)%MS.
Proof.
by move=> Cfree eqAB; apply/eqmxP; move/eqmxP: eqAB; rewrite !submxMfree.
Qed.

Lemma mxrankMfree m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  row_free B -> \rank (A *m B) = \rank A.
Proof.
by move=> Bfree; rewrite -mxrank_tr trmx_mul eqmxMfull /row_full mxrank_tr.
Qed.

Lemma eq_row_base m n (A : 'M_(m, n)) : (row_base A :=: A)%MS.
Proof.
apply/eqmxP/andP; split; apply/submxP.
  exists (pid_mx (\rank A) *m invmx (col_ebase A)).
  by rewrite -{8}[A]mulmx_ebase !mulmxA mulmxKV // pid_mx_id.
exists (col_ebase A *m pid_mx (\rank A)).
by rewrite mulmxA -(mulmxA _ _ (pid_mx _)) pid_mx_id // mulmx_ebase.
Qed.

Lemma row_base0 (m n : nat) : row_base (0 : 'M[F]_(m, n)) = 0.
Proof. by apply/eqmx0P; rewrite !eq_row_base !sub0mx. Qed.

Let qidmx_eq1 n (A : 'M_n) : qidmx A = (A == 1%:M).
Proof. by rewrite /qidmx eqxx pid_mx_1. Qed.

Let genmx_witnessP m n (A : 'M_(m, n)) :
  equivmx A (row_full A) (genmx_witness A).
Proof.
rewrite /equivmx qidmx_eq1 /genmx_witness.
case fullA: (row_full A); first by rewrite eqxx sub1mx submx1 fullA.
set B := _ *m _; have defB : (B == A)%MS.
  apply/andP; split; apply/submxP.
    exists (pid_mx (\rank A) *m invmx (col_ebase A)).
    by rewrite -{3}[A]mulmx_ebase !mulmxA mulmxKV // pid_mx_id.
  exists (col_ebase A *m pid_mx (\rank A)).
  by rewrite mulmxA -(mulmxA _ _ (pid_mx _)) pid_mx_id // mulmx_ebase.
rewrite defB -negb_add addbF; case: eqP defB => // ->.
by rewrite sub1mx fullA.
Qed.

Lemma genmxE m n (A : 'M_(m, n)) : (<<A>> :=: A)%MS.
Proof.
by rewrite unlock; apply/eqmxP; case/andP: (chooseP (genmx_witnessP A)).
Qed.

Lemma eq_genmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :=: B -> <<A>> = <<B>>)%MS.
Proof.
move=> eqAB; rewrite unlock.
have{} eqAB: equivmx A (row_full A) =1 equivmx B (row_full B).
  by move=> C; rewrite /row_full /equivmx !eqAB.
rewrite (eq_choose eqAB) (choose_id _ (genmx_witnessP B)) //.
by rewrite -eqAB genmx_witnessP.
Qed.

Lemma genmxP m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (<<A>> = <<B>>)%MS (A == B)%MS.
Proof.
apply: (iffP idP) => eqAB; first exact: eq_genmx (eqmxP _).
by rewrite -!(genmxE A) eqAB !genmxE andbb.
Qed.
Arguments genmxP {m1 m2 n A B}.

Lemma genmx0 m n : <<0 : 'M_(m, n)>>%MS = 0.
Proof. by apply/eqP; rewrite -submx0 genmxE sub0mx. Qed.

Lemma genmx1 n : <<1%:M : 'M_n>>%MS = 1%:M.
Proof.
rewrite unlock; case/andP: (chooseP (@genmx_witnessP n n 1%:M)) => _ /eqP.
by rewrite qidmx_eq1 row_full_unit unitmx1 => /eqP.
Qed.

Lemma genmx_id m n (A : 'M_(m, n)) : (<<<<A>>>> = <<A>>)%MS.
Proof. exact/eq_genmx/genmxE. Qed.

Lemma row_base_free m n (A : 'M_(m, n)) : row_free (row_base A).
Proof. by apply/eqnP; rewrite eq_row_base. Qed.

Lemma mxrank_gen m n (A : 'M_(m, n)) : \rank <<A>> = \rank A.
Proof. by rewrite genmxE. Qed.

Lemma col_base_full m n (A : 'M_(m, n)) : row_full (col_base A).
Proof.
apply/row_fullP; exists (pid_mx (\rank A) *m invmx (col_ebase A)).
by rewrite !mulmxA mulmxKV // pid_mx_id // pid_mx_1.
Qed.
Hint Resolve row_base_free col_base_full : core.

Lemma mxrank_leqif_sup m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS -> \rank A <= \rank B ?= iff (B <= A)%MS.
Proof.
move=> sAB; split; first by rewrite mxrankS.
apply/idP/idP=> [| sBA]; last by rewrite eqn_leq !mxrankS.
case/submxP: sAB => D ->; set r := \rank B; rewrite -(mulmx_base B) mulmxA.
rewrite mxrankMfree // => /row_fullP[E kE].
by rewrite -[rB in _ *m rB]mul1mx -kE -(mulmxA E) (mulmxA _ E) submxMl.
Qed.

Lemma mxrank_leqif_eq m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A <= B)%MS -> \rank A <= \rank B ?= iff (A == B)%MS.
Proof. by move=> sAB; rewrite sAB; apply: mxrank_leqif_sup. Qed.

Lemma ltmxErank m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A < B)%MS = (A <= B)%MS && (\rank A < \rank B).
Proof.
by apply: andb_id2l => sAB; rewrite (ltn_leqif (mxrank_leqif_sup sAB)).
Qed.

Lemma rank_ltmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A < B)%MS -> \rank A < \rank B.
Proof. by rewrite ltmxErank => /andP[]. Qed.

Lemma eqmx_cast m1 m2 n (A : 'M_(m1, n)) e :
  ((castmx e A : 'M_(m2, n)) :=: A)%MS.
Proof. by case: e A; case: m2 / => A e; rewrite castmx_id. Qed.

Lemma row_full_castmx m1 m2 n (A : 'M_(m1, n)) e :
  row_full (castmx e A  : 'M_(m2, n)) = row_full A.
Proof. exact/eq_row_full/eqmx_cast. Qed.

Lemma row_free_castmx m1 m2 n (A : 'M_(m1, n)) e :
  row_free (castmx e A  : 'M_(m2, n)) = row_free A.
Proof. by rewrite /row_free eqmx_cast; congr (_ == _); rewrite e.1. Qed.

Lemma eqmx_conform m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (conform_mx A B :=: A \/ conform_mx A B :=: B)%MS.
Proof.
case: (eqVneq m2 m1) => [-> | neqm12] in B *.
  by right; rewrite conform_mx_id.
by left; rewrite nonconform_mx ?neqm12.
Qed.

Let eqmx_sum_nop m n (A : 'M_(m, n)) : (addsmx_nop A :=: A)%MS.
Proof.
case: (eqmx_conform <<A>>%MS A) => // eq_id_gen.
exact: eqmx_trans (genmxE A).
Qed.

Lemma rowsub_comp_sub (m n p q : nat) f (g : 'I_n -> 'I_p) (A : 'M_(m, q)) :
   (rowsub (f \o g) A <= rowsub f A)%MS.
Proof. by rewrite rowsub_comp rowsubE mulmx_sub. Qed.

Lemma submx_rowsub (m n p q : nat) (h : 'I_n -> 'I_p) f g (A : 'M_(m, q)) :
  f =1 g \o h -> (rowsub f A <= rowsub g A)%MS.
Proof. by move=> /eq_rowsub->; rewrite rowsub_comp_sub. Qed.
Arguments submx_rowsub [m1 m2 m3 n] h [f g A] _ : rename.

Lemma eqmx_rowsub_comp_perm (m1 m2 n : nat) (s : 'S_m2) f (A : 'M_(m1, n)) :
  (rowsub (f \o s) A :=: rowsub f A)%MS.
Proof.
rewrite rowsub_comp rowsubE; apply: eqmxMfull.
by rewrite -perm_mxEsub row_full_unit unitmx_perm.
Qed.

Lemma eqmx_rowsub_comp (m n p q : nat) f (g : 'I_n -> 'I_p) (A : 'M_(m, q)) :
  p <= n -> injective g -> (rowsub (f \o g) A :=: rowsub f A)%MS.
Proof.
move=> leq_pn g_inj; have eq_np : n == p by rewrite eqn_leq leq_pn (inj_leq g).
rewrite (eqP eq_np) in g g_inj *.
rewrite (eq_rowsub (f \o (perm g_inj))); last by move=> i; rewrite /= permE.
exact: eqmx_rowsub_comp_perm.
Qed.

Lemma eqmx_rowsub (m n p q : nat) (h : 'I_n -> 'I_p) f g (A : 'M_(m, q)) :
  injective h -> p <= n -> f =1 g \o h -> (rowsub f A :=: rowsub g A)%MS.
Proof. by move=> leq_pn h_inj /eq_rowsub->; apply: eqmx_rowsub_comp. Qed.
Arguments eqmx_rowsub [m1 m2 m3 n] h [f g A] _ : rename.

Section AddsmxSub.

Variable (m1 m2 n : nat) (A : 'M[F]_(m1, n)) (B : 'M[F]_(m2, n)).

Lemma col_mx_sub m3 (C : 'M_(m3, n)) :
  (col_mx A B <= C)%MS = (A <= C)%MS && (B <= C)%MS.
Proof.
rewrite !submxE mul_col_mx -col_mx0.
by apply/eqP/andP; [case/eq_col_mx=> -> -> | case; do 2!move/eqP->].
Qed.

Lemma addsmxE : (A + B :=: col_mx A B)%MS.
Proof.
have:= submx_refl (col_mx A B); rewrite col_mx_sub; case/andP=> sAS sBS.
rewrite unlock; do 2?case: eqP => [AB0 | _]; last exact: genmxE.
  by apply/eqmxP; rewrite !eqmx_sum_nop sBS col_mx_sub AB0 sub0mx /=.
by apply/eqmxP; rewrite !eqmx_sum_nop sAS col_mx_sub AB0 sub0mx andbT /=.
Qed.

Lemma addsmx_sub m3 (C : 'M_(m3, n)) :
  (A + B <= C)%MS = (A <= C)%MS && (B <= C)%MS.
Proof. by rewrite addsmxE col_mx_sub. Qed.

Lemma addsmxSl : (A <= A + B)%MS.
Proof. by have:= submx_refl (A + B)%MS; rewrite addsmx_sub; case/andP. Qed.

Lemma addsmxSr : (B <= A + B)%MS.
Proof. by have:= submx_refl (A + B)%MS; rewrite addsmx_sub; case/andP. Qed.

Lemma addsmx_idPr : reflect (A + B :=: B)%MS (A <= B)%MS.
Proof.
have:= @eqmxP _ _ _ (A + B)%MS B.
by rewrite addsmxSr addsmx_sub submx_refl !andbT.
Qed.

Lemma addsmx_idPl : reflect (A + B :=: A)%MS (B <= A)%MS.
Proof.
have:= @eqmxP _ _ _ (A + B)%MS A.
by rewrite addsmxSl addsmx_sub submx_refl !andbT.
Qed.

End AddsmxSub.

Lemma adds0mx m1 m2 n (B : 'M_(m2, n)) : ((0 : 'M_(m1, n)) + B :=: B)%MS.
Proof. by apply/eqmxP; rewrite addsmx_sub sub0mx addsmxSr /= andbT. Qed.

Lemma addsmx0 m1 m2 n (A : 'M_(m1, n)) : (A + (0 : 'M_(m2, n)) :=: A)%MS.
Proof. by apply/eqmxP; rewrite addsmx_sub sub0mx addsmxSl /= !andbT. Qed.

Let addsmx_nop_eq0 m n (A : 'M_(m, n)) : (addsmx_nop A == 0) = (A == 0).
Proof. by rewrite -!submx0 eqmx_sum_nop. Qed.

Let addsmx_nop0 m n : addsmx_nop (0 : 'M_(m, n)) = 0.
Proof. by apply/eqP; rewrite addsmx_nop_eq0. Qed.

Let addsmx_nop_id n (A : 'M_n) : addsmx_nop A = A.
Proof. exact: conform_mx_id. Qed.

Lemma addsmxC m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) : (A + B = B + A)%MS.
Proof.
have: (A + B == B + A)%MS.
  by apply/andP; rewrite !addsmx_sub andbC -addsmx_sub andbC -addsmx_sub.
move/genmxP; rewrite [@addsmx]unlock -!submx0 !submx0.
by do 2!case: eqP => [// -> | _]; rewrite ?genmx_id ?addsmx_nop0.
Qed.

Lemma adds0mx_id m1 n (B : 'M_n) : ((0 : 'M_(m1, n)) + B)%MS = B.
Proof. by rewrite unlock eqxx addsmx_nop_id. Qed.

Lemma addsmx0_id m2 n (A : 'M_n) : (A + (0 : 'M_(m2, n)))%MS = A.
Proof. by rewrite addsmxC adds0mx_id. Qed.

Lemma addsmxA m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A + (B + C) = A + B + C)%MS.
Proof.
have: (A + (B + C) :=: A + B + C)%MS.
  by apply/eqmxP/andP; rewrite !addsmx_sub -andbA andbA -!addsmx_sub.
rewrite {1 3}[in @addsmx m1]unlock [in @addsmx n]unlock !addsmx_nop_id -!submx0.
rewrite !addsmx_sub ![@addsmx]unlock -!submx0; move/eq_genmx.
by do 3!case: (_ <= 0)%MS; rewrite //= !genmx_id.
Qed.

Canonical addsmx_monoid n :=
  Monoid.Law (@addsmxA n n n n) (@adds0mx_id n n) (@addsmx0_id n n).
Canonical addsmx_comoid n := Monoid.ComLaw (@addsmxC n n n).

Lemma addsmxMr m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  ((A + B)%MS *m C :=: A *m C + B *m C)%MS.
Proof. by apply/eqmxP; rewrite !addsmxE -!mul_col_mx !submxMr ?addsmxE. Qed.

Lemma addsmxS m1 m2 m3 m4 n (A : 'M_(m1, n)) (B : 'M_(m2, n))
                            (C : 'M_(m3, n)) (D : 'M_(m4, n)) :
  (A <= C -> B <= D -> A + B <= C + D)%MS.
Proof.
move=> sAC sBD.
by rewrite addsmx_sub {1}addsmxC !(submx_trans _ (addsmxSr _ _)).
Qed.

Lemma addmx_sub_adds m m1 m2 n (A : 'M_(m, n)) (B : 'M_(m, n))
                               (C : 'M_(m1, n)) (D : 'M_(m2, n)) :
  (A <= C -> B <= D -> (A + B)%R <= C + D)%MS.
Proof.
move=> sAC; move/(addsmxS sAC); apply: submx_trans.
by rewrite addmx_sub ?addsmxSl ?addsmxSr.
Qed.

Lemma addsmx_addKl n m1 m2 (A : 'M_(m1, n)) (B C : 'M_(m2, n)) :
  (B <= A)%MS -> (A + (B + C)%R :=: A + C)%MS.
Proof.
move=> sBA; apply/eqmxP; rewrite !addsmx_sub !addsmxSl.
by rewrite -{3}[C](addKr B) !addmx_sub_adds ?eqmx_opp.
Qed.

Lemma addsmx_addKr n m1 m2 (A B : 'M_(m1, n)) (C : 'M_(m2, n)) :
  (B <= C)%MS -> ((A + B)%R + C :=: A + C)%MS.
Proof. by rewrite -!(addsmxC C) addrC; apply: addsmx_addKl. Qed.

Lemma adds_eqmx m1 m2 m3 m4 n (A : 'M_(m1, n)) (B : 'M_(m2, n))
                              (C : 'M_(m3, n)) (D : 'M_(m4, n)) :
  (A :=: C -> B :=: D -> A + B :=: C + D)%MS.
Proof. by move=> eqAC eqBD; apply/eqmxP; rewrite !addsmxS ?eqAC ?eqBD. Qed.

Lemma genmx_adds m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (<<(A + B)%MS>> = <<A>> + <<B>>)%MS.
Proof.
rewrite -(eq_genmx (adds_eqmx (genmxE A) (genmxE B))).
by rewrite [@addsmx]unlock !addsmx_nop_id !(fun_if (@genmx _ _)) !genmx_id.
Qed.

Lemma sub_addsmxP m1 m2 m3 n
                  (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  reflect (exists u, A = u.1 *m B + u.2 *m C) (A <= B + C)%MS.
Proof.
apply: (iffP idP) => [|[u ->]]; last by rewrite addmx_sub_adds ?submxMl.
rewrite addsmxE; case/submxP=> u ->; exists (lsubmx u, rsubmx u).
by rewrite -mul_row_col hsubmxK.
Qed.
Arguments sub_addsmxP {m1 m2 m3 n A B C}.

Variable I : finType.
Implicit Type P : pred I.

Lemma genmx_sums P n (B_ : I -> 'M_n) :
  <<(\sum_(i | P i) B_ i)%MS>>%MS = (\sum_(i | P i) <<B_ i>>)%MS.
Proof. exact: (big_morph _ (@genmx_adds n n n) (@genmx0 n n)). Qed.

Lemma sumsmx_sup i0 P m n (A : 'M_(m, n)) (B_ : I -> 'M_n) :
  P i0 -> (A <= B_ i0)%MS -> (A <= \sum_(i | P i) B_ i)%MS.
Proof.
by move=> Pi0 sAB; apply: submx_trans sAB _; rewrite (bigD1 i0) // addsmxSl.
Qed.
Arguments sumsmx_sup i0 [P m n A B_].

Lemma sumsmx_subP P m n (A_ : I -> 'M_n) (B : 'M_(m, n)) :
  reflect (forall i, P i -> A_ i <= B)%MS (\sum_(i | P i) A_ i <= B)%MS.
Proof.
apply: (iffP idP) => [sAB i Pi | sAB].
  by apply: submx_trans sAB; apply: sumsmx_sup Pi _.
by elim/big_rec: _ => [|i Ai Pi sAiB]; rewrite ?sub0mx // addsmx_sub sAB.
Qed.

Lemma summx_sub_sums P m n (A : I -> 'M[F]_(m, n)) B :
    (forall i, P i -> A i <= B i)%MS ->
  ((\sum_(i | P i) A i)%R <= \sum_(i | P i) B i)%MS.
Proof.
by move=> sAB; apply: summx_sub => i Pi; rewrite (sumsmx_sup i) ?sAB.
Qed.

Lemma sumsmxS P n (A B : I -> 'M[F]_n) :
    (forall i, P i -> A i <= B i)%MS ->
  (\sum_(i | P i) A i <= \sum_(i | P i) B i)%MS.
Proof.
by move=> sAB; apply/sumsmx_subP=> i Pi; rewrite (sumsmx_sup i) ?sAB.
Qed.

Lemma eqmx_sums P n (A B : I -> 'M[F]_n) :
    (forall i, P i -> A i :=: B i)%MS ->
  (\sum_(i | P i) A i :=: \sum_(i | P i) B i)%MS.
Proof. by move=> eqAB; apply/eqmxP; rewrite !sumsmxS // => i; move/eqAB->. Qed.

Lemma sub_sums_genmxP P m n p (A : 'M_(m, p)) (B_ : I -> 'M_(n, p)) :
  reflect (exists u_ : I -> 'M_(m, n), A = \sum_(i | P i) u_ i *m B_ i)
          (A <= \sum_(i | P i) <<B_ i>>)%MS.
Proof.
apply: (iffP idP) => [| [u_ ->]]; last first.
  by apply: summx_sub_sums => i _; rewrite genmxE; apply: submxMl.
have [b] := ubnP #|P|; elim: b => // b IHb in P A *.
case: (pickP P) => [i Pi | P0 _]; last first.
  rewrite big_pred0 //; move/submx0null->.
  by exists (fun _ => 0); rewrite big_pred0.
rewrite (cardD1x Pi) (bigD1 i) //= => /IHb{b IHb} /= IHi.
rewrite (adds_eqmx (genmxE _) (eqmx_refl _)) => /sub_addsmxP[u ->].
have [u_ ->] := IHi _ (submxMl u.2 _).
exists [eta u_ with i |-> u.1]; rewrite (bigD1 i Pi)/= eqxx; congr (_ + _).
by apply: eq_bigr => j /andP[_ /negPf->].
Qed.

Lemma sub_sumsmxP P m n (A : 'M_(m, n)) (B_ : I -> 'M_n) :
  reflect (exists u_, A = \sum_(i | P i) u_ i *m B_ i)
          (A <= \sum_(i | P i) B_ i)%MS.
Proof.
by rewrite -(eqmx_sums (fun _ _ => genmxE _)); apply/sub_sums_genmxP.
Qed.

Lemma sumsmxMr_gen P m n A (B : 'M[F]_(m, n)) :
  ((\sum_(i | P i) A i)%MS *m B :=: \sum_(i | P i) <<A i *m B>>)%MS.
Proof.
apply/eqmxP/andP; split; last first.
  by apply/sumsmx_subP=> i Pi; rewrite genmxE submxMr ?(sumsmx_sup i).
have [u ->] := sub_sumsmxP _ _ _ (submx_refl (\sum_(i | P i) A i)%MS).
by rewrite mulmx_suml summx_sub_sums // => i _; rewrite genmxE -mulmxA submxMl.
Qed.

Lemma sumsmxMr P n (A_ : I -> 'M[F]_n) (B : 'M_n) :
  ((\sum_(i | P i) A_ i)%MS *m B :=: \sum_(i | P i) (A_ i *m B))%MS.
Proof.
by apply: eqmx_trans (sumsmxMr_gen _ _ _) (eqmx_sums _) => i _; apply: genmxE.
Qed.

Lemma rank_pid_mx m n r : r <= m -> r <= n -> \rank (pid_mx r : 'M_(m, n)) = r.
Proof.
do 2!move/subnKC <-; rewrite pid_mx_block block_mxEv row_mx0 -addsmxE addsmx0.
by rewrite -mxrank_tr tr_row_mx trmx0 trmx1 -addsmxE addsmx0 mxrank1.
Qed.

Lemma rank_copid_mx n r : r <= n -> \rank (copid_mx r : 'M_n) = (n - r)%N.
Proof.
move/subnKC <-; rewrite /copid_mx pid_mx_block scalar_mx_block.
rewrite opp_block_mx !oppr0 add_block_mx !addr0 subrr block_mxEv row_mx0.
rewrite -addsmxE adds0mx -mxrank_tr tr_row_mx trmx0 trmx1.
by rewrite -addsmxE adds0mx mxrank1 addKn.
Qed.

Lemma mxrank_compl m n (A : 'M_(m, n)) : \rank A^C = (n - \rank A)%N.
Proof. by rewrite mxrankMfree ?row_free_unit ?rank_copid_mx. Qed.

Lemma mxrank_ker m n (A : 'M_(m, n)) : \rank (kermx A) = (m - \rank A)%N.
Proof. by rewrite mxrankMfree ?row_free_unit ?unitmx_inv ?rank_copid_mx. Qed.

Lemma kermx_eq0 n m (A : 'M_(m, n)) : (kermx A == 0) = row_free A.
Proof. by rewrite -mxrank_eq0 mxrank_ker subn_eq0 row_leq_rank. Qed.

Lemma mxrank_coker m n (A : 'M_(m, n)) : \rank (cokermx A) = (n - \rank A)%N.
Proof. by rewrite eqmxMfull ?row_full_unit ?unitmx_inv ?rank_copid_mx. Qed.

Lemma cokermx_eq0 n m (A : 'M_(m, n)) : (cokermx A == 0) = row_full A.
Proof. by rewrite -mxrank_eq0 mxrank_coker subn_eq0 col_leq_rank. Qed.

Lemma mulmx_ker m n (A : 'M_(m, n)) : kermx A *m A = 0.
Proof.
by rewrite -{2}[A]mulmx_ebase !mulmxA mulmxKV // mul_copid_mx_pid ?mul0mx.
Qed.

Lemma mulmxKV_ker m n p (A : 'M_(n, p)) (B : 'M_(m, n)) :
  B *m A = 0 -> B *m col_ebase A *m kermx A = B.
Proof.
rewrite mulmxA mulmxBr mulmx1 mulmxBl mulmxK //.
rewrite -{1}[A]mulmx_ebase !mulmxA => /(canRL (mulmxK (row_ebase_unit A))).
rewrite mul0mx // => BA0; apply: (canLR (addrK _)).
by rewrite -(pid_mx_id _ _ n (rank_leq_col A)) mulmxA BA0 !mul0mx addr0.
Qed.

Lemma sub_kermxP p m n (A : 'M_(m, n)) (B : 'M_(p, m)) :
  reflect (B *m A = 0) (B <= kermx A)%MS.
Proof.
apply: (iffP submxP) => [[D ->]|]; first by rewrite -mulmxA mulmx_ker mulmx0.
by move/mulmxKV_ker; exists (B *m col_ebase A).
Qed.

Lemma sub_kermx p m n (A : 'M_(m, n)) (B : 'M_(p, m)) :
  (B <= kermx A)%MS = (B *m A == 0).
Proof. exact/sub_kermxP/eqP. Qed.

Lemma kermx0 m n : (kermx (0 : 'M_(m, n)) :=: 1%:M)%MS.
Proof. by apply/eqmxP; rewrite submx1/= sub_kermx mulmx0. Qed.

Lemma mulmx_free_eq0 m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  row_free B -> (A *m B == 0) = (A == 0).
Proof. by rewrite -sub_kermx -kermx_eq0 => /eqP->; rewrite submx0. Qed.

Lemma inj_row_free m n (A : 'M_(m, n)) :
  (forall v : 'rV_m, v *m A = 0 -> v = 0) -> row_free A.
Proof.
move=> Ainj; rewrite -kermx_eq0; apply/eqP/row_matrixP => i.
by rewrite row0; apply/Ainj; rewrite -row_mul mulmx_ker row0.
Qed.

Lemma row_freePn m n (M : 'M[F]_(m, n)) :
 reflect (exists i, (row i M <= row' i M)%MS) (~~ row_free M).
Proof.
rewrite -kermx_eq0; apply: (iffP (rowV0Pn _)) => [|[i0 /submxP[D rM]]].
  move=> [v /sub_kermxP vM_eq0 /rV0Pn[i0 vi0_neq0]]; exists i0.
  have := vM_eq0; rewrite mulmx_sum_row (bigD1_ord i0)//=.
  move=> /(canRL (addrK _))/(canRL (scalerK _))->//.
  rewrite sub0r scalerN -scaleNr scalemx_sub// summx_sub// => l _.
  by rewrite scalemx_sub// -row_rowsub row_sub.
exists (\row_j oapp (D 0) (- 1) (unlift i0 j)); last first.
  by apply/rV0Pn; exists i0; rewrite !mxE unlift_none/= oppr_eq0 oner_eq0.
apply/sub_kermxP; rewrite mulmx_sum_row (bigD1_ord i0)//= !mxE.
rewrite unlift_none scaleN1r rM mulmx_sum_row addrC -sumrB big1 // => l _.
by rewrite !mxE liftK row_rowsub subrr.
Qed.

Lemma negb_row_free m n (M : 'M[F]_(m, n)) :
  ~~ row_free M = [exists i, (row i M <= row' i M)%MS].
Proof. exact/row_freePn/existsP. Qed.

Lemma mulmx0_rank_max m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  A *m B = 0 -> \rank A + \rank B <= n.
Proof.
move=> AB0; rewrite -{3}(subnK (rank_leq_row B)) leq_add2r.
by rewrite -mxrank_ker mxrankS // sub_kermx AB0.
Qed.

Lemma mxrank_Frobenius m n p q (A : 'M_(m, n)) B (C : 'M_(p, q)) :
  \rank (A *m B) + \rank (B *m C) <= \rank B + \rank (A *m B *m C).
Proof.
rewrite -{2}(mulmx_base (A *m B)) -mulmxA (eqmxMfull _ (col_base_full _)).
set C2 := row_base _ *m C.
rewrite -{1}(subnK (rank_leq_row C2)) -(mxrank_ker C2) addnAC leq_add2r.
rewrite addnC -{1}(mulmx_base B) -mulmxA eqmxMfull //.
set C1 := _ *m C; rewrite -{2}(subnKC (rank_leq_row C1)) leq_add2l -mxrank_ker.
rewrite -(mxrankMfree _ (row_base_free (A *m B))).
have: (row_base (A *m B) <= row_base B)%MS by rewrite !eq_row_base submxMl.
case/submxP=> D defD; rewrite defD mulmxA mxrankMfree ?mxrankS //.
by rewrite sub_kermx -mulmxA (mulmxA D) -defD -/C2 mulmx_ker.
Qed.

Lemma mxrank_mul_min m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  \rank A + \rank B - n <= \rank (A *m B).
Proof.
by have:= mxrank_Frobenius A 1%:M B; rewrite mulmx1 mul1mx mxrank1 leq_subLR.
Qed.

Lemma addsmx_compl_full m n (A : 'M_(m, n)) : row_full (A + A^C)%MS.
Proof.
rewrite /row_full addsmxE; apply/row_fullP.
exists (row_mx (pinvmx A) (cokermx A)); rewrite mul_row_col.
rewrite -{2}[A]mulmx_ebase -!mulmxA mulKmx // -mulmxDr !mulmxA.
by rewrite pid_mx_id ?copid_mx_id // -mulmxDl addrC subrK mul1mx mulVmx.
Qed.

Lemma sub_capmx_gen m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A <= capmx_gen B C)%MS = (A <= B)%MS && (A <= C)%MS.
Proof.
apply/idP/andP=> [sAI | [/submxP[B' ->{A}] /submxP[C' eqBC']]].
  rewrite !(submx_trans sAI) ?submxMl // /capmx_gen.
   have:= mulmx_ker (col_mx B C); set K := kermx _.
   rewrite -{1}[K]hsubmxK mul_row_col; move/(canRL (addrK _))->.
   by rewrite add0r -mulNmx submxMl.
have: (row_mx B' (- C') <= kermx (col_mx B C))%MS.
  by rewrite sub_kermx mul_row_col eqBC' mulNmx subrr.
case/submxP=> D; rewrite -[kermx _]hsubmxK mul_mx_row.
by case/eq_row_mx=> -> _; rewrite -mulmxA submxMl.
Qed.

Let capmx_witnessP m n (A : 'M_(m, n)) : equivmx A (qidmx A) (capmx_witness A).
Proof.
rewrite /equivmx qidmx_eq1 /qidmx /capmx_witness.
rewrite -sub1mx; case s1A: (1%:M <= A)%MS => /=; last first.
  rewrite !genmxE submx_refl /= -negb_add; apply: contra {s1A}(negbT s1A).
  have [<- | _] := eqP; first by rewrite genmxE.
  by case: eqP A => //= -> A /eqP ->; rewrite pid_mx_1.
case: (m =P n) => [-> | ne_mn] in A s1A *.
  by rewrite conform_mx_id submx_refl pid_mx_1 eqxx.
by rewrite nonconform_mx ?submx1 ?s1A ?eqxx //; case: eqP.
Qed.

Let capmx_normP m n (A : 'M_(m, n)) : equivmx_spec A (qidmx A) (capmx_norm A).
Proof. by case/andP: (chooseP (capmx_witnessP A)) => /eqmxP defN /eqP. Qed.

Let capmx_norm_eq m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  qidmx A = qidmx B -> (A == B)%MS -> capmx_norm A = capmx_norm B.
Proof.
move=> eqABid /eqmxP eqAB.
have{eqABid} eqAB: equivmx A (qidmx A) =1 equivmx B (qidmx B).
  by move=> C; rewrite /equivmx eqABid !eqAB.
rewrite {1}/capmx_norm (eq_choose eqAB).
by apply: choose_id; first rewrite -eqAB; apply: capmx_witnessP.
Qed.

Let capmx_nopP m n (A : 'M_(m, n)) : equivmx_spec A (qidmx A) (capmx_nop A).
Proof.
rewrite /capmx_nop; case: (eqVneq m n) => [-> | ne_mn] in A *.
  by rewrite conform_mx_id.
by rewrite nonconform_mx ?ne_mn //; apply: capmx_normP.
Qed.

Let sub_qidmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  qidmx B -> (A <= B)%MS.
Proof.
rewrite /qidmx => idB; apply: {A}submx_trans (submx1 A) _.
by case: eqP B idB => [-> _ /eqP-> | _ B]; rewrite (=^~ sub1mx, pid_mx_1).
Qed.

Let qidmx_cap m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  qidmx (A :&: B)%MS = qidmx A && qidmx B.
Proof.
rewrite unlock -sub1mx.
case idA: (qidmx A); case idB: (qidmx B); try by rewrite capmx_nopP.
case s1B: (_ <= B)%MS; first by rewrite capmx_normP.
apply/idP=> /(sub_qidmx 1%:M).
by rewrite capmx_normP sub_capmx_gen s1B andbF.
Qed.

Let capmx_eq_norm m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  qidmx A = qidmx B -> (A :&: B)%MS = capmx_norm (A :&: B)%MS.
Proof.
move=> eqABid; rewrite unlock -sub1mx {}eqABid.
have norm_id m (C : 'M_(m, n)) (N := capmx_norm C) : capmx_norm N = N.
  by apply: capmx_norm_eq; rewrite ?capmx_normP ?andbb.
case idB: (qidmx B); last by case: ifP; rewrite norm_id.
rewrite /capmx_nop; case: (eqVneq m2 n) => [-> | neqm2n] in B idB *.
  have idN := idB; rewrite -{1}capmx_normP !qidmx_eq1 in idN idB.
  by rewrite conform_mx_id (eqP idN) (eqP idB).
by rewrite nonconform_mx ?neqm2n ?norm_id.
Qed.

Lemma capmxE m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :&: B :=: capmx_gen A B)%MS.
Proof.
rewrite unlock -sub1mx; apply/eqmxP.
have:= submx_refl (capmx_gen A B); rewrite !sub_capmx_gen => /andP[sIA sIB].
case idA: (qidmx A); first by rewrite !capmx_nopP submx_refl sub_qidmx.
case idB: (qidmx B); first by rewrite !capmx_nopP submx_refl sub_qidmx.
case s1B: (1%:M <= B)%MS; rewrite !capmx_normP ?sub_capmx_gen sIA ?sIB //=.
by rewrite submx_refl (submx_trans (submx1 _)).
Qed.

Lemma capmxSl m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) : (A :&: B <= A)%MS.
Proof. by rewrite capmxE submxMl. Qed.

Lemma sub_capmx m m1 m2 n (A : 'M_(m, n)) (B : 'M_(m1, n)) (C : 'M_(m2, n)) :
  (A <= B :&: C)%MS = (A <= B)%MS && (A <= C)%MS.
Proof. by rewrite capmxE sub_capmx_gen. Qed.

Lemma capmxC m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) : (A :&: B = B :&: A)%MS.
Proof.
have [eqAB|] := eqVneq (qidmx A) (qidmx B).
  rewrite (capmx_eq_norm eqAB) (capmx_eq_norm (esym eqAB)).
  apply: capmx_norm_eq; first by rewrite !qidmx_cap andbC.
  by apply/andP; split; rewrite !sub_capmx andbC -sub_capmx.
by rewrite negb_eqb !unlock => /addbP <-; case: (qidmx A).
Qed.

Lemma capmxSr m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) : (A :&: B <= B)%MS.
Proof. by rewrite capmxC capmxSl. Qed.

Lemma capmx_idPr n m1 m2 (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (A :&: B :=: B)%MS (B <= A)%MS.
Proof.
have:= @eqmxP _ _ _ (A :&: B)%MS B.
by rewrite capmxSr sub_capmx submx_refl !andbT.
Qed.

Lemma capmx_idPl n m1 m2 (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (A :&: B :=: A)%MS (A <= B)%MS.
Proof. by rewrite capmxC; apply: capmx_idPr. Qed.

Lemma capmxS m1 m2 m3 m4 n (A : 'M_(m1, n)) (B : 'M_(m2, n))
                           (C : 'M_(m3, n)) (D : 'M_(m4, n)) :
  (A <= C -> B <= D -> A :&: B <= C :&: D)%MS.
Proof.
by move=> sAC sBD; rewrite sub_capmx {1}capmxC !(submx_trans (capmxSr _ _)).
Qed.

Lemma cap_eqmx m1 m2 m3 m4 n (A : 'M_(m1, n)) (B : 'M_(m2, n))
                             (C : 'M_(m3, n)) (D : 'M_(m4, n)) :
  (A :=: C -> B :=: D -> A :&: B :=: C :&: D)%MS.
Proof. by move=> eqAC eqBD; apply/eqmxP; rewrite !capmxS ?eqAC ?eqBD. Qed.

Lemma capmxMr m1 m2 n p (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(n, p)) :
  ((A :&: B) *m C <= A *m C :&: B *m C)%MS.
Proof. by rewrite sub_capmx !submxMr ?capmxSl ?capmxSr. Qed.

Lemma cap0mx m1 m2 n (A : 'M_(m2, n)) : ((0 : 'M_(m1, n)) :&: A)%MS = 0.
Proof. exact: submx0null (capmxSl _ _). Qed.

Lemma capmx0 m1 m2 n (A : 'M_(m1, n)) : (A :&: (0 : 'M_(m2, n)))%MS = 0.
Proof. exact: submx0null (capmxSr _ _). Qed.

Lemma capmxT m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  row_full B -> (A :&: B :=: A)%MS.
Proof.
rewrite -sub1mx => s1B; apply/eqmxP.
by rewrite capmxSl sub_capmx submx_refl (submx_trans (submx1 A)).
Qed.

Lemma capTmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  row_full A -> (A :&: B :=: B)%MS.
Proof. by move=> Afull; apply/eqmxP; rewrite capmxC !capmxT ?andbb. Qed.

Let capmx_nop_id n (A : 'M_n) : capmx_nop A = A.
Proof. by rewrite /capmx_nop conform_mx_id. Qed.

Lemma cap1mx n (A : 'M_n) : (1%:M :&: A = A)%MS.
Proof. by rewrite unlock qidmx_eq1 eqxx capmx_nop_id. Qed.

Lemma capmx1 n (A : 'M_n) : (A :&: 1%:M = A)%MS.
Proof. by rewrite capmxC cap1mx. Qed.

Lemma genmx_cap m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  <<A :&: B>>%MS = (<<A>> :&: <<B>>)%MS.
Proof.
rewrite -(eq_genmx (cap_eqmx (genmxE A) (genmxE B))).
case idAB: (qidmx <<A>> || qidmx <<B>>)%MS.
  rewrite [@capmx]unlock !capmx_nop_id !(fun_if (@genmx _ _)) !genmx_id.
  by case: (qidmx _) idAB => //= ->.
case idA: (qidmx _) idAB => //= idB; rewrite {2}capmx_eq_norm ?idA //.
set C := (_ :&: _)%MS; have eq_idC: row_full C = qidmx C.
  rewrite qidmx_cap idA -sub1mx sub_capmx genmxE; apply/andP=> [[s1A]].
  by case/idP: idA; rewrite qidmx_eq1 -genmx1 (sameP eqP genmxP) submx1.
rewrite unlock /capmx_norm eq_idC.
by apply: choose_id (capmx_witnessP _); rewrite -eq_idC genmx_witnessP.
Qed.

Lemma capmxA m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A :&: (B :&: C) = A :&: B :&: C)%MS.
Proof.
rewrite (capmxC A B) capmxC; wlog idA: m1 m3 A C / qidmx A.
  move=> IH; case idA: (qidmx A); first exact: IH.
  case idC: (qidmx C); first by rewrite -IH.
  rewrite (@capmx_eq_norm n m3) ?qidmx_cap ?idA ?idC ?andbF //.
  rewrite capmx_eq_norm ?qidmx_cap ?idA ?idC ?andbF //.
  apply: capmx_norm_eq; first by rewrite !qidmx_cap andbAC.
  by apply/andP; split; rewrite !sub_capmx andbAC -!sub_capmx.
rewrite -!(capmxC A) [in @capmx m1]unlock idA capmx_nop_id.
have [eqBC|] := eqVneq (qidmx B) (qidmx C).
  rewrite (@capmx_eq_norm n) ?capmx_nopP // capmx_eq_norm //.
  by apply: capmx_norm_eq; rewrite ?qidmx_cap ?capmxS ?capmx_nopP.
by rewrite !unlock capmx_nopP capmx_nop_id; do 2?case: (qidmx _) => //.
Qed.

Canonical capmx_monoid n :=
   Monoid.Law (@capmxA n n n n) (@cap1mx n) (@capmx1 n).
Canonical capmx_comoid n := Monoid.ComLaw (@capmxC n n n).

Lemma bigcapmx_inf i0 P m n (A_ : I -> 'M_n) (B : 'M_(m, n)) :
  P i0 -> (A_ i0 <= B -> \bigcap_(i | P i) A_ i <= B)%MS.
Proof. by move=> Pi0; apply: submx_trans; rewrite (bigD1 i0) // capmxSl. Qed.

Lemma sub_bigcapmxP P m n (A : 'M_(m, n)) (B_ : I -> 'M_n) :
  reflect (forall i, P i -> A <= B_ i)%MS (A <= \bigcap_(i | P i) B_ i)%MS.
Proof.
apply: (iffP idP) => [sAB i Pi | sAB].
  by apply: (submx_trans sAB); rewrite (bigcapmx_inf Pi).
by elim/big_rec: _ => [|i Pi C sAC]; rewrite ?submx1 // sub_capmx sAB.
Qed.

Lemma genmx_bigcap P n (A_ : I -> 'M_n) :
  (<<\bigcap_(i | P i) A_ i>> = \bigcap_(i | P i) <<A_ i>>)%MS.
Proof. exact: (big_morph _ (@genmx_cap n n n) (@genmx1 n)). Qed.

Lemma matrix_modl m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (A <= C -> A + (B :&: C) :=: (A + B) :&: C)%MS.
Proof.
move=> sAC; set D := ((A + B) :&: C)%MS; apply/eqmxP.
rewrite sub_capmx addsmxS ?capmxSl // addsmx_sub sAC capmxSr /=.
have: (D <= B + A)%MS by rewrite addsmxC capmxSl.
case/sub_addsmxP=> u defD; rewrite defD addrC addmx_sub_adds ?submxMl //.
rewrite sub_capmx submxMl -[_ *m B](addrK (u.2 *m A)) -defD.
by rewrite addmx_sub ?capmxSr // eqmx_opp mulmx_sub.
Qed.

Lemma matrix_modr m1 m2 m3 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) (C : 'M_(m3, n)) :
  (C <= A -> (A :&: B) + C :=: A :&: (B + C))%MS.
Proof. by rewrite !(capmxC A) -!(addsmxC C); apply: matrix_modl. Qed.

Lemma capmx_compl m n (A : 'M_(m, n)) : (A :&: A^C)%MS = 0.
Proof.
set D := (A :&: A^C)%MS; have: (D <= D)%MS by [].
rewrite sub_capmx andbC => /andP[/submxP[B defB]].
rewrite submxE => /eqP; rewrite defB -!mulmxA mulKVmx ?copid_mx_id //.
by rewrite mulmxA => ->; rewrite mul0mx.
Qed.

Lemma mxrank_mul_ker m n p (A : 'M_(m, n)) (B : 'M_(n, p)) :
  (\rank (A *m B) + \rank (A :&: kermx B))%N = \rank A.
Proof.
apply/eqP; set K := kermx B; set C := (A :&: K)%MS.
rewrite -(eqmxMr B (eq_row_base A)); set K' := _ *m B.
rewrite -{2}(subnKC (rank_leq_row K')) -mxrank_ker eqn_add2l.
rewrite -(mxrankMfree _ (row_base_free A)) mxrank_leqif_sup.
  by rewrite sub_capmx -(eq_row_base A) submxMl sub_kermx -mulmxA mulmx_ker/=.
have /submxP[C' defC]: (C <= row_base A)%MS by rewrite eq_row_base capmxSl.
by rewrite defC submxMr // sub_kermx mulmxA -defC -sub_kermx capmxSr.
Qed.

Lemma mxrank_injP m n p (A : 'M_(m, n)) (f : 'M_(n, p)) :
  reflect (\rank (A *m f) = \rank A) ((A :&: kermx f)%MS == 0).
Proof.
rewrite -mxrank_eq0 -(eqn_add2l (\rank (A *m f))).
by rewrite mxrank_mul_ker addn0 eq_sym; apply: eqP.
Qed.

Lemma mxrank_disjoint_sum m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :&: B)%MS = 0 -> \rank (A + B)%MS = (\rank A + \rank B)%N.
Proof.
move=> AB0; pose Ar := row_base A; pose Br := row_base B.
have [Afree Bfree]: row_free Ar /\ row_free Br by rewrite !row_base_free.
have: (Ar :&: Br <= A :&: B)%MS by rewrite capmxS ?eq_row_base.
rewrite {}AB0 submx0 -mxrank_eq0 capmxE mxrankMfree //.
set Cr := col_mx Ar Br; set Crl := lsubmx _; rewrite mxrank_eq0 => /eqP Crl0.
rewrite -(adds_eqmx (eq_row_base _) (eq_row_base _)) addsmxE -/Cr.
suffices K0: kermx Cr = 0.
  by apply/eqP; rewrite eqn_leq rank_leq_row -subn_eq0 -mxrank_ker K0 mxrank0.
move/eqP: (mulmx_ker Cr); rewrite -[kermx Cr]hsubmxK mul_row_col -/Crl Crl0.
rewrite mul0mx add0r -mxrank_eq0 mxrankMfree // mxrank_eq0 => /eqP->.
exact: row_mx0.
Qed.

Lemma diffmxE m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :\: B :=: A :&: (capmx_gen A B)^C)%MS.
Proof. by rewrite unlock; apply/eqmxP; rewrite !genmxE !capmxE andbb. Qed.

Lemma genmx_diff m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (<<A :\: B>> = A :\: B)%MS.
Proof. by rewrite [@diffmx]unlock genmx_id. Qed.

Lemma diffmxSl m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) : (A :\: B <= A)%MS.
Proof. by rewrite diffmxE capmxSl. Qed.

Lemma capmx_diff m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  ((A :\: B) :&: B)%MS = 0.
Proof.
apply/eqP; pose C := capmx_gen A B; rewrite -submx0 -(capmx_compl C).
by rewrite sub_capmx -capmxE sub_capmx andbAC -sub_capmx -diffmxE -sub_capmx.
Qed.

Lemma addsmx_diff_cap_eq m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A :\: B + A :&: B :=: A)%MS.
Proof.
apply/eqmxP; rewrite addsmx_sub capmxSl diffmxSl /=.
set C := (A :\: B)%MS; set D := capmx_gen A B.
suffices sACD: (A <= C + D)%MS.
  by rewrite (submx_trans sACD) ?addsmxS ?capmxE.
have:= addsmx_compl_full D; rewrite /row_full addsmxE.
case/row_fullP=> U /(congr1 (mulmx A)); rewrite mulmx1.
rewrite -[U]hsubmxK mul_row_col mulmxDr addrC 2!mulmxA.
set V := _ *m _ => defA; rewrite -defA; move/(canRL (addrK _)): defA => defV.
suffices /submxP[W ->]: (V <= C)%MS by rewrite -mul_row_col addsmxE submxMl.
rewrite diffmxE sub_capmx {1}defV -mulNmx addmx_sub 1?mulmx_sub //.
by rewrite -capmxE capmxSl.
Qed.

Lemma mxrank_cap_compl m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (\rank (A :&: B) + \rank (A :\: B))%N = \rank A.
Proof.
rewrite addnC -mxrank_disjoint_sum ?addsmx_diff_cap_eq //.
by rewrite (capmxC A) capmxA capmx_diff cap0mx.
Qed.

Lemma mxrank_sum_cap m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (\rank (A + B) + \rank (A :&: B) = \rank A + \rank B)%N.
Proof.
set C := (A :&: B)%MS; set D := (A :\: B)%MS.
have rDB: \rank (A + B)%MS = \rank (D + B)%MS.
  apply/eqP; rewrite mxrank_leqif_sup; first by rewrite addsmxS ?diffmxSl.
  by rewrite addsmx_sub addsmxSr -(addsmx_diff_cap_eq A B) addsmxS ?capmxSr.
rewrite {1}rDB mxrank_disjoint_sum ?capmx_diff //.
by rewrite addnC addnA mxrank_cap_compl.
Qed.

Lemma mxrank_adds_leqif m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  \rank (A + B) <= \rank A + \rank B ?= iff (A :&: B <= (0 : 'M_n))%MS.
Proof.
rewrite -mxrank_sum_cap; split; first exact: leq_addr.
by rewrite addnC (@eqn_add2r _ 0) eq_sym mxrank_eq0 -submx0.
Qed.

(* rank of block matrices with 0s inside *)

Lemma rank_col_mx0 m n p (A : 'M_(m, n)) :
  \rank (col_mx A (0 : 'M_(p, n))) = \rank A.
Proof. by rewrite -addsmxE addsmx0. Qed.

Lemma rank_col_0mx m n p (A : 'M_(m, n)) :
  \rank (col_mx (0 : 'M_(p, n)) A) = \rank A.
Proof. by rewrite -addsmxE adds0mx. Qed.

Lemma rank_row_mx0 m n p (A : 'M_(m, n)) :
  \rank (row_mx A (0 : 'M_(m, p))) = \rank A.
Proof. by rewrite -mxrank_tr -[RHS]mxrank_tr tr_row_mx trmx0 rank_col_mx0. Qed.

Lemma rank_row_0mx m n p (A : 'M_(m, n)) :
  \rank (row_mx (0 : 'M_(m, p)) A) = \rank A.
Proof. by rewrite -mxrank_tr -[RHS]mxrank_tr tr_row_mx trmx0 rank_col_0mx. Qed.

Lemma rank_diag_block_mx m n p q
    (A : 'M_(m, n)) (B : 'M_(p, q)) :
  \rank (block_mx A 0 0 B) = (\rank A + \rank B)%N.
Proof.
rewrite block_mxEv -addsmxE mxrank_disjoint_sum ?rank_row_mx0 ?rank_row_0mx//.
apply/eqP/rowV0P => v; rewrite sub_capmx => /andP[/submxP[x ->]].
rewrite mul_mx_row mulmx0 => /submxP[y]; rewrite mul_mx_row mulmx0.
by move=> /eq_row_mx[-> _]; rewrite row_mx0.
Qed.

(* Subspace projection matrix *)

Lemma proj_mx_sub m n U V (W : 'M_(m, n)) : (W *m proj_mx U V <= U)%MS.
Proof. by rewrite !mulmx_sub // -addsmxE addsmx0. Qed.

Lemma proj_mx_compl_sub m n U V (W : 'M_(m, n)) :
  (W <= U + V -> W - W *m proj_mx U V <= V)%MS.
Proof.
rewrite addsmxE => sWUV; rewrite mulmxA -{1}(mulmxKpV sWUV) -mulmxBr.
by rewrite mulmx_sub // opp_col_mx add_col_mx subrr subr0 -addsmxE adds0mx.
Qed.

Lemma proj_mx_id m n U V (W : 'M_(m, n)) :
  (U :&: V = 0)%MS -> (W <= U)%MS -> W *m proj_mx U V = W.
Proof.
move=> dxUV sWU; apply/eqP; rewrite -subr_eq0 -submx0 -dxUV.
rewrite sub_capmx addmx_sub ?eqmx_opp ?proj_mx_sub //= -eqmx_opp opprB.
by rewrite proj_mx_compl_sub // (submx_trans sWU) ?addsmxSl.
Qed.

Lemma proj_mx_0 m n U V (W : 'M_(m, n)) :
  (U :&: V = 0)%MS -> (W <= V)%MS -> W *m proj_mx U V = 0.
Proof.
move=> dxUV sWV; apply/eqP; rewrite -submx0 -dxUV.
rewrite sub_capmx proj_mx_sub /= -[_ *m _](subrK W) addmx_sub // -eqmx_opp.
by rewrite opprB proj_mx_compl_sub // (submx_trans sWV) ?addsmxSr.
Qed.

Lemma add_proj_mx m n U V (W : 'M_(m, n)) :
    (U :&: V = 0)%MS -> (W <= U + V)%MS ->
  W *m proj_mx U V + W *m proj_mx V U = W.
Proof.
move=> dxUV sWUV; apply/eqP; rewrite -subr_eq0 -submx0 -dxUV.
rewrite -addrA sub_capmx {2}addrCA -!(opprB W).
by rewrite !{1}addmx_sub ?proj_mx_sub ?eqmx_opp ?proj_mx_compl_sub // addsmxC.
Qed.

Lemma proj_mx_proj n (U V : 'M_n) :
  let P := proj_mx U V in (U :&: V = 0)%MS -> P *m P = P.
Proof.
by move=> P dxUV; rewrite -[P in P *m _]mul1mx proj_mx_id ?proj_mx_sub ?mul1mx.
Qed.

(* Completing a partially injective matrix to get a unit matrix. *)

Lemma complete_unitmx m n (U : 'M_(m, n)) (f : 'M_n) :
  \rank (U *m f) = \rank U -> {g : 'M_n | g \in unitmx & U *m f = U *m g}.
Proof.
move=> injfU; pose V := <<U>>%MS; pose W := V *m f.
pose g := proj_mx V (V^C)%MS *m f + cokermx V *m row_ebase W.
have defW: V *m g = W.
  rewrite mulmxDr mulmxA proj_mx_id ?genmxE ?capmx_compl //.
  by rewrite mulmxA mulmx_coker mul0mx addr0.
exists g; last first.
  have /submxP[u ->]: (U <= V)%MS by rewrite genmxE.
  by rewrite -!mulmxA defW.
rewrite -row_full_unit -sub1mx; apply/submxP.
have: (invmx (col_ebase W) *m W <= V *m g)%MS by rewrite defW submxMl.
case/submxP=> v def_v; exists (invmx (row_ebase W) *m (v *m V + (V^C)%MS)).
rewrite -mulmxA mulmxDl -mulmxA -def_v -{3}[W]mulmx_ebase -mulmxA.
rewrite mulKmx ?col_ebase_unit // [_ *m g]mulmxDr mulmxA.
rewrite (proj_mx_0 (capmx_compl _)) // mul0mx add0r 2!mulmxA.
rewrite mulmxK ?row_ebase_unit // copid_mx_id ?rank_leq_row //.
rewrite (eqmxMr _ (genmxE U)) injfU genmxE addrC -mulmxDl subrK.
by rewrite mul1mx mulVmx ?row_ebase_unit.
Qed.

(* Two matrices with the same shape represent the same subspace *)
(* iff they differ only by a change of basis.                   *)

Lemma eqmxMunitP m n (U V : 'M_(m, n)) :
  reflect (exists2 P, P \in unitmx & U = P *m V) (U == V)%MS.
Proof.
apply: (iffP eqmxP) => [eqUV | [P Punit ->]]; last first.
  by apply/eqmxMfull; rewrite row_full_unit.
have [D defU]: exists D, U = D *m V by apply/submxP; rewrite eqUV.
have{eqUV} [Pt Pt_unit defUt]: {Pt | Pt \in unitmx & V^T *m D^T = V^T *m Pt}.
  by apply/complete_unitmx; rewrite -trmx_mul -defU !mxrank_tr eqUV.
by exists Pt^T; last apply/trmx_inj; rewrite ?unitmx_tr // defU !trmx_mul trmxK.
Qed.

(* Mapping between two subspaces with the same dimension. *)

Lemma eq_rank_unitmx m1 m2 n (U : 'M_(m1, n)) (V : 'M_(m2, n)) :
  \rank U = \rank V -> {f : 'M_n | f \in unitmx & V :=: U *m f}%MS.
Proof.
move=> eqrUV; pose f := invmx (row_ebase <<U>>%MS) *m row_ebase <<V>>%MS.
have defUf: (<<U>> *m f :=: <<V>>)%MS.
  rewrite -[<<U>>%MS]mulmx_ebase mulmxA mulmxK ?row_ebase_unit // -mulmxA.
  rewrite genmxE eqrUV -genmxE -{3}[<<V>>%MS]mulmx_ebase -mulmxA.
  move: (pid_mx _ *m _) => W; apply/eqmxP.
  by rewrite !eqmxMfull ?andbb // row_full_unit col_ebase_unit.
have{defUf} defV: (V :=: U *m f)%MS.
  by apply/eqmxP; rewrite -!(eqmxMr f (genmxE U)) !defUf !genmxE andbb.
have injfU: \rank (U *m f) = \rank U by rewrite -defV eqrUV.
by have [g injg defUg] := complete_unitmx injfU; exists g; rewrite -?defUg.
Qed.

(* maximal rank and full rank submatrices *)

Section MaxRankSubMatrix.
Variables (m n : nat) (A : 'M_(m, n)).

Definition maxrankfun : 'I_m ^ \rank A :=
  [arg max_(f > finfun (widen_ord (rank_leq_row A))) \rank (rowsub f A)].
Local Notation mxf := maxrankfun.

Lemma maxrowsub_free : row_free (rowsub mxf A).
Proof.
rewrite /mxf; case: arg_maxnP => //= f _ fM; apply/negP => /negP rfA.
have [i NriA] : exists i, ~~ (row i A <= rowsub f A)%MS.
  by apply/row_subPn; apply: contraNN rfA => /mxrankS; rewrite row_leq_rank.
have [j rjfA] : exists j, (row (f j) A <= rowsub (f \o lift j) A)%MS.
  case/row_freePn: rfA => j.
  by rewrite row_rowsub row'Esub -mxsub_comp; exists j.
pose g : 'I_m ^ \rank A := finfun [eta f with j |-> i].
suff: (rowsub f A < rowsub g A)%MS by rewrite ltmxErank andbC ltnNge fM.
rewrite ltmxE; apply/andP; split; last first.
  apply: contra NriA; apply: submx_trans.
  by rewrite (eq_row_sub j)// row_rowsub ffunE/= eqxx.
apply/row_subP => k; rewrite !row_rowsub.
have [->|/negPf eq_kjF] := eqVneq k j; last first.
  by rewrite (eq_row_sub k)// row_rowsub ffunE/= eq_kjF.
rewrite (submx_trans rjfA)// (submx_rowsub (lift j))// => l /=.
by rewrite ffunE/= eq_sym (negPf (neq_lift _ _)).
Qed.

Lemma eq_maxrowsub : (rowsub mxf A :=: A)%MS.
Proof.
apply/eqmxP; rewrite -(eq_leqif (mxrank_leqif_eq _))//.
  exact: maxrowsub_free.
apply/row_subP => i; apply/submxP; exists (delta_mx 0 (mxf i)).
by rewrite -rowE; apply/rowP => j; rewrite !mxE.
Qed.

Lemma maxrankfun_inj : injective mxf.
Proof.
move=> i j eqAij; have /row_free_inj := maxrowsub_free.
move=> /(_ 1%N) /(_ (delta_mx 0 i) (delta_mx 0 j)).
rewrite -!rowE !row_rowsub eqAij => /(_ erefl) /matrixP /(_ 0 i) /eqP.
by rewrite !mxE eqxx/=; case: (i =P j); rewrite // oner_eq0.
Qed.

Variable (rkA : row_full A).

Lemma maxrowsub_full : row_full (rowsub mxf A).
Proof. by rewrite /row_full eq_maxrowsub. Qed.
Hint Resolve maxrowsub_full : core.

Definition fullrankfun : 'I_m ^ n := finfun (mxf \o cast_ord (esym (eqP rkA))).
Local Notation frf := fullrankfun.

Lemma fullrowsub_full : row_full (rowsub frf A).
Proof.
by rewrite mxsub_ffunl rowsub_comp rowsub_cast esymK row_full_castmx.
Qed.

Lemma fullrowsub_unit : rowsub frf A \in unitmx.
Proof. by rewrite -row_full_unit fullrowsub_full. Qed.

Lemma fullrowsub_free : row_free (rowsub frf A).
Proof.  by rewrite row_free_unit fullrowsub_unit. Qed.

Lemma mxrank_fullrowsub : \rank (rowsub frf A) = n.
Proof. exact/eqP/fullrowsub_full. Qed.

Lemma eq_fullrowsub : (rowsub frf A :=: A)%MS.
Proof.
rewrite mxsub_ffunl rowsub_comp rowsub_cast esymK.
exact: (eqmx_trans (eqmx_cast _ _) eq_maxrowsub).
Qed.

Lemma fullrankfun_inj : injective frf.
Proof.
by move=> i j; rewrite !ffunE => /maxrankfun_inj /(congr1 val)/= /val_inj.
Qed.

End MaxRankSubMatrix.

Section SumExpr.

(* This is the infrastructure to support the mxdirect predicate. We use a     *)
(* bespoke canonical structure to decompose a matrix expression into binary   *)
(* and n-ary products, using some of the "quote" technology. This lets us     *)
(* characterize direct sums as set sums whose rank is equal to the sum of the *)
(* ranks of the individual terms. The mxsum_expr/proper_mxsum_expr structures *)
(* below supply both the decomposition and the calculation of the rank sum.   *)
(* The mxsum_spec dependent predicate family expresses the consistency of     *)
(* these two decompositions.                                                  *)
(*   The main technical difficulty we need to overcome is the fact that       *)
(* the "catch-all" case of canonical structures has a priority lower than     *)
(* constant expansion. However, it is undesireable that local abbreviations   *)
(* be opaque for the direct-sum predicate, e.g., not be able to handle        *)
(* let S := (\sum_(i | P i) LargeExpression i)%MS in mxdirect S -> ...).      *)
(*   As in "quote", we use the interleaving of constant expansion and         *)
(* canonical projection matching to achieve our goal: we use a "wrapper" type *)
(* (indeed, the wrapped T type defined in ssrfun.v) with a self-inserting     *)
(* non-primitive constructor to gain finer control over the type and          *)
(* structure inference process. The innermost, primitive, constructor flags   *)
(* trivial sums; it is initially hidden by an eta-expansion, which has been   *)
(* made into a (default) canonical structure -- this lets type inference      *)
(* automatically insert this outer tag.                                       *)
(*   In detail, we define three types                                         *)
(*  mxsum_spec S r <-> There exists a finite list of matrices A1, ..., Ak     *)
(*                     such that S is the set sum of the Ai, and r is the sum *)
(*                     of the ranks of the Ai, i.e., S = (A1 + ... + Ak)%MS   *)
(*                     and r = \rank A1 + ... + \rank Ak. Note that           *)
(*                     mxsum_spec is a recursive dependent predicate family   *)
(*                     whose elimination rewrites simultaneaously S, r and    *)
(*                     the height of S.                                       *)
(*   proper_mxsum_expr n == The interface for proper sum expressions; this is *)
(*                     a double-entry interface, keyed on both the matrix sum *)
(*                     value and the rank sum. The matrix value is restricted *)
(*                     to square matrices, as the "+"%MS operator always      *)
(*                     returns a square matrix. This interface has two        *)
(*                     canonical insances, for binary and n-ary sums.         *)
(*   mxsum_expr m n == The interface for general sum expressions, comprising  *)
(*                     both proper sums and trivial sums consisting of a      *)
(*                     single matrix. The key values are WRAPPED as this lets *)
(*                     us give priority to the "proper sum" interpretation    *)
(*                     (see below). To allow for trivial sums, the matrix key *)
(*                     can have any dimension. The mxsum_expr interface has   *)
(*                     two canonical instances, for trivial and proper sums,  *)
(*                     keyed to the Wrap and wrap constructors, respectively. *)
(* The projections for the two interfaces above are                           *)
(*   proper_mxsum_val, mxsum_val : these are respectively coercions to 'M_n   *)
(*                     and wrapped 'M_(m, n); thus, the matrix sum for an     *)
(*                     S : mxsum_expr m n can be written unwrap S.            *)
(*   proper_mxsum_rank, mxsum_rank : projections to the nat and wrapped nat,  *)
(*                     respectively; the rank sum for S : mxsum_expr m n is   *)
(*                     thus written unwrap (mxsum_rank S).                    *)
(* The mxdirect A predicate actually gets A in a phantom argument, which is   *)
(* used to infer an (implicit) S : mxsum_expr such that unwrap S = A; the     *)
(* actual definition is \rank (unwrap S) == unwrap (mxsum_rank S).            *)
(*   Note that the inference of S is inherently ambiguous: ANY matrix can be  *)
(* viewed as a trivial sum, including one whose description is manifestly a   *)
(* proper sum. We use the wrapped type and the interaction between delta      *)
(* reduction and canonical structure inference to resolve this ambiguity in   *)
(* favor of proper sums, as follows:                                          *)
(*    - The phantom type sets up a unification problem of the form            *)
(*         unwrap (mxsum_val ?S) = A                                          *)
(*      with unknown evar ?S : mxsum_expr m n.                                *)
(*    - As the constructor wrap is also a default Canonical instance for the  *)
(*      wrapped type, so A is immediately replaced with unwrap (wrap A) and   *)
(*      we get the residual unification problem                               *)
(*         mxsum_val ?S = wrap A                                              *)
(*    - Now Coq tries to apply the proper sum Canonical instance, which has   *)
(*      key projection wrap (proper_mxsum_val ?PS) where ?PS is a fresh evar  *)
(*      (of type proper_mxsum_expr n). This can only succeed if m = n, and if *)
(*      a solution can be found to the recursive unification problem          *)
(*         proper_mxsum_val ?PS = A                                           *)
(*      This causes Coq to look for one of the two canonical constants for    *)
(*      proper_mxsum_val (addsmx or bigop) at the head of A, delta-expanding  *)
(*      A as needed, and then inferring recursively mxsum_expr structures for *)
(*      the last argument(s) of that constant.                                *)
(*    - If the above step fails then the wrap constant is expanded, revealing *)
(*      the primitive Wrap constructor; the unification problem now becomes   *)
(*         mxsum_val ?S = Wrap A                                              *)
(*      which fits perfectly the trivial sum canonical structure, whose key   *)
(*      projection is Wrap ?B where ?B is a fresh evar. Thus the inference    *)
(*      succeeds, and returns the trivial sum.                                *)
(* Note that the rank projections also register canonical values, so that the *)
(* same process can be used to infer a sum structure from the rank sum. In    *)
(* that case, however, there is no ambiguity and the inference can fail,      *)
(* because the rank sum for a trivial sum is not an arbitrary integer -- it   *)
(* must be of the form \rank ?B. It is nevertheless necessary to use the      *)
(* wrapped nat type for the rank sums, because in the non-trivial case the    *)
(* head constant of the nat expression is determined by the proper_mxsum_expr *)
(* canonical structure, so the mxsum_expr structure must use a generic        *)
(* constant, namely wrap.                                                     *)

Inductive mxsum_spec n : forall m, 'M[F]_(m, n) -> nat -> Prop :=
 | TrivialMxsum m A
    : @mxsum_spec n m A (\rank A)
 | ProperMxsum m1 m2 T1 T2 r1 r2 of
      @mxsum_spec n m1 T1 r1 & @mxsum_spec n m2 T2 r2
    : mxsum_spec (T1 + T2)%MS (r1 + r2)%N.
Arguments mxsum_spec {n%N m%N} T%MS r%N.

Structure mxsum_expr m n := Mxsum {
  mxsum_val :> wrapped 'M_(m, n);
  mxsum_rank : wrapped nat;
  _ : mxsum_spec (unwrap mxsum_val) (unwrap mxsum_rank)
}.

Canonical trivial_mxsum m n A :=
  @Mxsum m n (Wrap A) (Wrap (\rank A)) (TrivialMxsum A).

Structure proper_mxsum_expr n := ProperMxsumExpr {
  proper_mxsum_val :> 'M_n;
  proper_mxsum_rank : nat;
  _ : mxsum_spec proper_mxsum_val proper_mxsum_rank
}.

Definition proper_mxsumP n (S : proper_mxsum_expr n) :=
  let: ProperMxsumExpr _ _ termS := S return mxsum_spec S (proper_mxsum_rank S)
  in termS.

Canonical sum_mxsum n (S : proper_mxsum_expr n) :=
  @Mxsum n n (wrap (S : 'M_n)) (wrap (proper_mxsum_rank S)) (proper_mxsumP S).

Section Binary.
Variable (m1 m2 n : nat) (S1 : mxsum_expr m1 n) (S2 : mxsum_expr m2 n).
Fact binary_mxsum_proof :
  mxsum_spec (unwrap S1 + unwrap S2)
             (unwrap (mxsum_rank S1) + unwrap (mxsum_rank S2)).
Proof. by case: S1 S2 => [A1 r1 A1P] [A2 r2 A2P]; right. Qed.
Canonical binary_mxsum_expr := ProperMxsumExpr binary_mxsum_proof.
End Binary.

Section Nary.
Context J (r : seq J) (P : pred J) n (S_ : J -> mxsum_expr n n).
Fact nary_mxsum_proof :
  mxsum_spec (\sum_(j <- r | P j) unwrap (S_ j))
             (\sum_(j <- r | P j) unwrap (mxsum_rank (S_ j))).
Proof.
elim/big_rec2: _ => [|j]; first by rewrite -(mxrank0 n n); left.
by case: (S_ j); right.
Qed.
Canonical nary_mxsum_expr := ProperMxsumExpr nary_mxsum_proof.
End Nary.

Definition mxdirect_def m n T of phantom 'M_(m, n) (unwrap (mxsum_val T)) :=
  \rank (unwrap T) == unwrap (mxsum_rank T).

End SumExpr.

Notation mxdirect A := (mxdirect_def (Phantom 'M_(_,_) A%MS)).

Lemma mxdirectP n (S : proper_mxsum_expr n) :
  reflect (\rank S = proper_mxsum_rank S) (mxdirect S).
Proof. exact: eqnP. Qed.
Arguments mxdirectP {n S}.

Lemma mxdirect_trivial m n A : mxdirect (unwrap (@trivial_mxsum m n A)).
Proof. exact: eqxx. Qed.

Lemma mxrank_sum_leqif m n (S : mxsum_expr m n) :
  \rank (unwrap S) <= unwrap (mxsum_rank S) ?= iff mxdirect (unwrap S).
Proof.
rewrite /mxdirect_def; case: S => [[A] [r] /= defAr]; split=> //=.
elim: m A r / defAr => // m1 m2 A1 A2 r1 r2 _ leAr1 _ leAr2.
by apply: leq_trans (leq_add leAr1 leAr2); rewrite mxrank_adds_leqif.
Qed.

Lemma mxdirectE m n (S : mxsum_expr m n) :
  mxdirect (unwrap S) = (\rank (unwrap S) == unwrap (mxsum_rank S)).
Proof. by []. Qed.

Lemma mxdirectEgeq m n (S : mxsum_expr m n) :
  mxdirect (unwrap S) = (\rank (unwrap S) >= unwrap (mxsum_rank S)).
Proof. by rewrite (geq_leqif (mxrank_sum_leqif S)). Qed.

Section BinaryDirect.

Variables m1 m2 n : nat.

Lemma mxdirect_addsE (S1 : mxsum_expr m1 n) (S2 : mxsum_expr m2 n) :
   mxdirect (unwrap S1 + unwrap S2)
    = [&& mxdirect (unwrap S1), mxdirect (unwrap S2)
        & unwrap S1 :&: unwrap S2 == 0]%MS.
Proof.
rewrite (@mxdirectE n) /=.
have:= leqif_add (mxrank_sum_leqif S1) (mxrank_sum_leqif S2).
move/(leqif_trans (mxrank_adds_leqif (unwrap S1) (unwrap S2)))=> ->.
by rewrite andbC -andbA submx0.
Qed.

Lemma mxdirect_addsP (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  reflect (A :&: B = 0)%MS (mxdirect (A + B)).
Proof. by rewrite mxdirect_addsE !mxdirect_trivial; apply: eqP. Qed.

End BinaryDirect.

Section NaryDirect.

Variables (P : pred I) (n : nat).

Let TIsum A_ i := (A_ i :&: (\sum_(j | P j && (j != i)) A_ j) = 0 :> 'M_n)%MS.

Let mxdirect_sums_recP (S_ : I -> mxsum_expr n n) :
  reflect (forall i, P i -> mxdirect (unwrap (S_ i)) /\ TIsum (unwrap \o S_) i)
          (mxdirect (\sum_(i | P i) (unwrap (S_ i)))).
Proof.
rewrite /TIsum; apply: (iffP eqnP) => /= [dxS i Pi | dxS].
  set Si' := (\sum_(j | _) unwrap (S_ j))%MS.
  have: mxdirect (unwrap (S_ i) + Si') by apply/eqnP; rewrite /= -!(bigD1 i).
  by rewrite mxdirect_addsE => /and3P[-> _ /eqP].
set Q := P; have [m] := ubnP #|Q|; have: Q \subset P by [].
elim: m Q => // m IHm Q /subsetP-sQP.
case: (pickP Q) => [i Qi | Q0]; last by rewrite !big_pred0 ?mxrank0.
rewrite (cardD1x Qi) !((bigD1 i) Q) //=.
move/IHm=> <- {IHm}/=; last by apply/subsetP=> j /andP[/sQP].
case: (dxS i (sQP i Qi)) => /eqnP=> <- TiQ_0; rewrite mxrank_disjoint_sum //.
apply/eqP; rewrite -submx0 -{2}TiQ_0 capmxS //=.
by apply/sumsmx_subP=> j /= /andP[Qj i'j]; rewrite (sumsmx_sup j) ?[P j]sQP.
Qed.

Lemma mxdirect_sumsP (A_ : I -> 'M_n) :
  reflect (forall i, P i -> A_ i :&: (\sum_(j | P j && (j != i)) A_ j) = 0)%MS
          (mxdirect (\sum_(i | P i) A_ i)).
Proof.
apply: (iffP (mxdirect_sums_recP _)) => dxA i /dxA; first by case.
by rewrite mxdirect_trivial.
Qed.

Lemma mxdirect_sumsE (S_ : I -> mxsum_expr n n) (xunwrap := unwrap) :
  reflect (and (forall i, P i -> mxdirect (unwrap (S_ i)))
               (mxdirect (\sum_(i | P i) (xunwrap (S_ i)))))
          (mxdirect (\sum_(i | P i) (unwrap (S_ i)))).
Proof.
apply: (iffP (mxdirect_sums_recP _)) => [dxS | [dxS_ dxS] i Pi].
  by do [split; last apply/mxdirect_sumsP] => i; case/dxS.
by split; [apply: dxS_ | apply: mxdirect_sumsP Pi].
Qed.

End NaryDirect.

Section SubDaddsmx.

Variables m m1 m2 n : nat.
Variables (A : 'M[F]_(m, n)) (B1 : 'M[F]_(m1, n)) (B2 : 'M[F]_(m2, n)).

Variant sub_daddsmx_spec : Prop :=
  SubDaddsmxSpec A1 A2 of (A1 <= B1)%MS & (A2 <= B2)%MS & A = A1 + A2
                        & forall C1 C2, (C1 <= B1)%MS -> (C2 <= B2)%MS ->
                          A = C1 + C2 -> C1 = A1 /\ C2 = A2.

Lemma sub_daddsmx : (B1 :&: B2 = 0)%MS -> (A <= B1 + B2)%MS -> sub_daddsmx_spec.
Proof.
move=> dxB /sub_addsmxP[u defA].
exists (u.1 *m B1) (u.2 *m B2); rewrite ?submxMl // => C1 C2 sCB1 sCB2.
move/(canLR (addrK _)) => defC1.
suffices: (C2 - u.2 *m B2 <= B1 :&: B2)%MS.
  by rewrite dxB submx0 subr_eq0 -defC1 defA; move/eqP->; rewrite addrK.
rewrite sub_capmx -opprB -{1}(canLR (addKr _) defA) -addrA defC1.
by rewrite !(eqmx_opp, addmx_sub) ?submxMl.
Qed.

End SubDaddsmx.

Section SubDsumsmx.

Variables (P : pred I) (m n : nat) (A : 'M[F]_(m, n)) (B : I -> 'M[F]_n).

Variant sub_dsumsmx_spec : Prop :=
  SubDsumsmxSpec A_ of forall i, P i -> (A_ i <= B i)%MS
                        & A = \sum_(i | P i) A_ i
                        & forall C, (forall i, P i -> C i <= B i)%MS ->
                          A = \sum_(i | P i) C i -> {in SimplPred P, C =1 A_}.

Lemma sub_dsumsmx :
    mxdirect (\sum_(i | P i) B i) -> (A <= \sum_(i | P i) B i)%MS ->
  sub_dsumsmx_spec.
Proof.
move/mxdirect_sumsP=> dxB /sub_sumsmxP[u defA].
pose A_ i := u i *m B i.
exists A_ => //= [i _ | C sCB defAC i Pi]; first exact: submxMl.
apply/eqP; rewrite -subr_eq0 -submx0 -{dxB}(dxB i Pi) /=.
rewrite sub_capmx addmx_sub ?eqmx_opp ?submxMl ?sCB //=.
rewrite -(subrK A (C i)) -addrA -opprB addmx_sub ?eqmx_opp //.
  rewrite addrC defAC (bigD1 i) // addKr /= summx_sub // => j Pi'j.
  by rewrite (sumsmx_sup j) ?sCB //; case/andP: Pi'j.
rewrite addrC defA (bigD1 i) // addKr /= summx_sub // => j Pi'j.
by rewrite (sumsmx_sup j) ?submxMl.
Qed.

End SubDsumsmx.

Section Eigenspace.

Variables (n : nat) (g : 'M_n).

Definition eigenspace a := kermx (g - a%:M).
Definition eigenvalue : pred F := fun a => eigenspace a != 0.

Lemma eigenspaceP a m (W : 'M_(m, n)) :
  reflect (W *m g = a *: W) (W <= eigenspace a)%MS.
Proof. by rewrite sub_kermx mulmxBr subr_eq0 mul_mx_scalar; apply/eqP. Qed.

Lemma eigenvalueP a :
  reflect (exists2 v : 'rV_n, v *m g = a *: v & v != 0) (eigenvalue a).
Proof. by apply: (iffP (rowV0Pn _)) => [] [v]; move/eigenspaceP; exists v. Qed.

Lemma eigenvectorP {v : 'rV_n} :
  reflect (exists a, (v <= eigenspace a)%MS) (stablemx v g).
Proof. by apply: (iffP (sub_rVP _ _)) => -[a] /eigenspaceP; exists a. Qed.

Lemma mxdirect_sum_eigenspace (P : pred I) a_ :
  {in P &, injective a_} -> mxdirect (\sum_(i | P i) eigenspace (a_ i)).
Proof.
have [m] := ubnP #|P|; elim: m P => // m IHm P lePm inj_a.
apply/mxdirect_sumsP=> i Pi; apply/eqP/rowV0P => v.
rewrite sub_capmx => /andP[/eigenspaceP def_vg].
set Vi' := (\sum_(i | _) _)%MS => Vi'v.
have dxVi': mxdirect Vi'.
  rewrite (cardD1x Pi) in lePm; apply: IHm => //.
  by apply: sub_in2 inj_a => j /andP[].
case/sub_dsumsmx: Vi'v => // u Vi'u def_v _.
rewrite def_v big1 // => j Pi'j; apply/eqP.
have nz_aij: a_ i - a_ j != 0.
  by case/andP: Pi'j => Pj ne_ji; rewrite subr_eq0 eq_sym (inj_in_eq inj_a).
case: (sub_dsumsmx dxVi' (sub0mx 1 _)) => C _ _ uniqC.
rewrite -(eqmx_eq0 (eqmx_scale _ nz_aij)).
rewrite (uniqC (fun k => (a_ i - a_ k) *: u k)) => // [|k Pi'k|].
- by rewrite -(uniqC (fun _ => 0)) ?big1 // => k Pi'k; apply: sub0mx.
- by rewrite scalemx_sub ?Vi'u.
rewrite -{1}(subrr (v *m g)) {1}def_vg def_v scaler_sumr mulmx_suml -sumrB.
by apply: eq_bigr => k /Vi'u/eigenspaceP->; rewrite scalerBl.
Qed.

End Eigenspace.

End RowSpaceTheory.

#[global] Hint Resolve submx_refl : core.
Arguments submxP {F m1 m2 n A B}.
Arguments eq_row_sub [F m n v A].
Arguments row_subP {F m1 m2 n A B}.
Arguments rV_subP {F m1 m2 n A B}.
Arguments row_subPn {F m1 m2 n A B}.
Arguments sub_rVP {F n u v}.
Arguments rV_eqP {F m1 m2 n A B}.
Arguments rowV0Pn {F m n A}.
Arguments rowV0P {F m n A}.
Arguments eqmx0P {F m n A}.
Arguments row_fullP {F m n A}.
Arguments row_freeP {F m n A}.
Arguments eqmxP {F m1 m2 n A B}.
Arguments genmxP {F m1 m2 n A B}.
Arguments addsmx_idPr {F m1 m2 n A B}.
Arguments addsmx_idPl {F m1 m2 n A B}.
Arguments sub_addsmxP {F m1 m2 m3 n A B C}.
Arguments sumsmx_sup [F I] i0 [P m n A B_].
Arguments sumsmx_subP {F I P m n A_ B}.
Arguments sub_sumsmxP {F I P m n A B_}.
Arguments sub_kermxP {F p m n A B}.
Arguments capmx_idPr {F n m1 m2 A B}.
Arguments capmx_idPl {F n m1 m2 A B}.
Arguments bigcapmx_inf [F I] i0 [P m n A_ B].
Arguments sub_bigcapmxP {F I P m n A B_}.
Arguments mxrank_injP {F m n} p {A f}.
Arguments mxdirectP {F n S}.
Arguments mxdirect_addsP {F m1 m2 n A B}.
Arguments mxdirect_sumsP {F I P n A_}.
Arguments mxdirect_sumsE {F I P n S_}.
Arguments eigenspaceP {F n g a m W}.
Arguments eigenvalueP {F n g a}.
Arguments submx_rowsub [F m1 m2 m3 n] h [f g A] _ : rename.
Arguments eqmx_rowsub [F m1 m2 m3 n] h [f g A] _ : rename.

Arguments mxrank {F m%N n%N} A%MS.
Arguments complmx {F m%N n%N} A%MS.
Arguments row_full {F m%N n%N} A%MS.
Arguments submx {F m1%N m2%N n%N} A%MS B%MS : rename.
Arguments ltmx {F m1%N m2%N n%N} A%MS B%MS.
Arguments eqmx {F m1%N m2%N n%N} A%MS B%MS.
Arguments addsmx {F m1%N m2%N n%N} A%MS B%MS : rename.
Arguments capmx {F m1%N m2%N n%N} A%MS B%MS : rename.
Arguments diffmx {F m1%N m2%N n%N} A%MS B%MS : rename.
Arguments genmx {F m%N n%N} A%R : rename.
Notation "\rank A" := (mxrank A) : nat_scope.
Notation "<< A >>" := (genmx A) : matrix_set_scope.
Notation "A ^C" := (complmx A) : matrix_set_scope.
Notation "A <= B" := (submx A B) : matrix_set_scope.
Notation "A < B" := (ltmx A B) : matrix_set_scope.
Notation "A <= B <= C" := ((submx A B) && (submx B C)) : matrix_set_scope.
Notation "A < B <= C" := (ltmx A B && submx B C) : matrix_set_scope.
Notation "A <= B < C" := (submx A B && ltmx B C) : matrix_set_scope.
Notation "A < B < C" := (ltmx A B && ltmx B C) : matrix_set_scope.
Notation "A == B" := ((submx A B) && (submx B A)) : matrix_set_scope.
Notation "A :=: B" := (eqmx A B) : matrix_set_scope.
Notation "A + B" := (addsmx A B) : matrix_set_scope.
Notation "A :&: B" := (capmx A B) : matrix_set_scope.
Notation "A :\: B" := (diffmx A B) : matrix_set_scope.
Notation mxdirect S := (mxdirect_def (Phantom 'M_(_,_) S%MS)).

Notation "\sum_ ( i <- r | P ) B" :=
  (\big[addsmx/0%R]_(i <- r | P%B) B%MS) : matrix_set_scope.
Notation "\sum_ ( i <- r ) B" :=
  (\big[addsmx/0%R]_(i <- r) B%MS) : matrix_set_scope.
Notation "\sum_ ( m <= i < n | P ) B" :=
  (\big[addsmx/0%R]_(m <= i < n | P%B) B%MS) : matrix_set_scope.
Notation "\sum_ ( m <= i < n ) B" :=
  (\big[addsmx/0%R]_(m <= i < n) B%MS) : matrix_set_scope.
Notation "\sum_ ( i | P ) B" :=
  (\big[addsmx/0%R]_(i | P%B) B%MS) : matrix_set_scope.
Notation "\sum_ i B" :=
  (\big[addsmx/0%R]_i B%MS) : matrix_set_scope.
Notation "\sum_ ( i : t | P ) B" :=
  (\big[addsmx/0%R]_(i : t | P%B) B%MS) (only parsing) : matrix_set_scope.
Notation "\sum_ ( i : t ) B" :=
  (\big[addsmx/0%R]_(i : t) B%MS) (only parsing) : matrix_set_scope.
Notation "\sum_ ( i < n | P ) B" :=
  (\big[addsmx/0%R]_(i < n | P%B) B%MS) : matrix_set_scope.
Notation "\sum_ ( i < n ) B" :=
  (\big[addsmx/0%R]_(i < n) B%MS) : matrix_set_scope.
Notation "\sum_ ( i 'in' A | P ) B" :=
  (\big[addsmx/0%R]_(i in A | P%B) B%MS) : matrix_set_scope.
Notation "\sum_ ( i 'in' A ) B" :=
  (\big[addsmx/0%R]_(i in A) B%MS) : matrix_set_scope.

Notation "\bigcap_ ( i <- r | P ) B" :=
  (\big[capmx/1%:M]_(i <- r | P%B) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i <- r ) B" :=
  (\big[capmx/1%:M]_(i <- r) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( m <= i < n | P ) B" :=
  (\big[capmx/1%:M]_(m <= i < n | P%B) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( m <= i < n ) B" :=
  (\big[capmx/1%:M]_(m <= i < n) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i | P ) B" :=
  (\big[capmx/1%:M]_(i | P%B) B%MS) : matrix_set_scope.
Notation "\bigcap_ i B" :=
  (\big[capmx/1%:M]_i B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i : t | P ) B" :=
  (\big[capmx/1%:M]_(i : t | P%B) B%MS) (only parsing) : matrix_set_scope.
Notation "\bigcap_ ( i : t ) B" :=
  (\big[capmx/1%:M]_(i : t) B%MS) (only parsing) : matrix_set_scope.
Notation "\bigcap_ ( i < n | P ) B" :=
  (\big[capmx/1%:M]_(i < n | P%B) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i < n ) B" :=
  (\big[capmx/1%:M]_(i < n) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i 'in' A | P ) B" :=
  (\big[capmx/1%:M]_(i in A | P%B) B%MS) : matrix_set_scope.
Notation "\bigcap_ ( i 'in' A ) B" :=
  (\big[capmx/1%:M]_(i in A) B%MS) : matrix_set_scope.

Notation stablemx V f := (V%MS *m f%R <= V%MS)%MS.

Section Stability.

Variable (F : fieldType).

Lemma eqmx_stable m m' n (V : 'M[F]_(m, n)) (V' : 'M[F]_(m', n)) (f : 'M[F]_n) :
  (V :=: V')%MS -> stablemx V f = stablemx V' f.
Proof. by move=> eqVV'; rewrite (eqmxMr _ eqVV') eqVV'. Qed.

Section FixedDim.

Variables (m n : nat) (V W : 'M[F]_(m, n)) (f g : 'M[F]_n).

Lemma stablemx_row_base : (stablemx (row_base V) f) = (stablemx V f).
Proof. by apply: eqmx_stable; apply: eq_row_base. Qed.

Lemma stablemx_full : row_full V -> stablemx V f. Proof. exact: submx_full. Qed.

Lemma stablemxM : stablemx V f -> stablemx V g -> stablemx V (f *m g).
Proof. by move=> f_stab /(submx_trans _)->//; rewrite mulmxA submxMr. Qed.

Lemma stablemxD : stablemx V f -> stablemx V g -> stablemx V (f + g).
Proof. by move=> f_stab g_stab; rewrite mulmxDr addmx_sub. Qed.

Lemma stablemxN : stablemx V (- f) = stablemx V f.
Proof. by rewrite mulmxN eqmx_opp. Qed.

Lemma stablemxC x : stablemx V x%:M.
Proof. by rewrite mul_mx_scalar scalemx_sub. Qed.

Lemma stablemx0 : stablemx V 0. Proof. by rewrite mulmx0 sub0mx. Qed.

Lemma stableDmx : stablemx V f -> stablemx W f -> stablemx (V + W)%MS f.
Proof. by move=> fV fW; rewrite addsmxMr addsmxS. Qed.

Lemma stableNmx : stablemx (- V) f = stablemx V f.
Proof. by rewrite mulNmx !eqmx_opp. Qed.

Lemma stable0mx : stablemx (0 : 'M_(m, n)) f. Proof. by rewrite mul0mx. Qed.

End FixedDim.

Lemma stableCmx (m n : nat) x (f : 'M[F]_(m, n)) : stablemx x%:M f.
Proof.
have [->|x_neq0] := eqVneq x 0; first by rewrite mul_scalar_mx scale0r sub0mx.
by rewrite -![x%:M]scalemx1 eqmx_scale// submx_full// -sub1mx.
Qed.

Lemma stablemx_sums (n : nat) (I : finType) (V_ : I -> 'M[F]_n) (f : 'M_n) :
  (forall i, stablemx (V_ i) f) -> stablemx (\sum_i V_ i)%MS f.
Proof.
by move=> fV; rewrite sumsmxMr; apply/sumsmx_subP => i; rewrite (sumsmx_sup i).
Qed.

Lemma stablemx_unit (n : nat) (V f : 'M[F]_n) : V \in unitmx -> stablemx V f.
Proof. by move=> Vunit; rewrite submx_full ?row_full_unit. Qed.

Section Commutation.

Variable (n : nat).
Implicit Types (f g : 'M[F]_n).

Lemma comm_mx_stable (f g : 'M[F]_n) : comm_mx f g -> stablemx f g.
Proof. by move=> comm_fg; rewrite [_ *m _]comm_fg mulmx_sub. Qed.

Lemma comm_mx_stable_ker (f g : 'M[F]_n) :
  comm_mx f g -> stablemx (kermx f) g.
Proof.
move=> comm_fg; apply/sub_kermxP.
by rewrite -mulmxA -[g *m _]comm_fg mulmxA mulmx_ker mul0mx.
Qed.

Lemma comm_mx_stable_eigenspace (f g : 'M[F]_n) a :
  comm_mx f g -> stablemx (eigenspace f a) g.
Proof.
move=> cfg; rewrite comm_mx_stable_ker//.
by apply/comm_mx_sym/comm_mxB => //; apply:comm_mx_scalar.
Qed.

End Commutation.

End Stability.

Section DirectSums.
Variables (F : fieldType) (I : finType) (P : pred I).

Lemma mxdirect_delta n f : {in P &, injective f} ->
  mxdirect (\sum_(i | P i) <<delta_mx 0 (f i) : 'rV[F]_n>>).
Proof.
pose fP := image f P => Uf; have UfP: uniq fP by apply/dinjectiveP.
suffices /mxdirectP : mxdirect (\sum_i <<delta_mx 0 i : 'rV[F]_n>>).
  rewrite /= !(bigID [mem fP] predT) -!big_uniq //= !big_map !big_enum.
  by move/mxdirectP; rewrite mxdirect_addsE => /andP[].
apply/mxdirectP=> /=; transitivity (mxrank (1%:M : 'M[F]_n)).
  apply/eqmx_rank; rewrite submx1 mx1_sum_delta summx_sub_sums // => i _.
  by rewrite -(mul_delta_mx (0 : 'I_1)) genmxE submxMl.
rewrite mxrank1 -[LHS]card_ord -sum1_card.
by apply/eq_bigr=> i _; rewrite /= mxrank_gen mxrank_delta.
Qed.

End DirectSums.

Section CardGL.

Variable F : finFieldType.

Lemma card_GL n : n > 0 ->
  #|'GL_n[F]| = (#|F| ^ 'C(n, 2) * \prod_(1 <= i < n.+1) (#|F| ^ i - 1))%N.
Proof.
case: n => // n' _; set n := n'.+1; set p := #|F|.
rewrite big_nat_rev big_add1 -triangular_sum expn_sum -big_split /=.
pose fr m := [pred A : 'M[F]_(m, n) | \rank A == m].
set m := n; rewrite [in m.+1]/m; transitivity #|fr m|.
  by rewrite cardsT /= card_sub; apply: eq_card => A; rewrite -row_free_unit.
have: m <= n by []; elim: m => [_ | m IHm /ltnW-le_mn].
  rewrite (@eq_card1 _ (0 : 'M_(0, n))) ?big_geq //= => A.
  by rewrite flatmx0 !inE !eqxx.
rewrite big_nat_recr // -{}IHm //= !subSS mulnBr muln1 -expnD subnKC //.
rewrite -sum_nat_const /= -sum1_card -add1n.
rewrite (partition_big dsubmx (fr m)) /= => [|A]; last first.
  rewrite !inE -{1}(vsubmxK A); move: {A}(_ A) (_ A) => Ad Au Afull.
  rewrite eqn_leq rank_leq_row -(leq_add2l (\rank Au)) -mxrank_sum_cap.
  rewrite {1 3}[@mxrank]lock addsmxE (eqnP Afull) -lock -addnA.
  by rewrite leq_add ?rank_leq_row ?leq_addr.
apply: eq_bigr => A rAm; rewrite (reindex (col_mx^~ A)) /=; last first.
  exists usubmx => [v _ | vA]; first by rewrite col_mxKu.
  by case/andP=> _ /eqP <-; rewrite vsubmxK.
transitivity #|~: [set v *m A | v in 'rV_m]|; last first.
  rewrite cardsCs setCK card_imset ?card_mx ?card_ord ?mul1n //.
  have [B AB1] := row_freeP rAm; apply: can_inj (mulmx^~ B) _ => v.
  by rewrite -mulmxA AB1 mulmx1.
rewrite -sum1_card; apply: eq_bigl => v; rewrite !inE col_mxKd eqxx.
rewrite andbT eqn_leq rank_leq_row /= -(leq_add2r (\rank (v :&: A)%MS)).
rewrite -addsmxE mxrank_sum_cap (eqnP rAm) addnAC leq_add2r.
rewrite (ltn_leqif (mxrank_leqif_sup _)) ?capmxSl // sub_capmx submx_refl.
by congr (~~ _); apply/submxP/imsetP=> [] [u]; exists u.
Qed.

(* An alternate, somewhat more elementary proof, that does not rely on the *)
(* row-space theory, but directly performs the LUP decomposition.          *)
Lemma LUP_card_GL n : n > 0 ->
  #|'GL_n[F]| = (#|F| ^ 'C(n, 2) * \prod_(1 <= i < n.+1) (#|F| ^ i - 1))%N.
Proof.
case: n => // n' _; set n := n'.+1; set p := #|F|.
rewrite cardsT /= card_sub /GRing.unit /= big_add1 /= -triangular_sum -/n.
elim: {n'}n => [|n IHn].
  rewrite !big_geq // mul1n (@eq_card _ _ predT) ?card_mx //= => M.
  by rewrite {1}[M]flatmx0 -(flatmx0 1%:M) unitmx1.
rewrite !big_nat_recr //= expnD mulnAC mulnA -{}IHn -mulnA mulnC.
set LHS := #|_|; rewrite -[n.+1]muln1 -{2}[n]mul1n {}/LHS.
rewrite -!card_mx subn1 -(cardC1 0) -mulnA; set nzC := predC1 _.
rewrite -sum1_card (partition_big lsubmx nzC) => [|A]; last first.
  rewrite unitmxE unitfE; apply: contra; move/eqP=> v0.
  rewrite -[A]hsubmxK v0 -[n.+1]/(1 + n)%N -col_mx0.
  rewrite -[rsubmx _]vsubmxK -det_tr tr_row_mx !tr_col_mx !trmx0.
  by rewrite det_lblock [0]mx11_scalar det_scalar1 mxE mul0r.
rewrite -sum_nat_const; apply: eq_bigr => /= v /cV0Pn[k nza].
have xrkK: involutive (@xrow F _ _ 0 k).
  by move=> m A /=; rewrite /xrow -row_permM tperm2 row_perm1.
rewrite (reindex_inj (inv_inj (xrkK (1 + n)%N))) /= -[n.+1]/(1 + n)%N.
rewrite (partition_big ursubmx xpredT) //= -sum_nat_const.
apply: eq_bigr => u _; set a : F := v _ _ in nza.
set v1 : 'cV_(1 + n) := xrow 0 k v.
have def_a: usubmx v1 = a%:M.
  by rewrite [_ v1]mx11_scalar mxE lshift0 mxE tpermL.
pose Schur := dsubmx v1 *m (a^-1 *: u).
pose L : 'M_(1 + n) := block_mx a%:M 0 (dsubmx v1) 1%:M.
pose U B : 'M_(1 + n) := block_mx 1 (a^-1 *: u) 0 B.
rewrite (reindex (fun B => L *m U B)); last first.
  exists (fun A1 => drsubmx A1 - Schur) => [B _ | A1].
    by rewrite mulmx_block block_mxKdr mul1mx addrC addKr.
  rewrite !inE mulmx_block !mulmx0 mul0mx !mulmx1 !addr0 mul1mx addrC subrK.
  rewrite mul_scalar_mx scalerA divff // scale1r andbC; case/and3P => /eqP <- _.
  rewrite -{1}(hsubmxK A1) xrowE mul_mx_row row_mxKl -xrowE => /eqP def_v.
  rewrite -def_a block_mxEh vsubmxK /v1 -def_v xrkK.
  apply: trmx_inj; rewrite tr_row_mx tr_col_mx trmx_ursub trmx_drsub trmx_lsub.
  by rewrite hsubmxK vsubmxK.
rewrite -sum1_card; apply: eq_bigl => B; rewrite xrowE unitmxE.
rewrite !det_mulmx unitrM -unitmxE unitmx_perm det_lblock det_ublock.
rewrite !det_scalar1 det1 mulr1 mul1r unitrM unitfE nza -unitmxE.
rewrite mulmx_block !mulmx0 mul0mx !addr0 !mulmx1 mul1mx block_mxKur.
rewrite mul_scalar_mx scalerA divff // scale1r eqxx andbT.
by rewrite block_mxEh mul_mx_row row_mxKl -def_a vsubmxK -xrowE xrkK eqxx andbT.
Qed.

Lemma card_GL_1 : #|'GL_1[F]| = #|F|.-1.
Proof. by rewrite card_GL // mul1n big_nat1 expn1 subn1. Qed.

Lemma card_GL_2 : #|'GL_2[F]| = (#|F| * #|F|.-1 ^ 2 * #|F|.+1)%N.
Proof.
rewrite card_GL // big_ltn // big_nat1 expn1 -(addn1 #|F|) -subn1 -!mulnA.
by rewrite -subn_sqr.
Qed.

End CardGL.

Lemma logn_card_GL_p n p : prime p -> logn p #|'GL_n(p)| = 'C(n, 2).
Proof.
move=> p_pr; have p_gt1 := prime_gt1 p_pr.
have p_i_gt0: p ^ _ > 0 by move=> i; rewrite expn_gt0 ltnW.
rewrite (card_GL _ (ltn0Sn n.-1)) card_ord Fp_cast // big_add1 /=.
pose p'gt0 m := m > 0 /\ logn p m = 0%N.
suffices [Pgt0 p'P]: p'gt0 (\prod_(0 <= i < n.-1.+1) (p ^ i.+1 - 1))%N.
  by rewrite lognM // p'P pfactorK // addn0; case n.
apply: big_ind => [|m1 m2 [m10 p'm1] [m20]|i _]; rewrite {}/p'gt0 ?logn1 //.
  by rewrite muln_gt0 m10 lognM ?p'm1.
rewrite lognE -if_neg subn_gt0 p_pr /= -{1 2}(exp1n i.+1) ltn_exp2r // p_gt1.
by rewrite dvdn_subr ?dvdn_exp // gtnNdvd.
Qed.

Section MatrixAlgebra.

Variables F : fieldType.

Local Notation "A \in R" := (@submx F _ _ _ (mxvec A) R).

Lemma mem0mx m n (R : 'A_(m, n)) : 0 \in R.
Proof. by rewrite linear0 sub0mx. Qed.

Lemma memmx0 n A : (A \in (0 : 'A_n)) -> A = 0.
Proof. by rewrite submx0 mxvec_eq0; move/eqP. Qed.

Lemma memmx1 n (A : 'M_n) : (A \in mxvec 1%:M) = is_scalar_mx A.
Proof.
apply/sub_rVP/is_scalar_mxP=> [[a] | [a ->]].
  by rewrite -linearZ scale_scalar_mx mulr1 => /(can_inj mxvecK); exists a.
by exists a; rewrite -linearZ scale_scalar_mx mulr1.
Qed.

Lemma memmx_subP m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
  reflect (forall A, A \in R1 -> A \in R2) (R1 <= R2)%MS.
Proof.
apply: (iffP idP) => [sR12 A R1_A | sR12]; first exact: submx_trans sR12.
by apply/rV_subP=> vA; rewrite -(vec_mxK vA); apply: sR12.
Qed.
Arguments memmx_subP {m1 m2 n R1 R2}.

Lemma memmx_eqP m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
  reflect (forall A, (A \in R1) = (A \in R2)) (R1 == R2)%MS.
Proof.
apply: (iffP eqmxP) => [eqR12 A | eqR12]; first by rewrite eqR12.
by apply/eqmxP/rV_eqP=> vA; rewrite -(vec_mxK vA) eqR12.
Qed.
Arguments memmx_eqP {m1 m2 n R1 R2}.

Lemma memmx_addsP m1 m2 n A (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
  reflect (exists D, [/\ D.1 \in R1, D.2 \in R2 & A = D.1 + D.2])
          (A \in R1 + R2)%MS.
Proof.
apply: (iffP sub_addsmxP) => [[u /(canRL mxvecK)->] | [D []]].
  exists (vec_mx (u.1 *m R1), vec_mx (u.2 *m R2)).
  by rewrite /= linearD !vec_mxK !submxMl.
case/submxP=> u1 defD1 /submxP[u2 defD2] ->.
by exists (u1, u2); rewrite linearD /= defD1 defD2.
Qed.
Arguments memmx_addsP {m1 m2 n A R1 R2}.

Lemma memmx_sumsP (I : finType) (P : pred I) n (A : 'M_n) R_ :
  reflect (exists2 A_, A = \sum_(i | P i) A_ i & forall i, A_ i \in R_ i)
          (A \in \sum_(i | P i) R_ i)%MS.
Proof.
apply: (iffP sub_sumsmxP) => [[C defA] | [A_ -> R_A] {A}].
  exists (fun i => vec_mx (C i *m R_ i)) => [|i].
    by rewrite -linear_sum -defA /= mxvecK.
  by rewrite vec_mxK submxMl.
exists (fun i => mxvec (A_ i) *m pinvmx (R_ i)).
by rewrite linear_sum; apply: eq_bigr => i _; rewrite mulmxKpV.
Qed.
Arguments memmx_sumsP {I P n A R_}.

Lemma has_non_scalar_mxP m n (R : 'A_(m, n)) :
    (1%:M \in R)%MS ->
  reflect (exists2 A, A \in R & ~~ is_scalar_mx A)%MS (1 < \rank R).
Proof.
case: (posnP n) => [-> | n_gt0] in R *; set S := mxvec _ => sSR.
  by rewrite [R]thinmx0 mxrank0; right; case; rewrite /is_scalar_mx ?insubF.
have rankS: \rank S = 1%N.
  apply/eqP; rewrite eqn_leq rank_leq_row lt0n mxrank_eq0 mxvec_eq0.
  by rewrite -mxrank_eq0 mxrank1 -lt0n.
rewrite -{2}rankS (ltn_leqif (mxrank_leqif_sup sSR)).
apply: (iffP idP) => [/row_subPn[i] | [A sAR]].
  rewrite -[row i R]vec_mxK memmx1; set A := vec_mx _ => nsA.
  by exists A; rewrite // vec_mxK row_sub.
by rewrite -memmx1; apply/contra/submx_trans.
Qed.

Definition mulsmx m1 m2 n (R1 : 'A[F]_(m1, n)) (R2 : 'A_(m2, n)) :=
  (\sum_i <<R1 *m lin_mx (mulmxr (vec_mx (row i R2)))>>)%MS.

Arguments mulsmx {m1%N m2%N n%N} R1%MS R2%MS.

Local Notation "R1 * R2" := (mulsmx R1 R2) : matrix_set_scope.

Lemma genmx_muls m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
  <<(R1 * R2)%MS>>%MS = (R1 * R2)%MS.
Proof. by rewrite genmx_sums; apply: eq_bigr => i; rewrite genmx_id. Qed.

Lemma mem_mulsmx m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) A1 A2 :
  (A1 \in R1 -> A2 \in R2 -> A1 *m A2 \in R1 * R2)%MS.
Proof.
move=> R_A1 R_A2; rewrite -[A2]mxvecK; case/submxP: R_A2 => a ->{A2}.
rewrite mulmx_sum_row !linear_sum summx_sub // => i _.
rewrite !linearZ scalemx_sub {a}//= (sumsmx_sup i) // genmxE.
rewrite -[A1]mxvecK; case/submxP: R_A1 => a ->{A1}.
by apply/submxP; exists a; rewrite mulmxA mul_rV_lin.
Qed.

Lemma mulsmx_subP m1 m2 m n
                 (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) (R : 'A_(m, n)) :
  reflect (forall A1 A2, A1 \in R1 -> A2 \in R2 -> A1 *m A2 \in R)
          (R1 * R2 <= R)%MS.
Proof.
apply: (iffP memmx_subP) => [sR12R A1 A2 R_A1 R_A2 | sR12R A].
  by rewrite sR12R ?mem_mulsmx.
case/memmx_sumsP=> A_ -> R_A; rewrite linear_sum summx_sub //= => j _.
rewrite (submx_trans (R_A _)) // genmxE; apply/row_subP=> i.
by rewrite row_mul mul_rV_lin sR12R ?vec_mxK ?row_sub.
Qed.
Arguments mulsmx_subP {m1 m2 m n R1 R2 R}.

Lemma mulsmxS m1 m2 m3 m4 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n))
                            (R3 : 'A_(m3, n)) (R4 : 'A_(m4, n)) :
  (R1 <= R3 -> R2 <= R4 -> R1 * R2 <= R3 * R4)%MS.
Proof.
move=> sR13 sR24; apply/mulsmx_subP=> A1 A2 R_A1 R_A2.
by apply: mem_mulsmx; [apply: submx_trans sR13 | apply: submx_trans sR24].
Qed.

Lemma muls_eqmx m1 m2 m3 m4 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n))
                              (R3 : 'A_(m3, n)) (R4 : 'A_(m4, n)) :
  (R1 :=: R3 -> R2 :=: R4 -> R1 * R2 = R3 * R4)%MS.
Proof.
move=> eqR13 eqR24; rewrite -(genmx_muls R1 R2) -(genmx_muls R3 R4).
by apply/genmxP; rewrite !mulsmxS ?eqR13 ?eqR24.
Qed.

Lemma mulsmxP m1 m2 n A (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
  reflect (exists2 A1, forall i, A1 i \in R1
            & exists2 A2, forall i, A2 i \in R2
           & A = \sum_(i < n ^ 2) A1 i *m A2 i)
          (A \in R1 * R2)%MS.
Proof.
apply: (iffP idP) => [R_A|[A1 R_A1 [A2 R_A2 ->{A}]]]; last first.
  by rewrite linear_sum summx_sub // => i _; rewrite mem_mulsmx.
have{R_A}: (A \in R1 * <<R2>>)%MS.
  by apply: memmx_subP R_A; rewrite mulsmxS ?genmxE.
case/memmx_sumsP=> A_ -> R_A; pose A2_ i := vec_mx (row i <<R2>>%MS).
pose A1_ i := mxvec (A_ i) *m pinvmx (R1 *m lin_mx (mulmxr (A2_ i))) *m R1.
exists (vec_mx \o A1_) => [i|]; first by rewrite vec_mxK submxMl.
exists A2_ => [i|]; first by rewrite vec_mxK -(genmxE R2) row_sub.
apply: eq_bigr => i _; rewrite -[_ *m _](mx_rV_lin (mulmxr_linear _ _)).
by rewrite -mulmxA mulmxKpV ?mxvecK // -(genmxE (_ *m _)) R_A.
Qed.
Arguments mulsmxP {m1 m2 n A R1 R2}.

Lemma mulsmxA m1 m2 m3 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) (R3 : 'A_(m3, n)) :
  (R1 * (R2 * R3) = R1 * R2 * R3)%MS.
Proof.
rewrite -(genmx_muls (_ * _)%MS) -genmx_muls; apply/genmxP/andP; split.
  apply/mulsmx_subP=> A1 A23 R_A1; case/mulsmxP=> A2 R_A2 [A3 R_A3 ->{A23}].
  by rewrite !linear_sum summx_sub //= => i _; rewrite mulmxA !mem_mulsmx.
apply/mulsmx_subP=> _ A3 /mulsmxP[A1 R_A1 [A2 R_A2 ->]] R_A3.
rewrite mulmx_suml linear_sum summx_sub //= => i _.
by rewrite -mulmxA !mem_mulsmx.
Qed.

Lemma mulsmxDl m1 m2 m3 n
               (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) (R3 : 'A_(m3, n)) :
  ((R1 + R2) * R3 = R1 * R3 + R2 * R3)%MS.
Proof.
rewrite -(genmx_muls R2 R3) -(genmx_muls R1 R3) -genmx_muls -genmx_adds.
apply/genmxP; rewrite andbC addsmx_sub !mulsmxS ?addsmxSl ?addsmxSr //=.
apply/mulsmx_subP=> _ A3 /memmx_addsP[A [R_A1 R_A2 ->]] R_A3.
by rewrite mulmxDl linearD addmx_sub_adds ?mem_mulsmx.
Qed.

Lemma mulsmxDr m1 m2 m3 n
               (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) (R3 : 'A_(m3, n)) :
  (R1 * (R2 + R3) = R1 * R2 + R1 * R3)%MS.
Proof.
rewrite -(genmx_muls R1 R3) -(genmx_muls R1 R2) -genmx_muls -genmx_adds.
apply/genmxP; rewrite andbC addsmx_sub !mulsmxS ?addsmxSl ?addsmxSr //=.
apply/mulsmx_subP=> A1 _ R_A1 /memmx_addsP[A [R_A2 R_A3 ->]].
by rewrite mulmxDr linearD addmx_sub_adds ?mem_mulsmx.
Qed.

Lemma mulsmx0 m1 m2 n (R1 : 'A_(m1, n)) : (R1 * (0 : 'A_(m2, n)) = 0)%MS.
Proof.
apply/eqP; rewrite -submx0; apply/mulsmx_subP=> A1 A0 _.
by rewrite [A0 \in 0]eqmx0 => /memmx0->; rewrite mulmx0 mem0mx.
Qed.

Lemma muls0mx m1 m2 n (R2 : 'A_(m2, n)) : ((0 : 'A_(m1, n)) * R2 = 0)%MS.
Proof.
apply/eqP; rewrite -submx0; apply/mulsmx_subP=> A0 A2.
by rewrite [A0 \in 0]eqmx0 => /memmx0->; rewrite mul0mx mem0mx.
Qed.

Definition left_mx_ideal m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :=
  (R1 * R2 <= R2)%MS.

Definition right_mx_ideal m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :=
  (R2 * R1 <= R2)%MS.

Definition mx_ideal m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :=
  left_mx_ideal R1 R2 && right_mx_ideal R1 R2.

Definition mxring_id m n (R : 'A_(m, n)) e :=
  [/\ e != 0,
      e \in R,
      forall A, A \in R -> e *m A = A
    & forall A, A \in R -> A *m e = A]%MS.

Definition has_mxring_id m n (R : 'A[F]_(m , n)) :=
  (R != 0) &&
  (row_mx 0 (row_mx (mxvec R) (mxvec R))
    <= row_mx (cokermx R) (row_mx (lin_mx (mulmx R \o lin_mulmx))
                                  (lin_mx (mulmx R \o lin_mulmxr))))%MS.

Definition mxring m n (R : 'A_(m, n)) :=
  left_mx_ideal R R && has_mxring_id R.

Lemma mxring_idP m n (R : 'A_(m, n)) :
  reflect (exists e, mxring_id R e) (has_mxring_id R).
Proof.
apply: (iffP andP) => [[nzR] | [e [nz_e Re ideR idRe]]].
  case/submxP=> v; rewrite -[v]vec_mxK; move/vec_mx: v => e.
  rewrite !mul_mx_row; case/eq_row_mx => /eqP.
  rewrite eq_sym -submxE => Re.
  case/eq_row_mx; rewrite !{1}mul_rV_lin1 /= mxvecK.
  set u := (_ *m _) => /(can_inj mxvecK) idRe /(can_inj mxvecK) ideR.
  exists e; split=> // [ | A /submxP[a defA] | A /submxP[a defA]].
  - by apply: contra nzR; rewrite ideR => /eqP->; rewrite !linear0.
  - by rewrite -{2}[A]mxvecK defA idRe mulmxA mx_rV_lin -defA /= mxvecK.
  by rewrite -{2}[A]mxvecK defA ideR mulmxA mx_rV_lin -defA /= mxvecK.
split.
  by apply: contraNneq nz_e => R0; rewrite R0 eqmx0 in Re; rewrite (memmx0 Re).
apply/submxP; exists (mxvec e); rewrite !mul_mx_row !{1}mul_rV_lin1.
rewrite submxE in Re; rewrite {Re}(eqP Re).
congr (row_mx 0 (row_mx (mxvec _) (mxvec _))); apply/row_matrixP=> i.
  by rewrite !row_mul !mul_rV_lin1 /= mxvecK ideR vec_mxK ?row_sub.
by rewrite !row_mul !mul_rV_lin1 /= mxvecK idRe vec_mxK ?row_sub.
Qed.
Arguments mxring_idP {m n R}.

Section CentMxDef.

Variables (m n : nat) (R : 'A[F]_(m, n)).

Definition cent_mx_fun (B : 'M[F]_n) := R *m lin_mx (mulmxr B \- mulmx B).

Lemma cent_mx_fun_is_linear : linear cent_mx_fun.
Proof.
move=> a A B; apply/row_matrixP=> i; rewrite linearP row_mul mul_rV_lin.
rewrite /= [row i _ as v in a *: v]row_mul mul_rV_lin row_mul mul_rV_lin.
by rewrite -linearP -(linearP [linear of mulmx _ \- mulmxr _]).
Qed.
Canonical cent_mx_fun_additive := Additive cent_mx_fun_is_linear.
Canonical cent_mx_fun_linear := Linear cent_mx_fun_is_linear.

Definition cent_mx := kermx (lin_mx cent_mx_fun).

Definition center_mx := (R :&: cent_mx)%MS.

End CentMxDef.

Local Notation "''C' ( R )" := (cent_mx R) : matrix_set_scope.
Local Notation "''Z' ( R )" := (center_mx R) : matrix_set_scope.

Lemma cent_rowP m n B (R : 'A_(m, n)) :
  reflect (forall i (A := vec_mx (row i R)), A *m B = B *m A) (B \in 'C(R))%MS.
Proof.
apply: (iffP sub_kermxP); rewrite mul_vec_lin => cBE.
  move/(canRL mxvecK): cBE => cBE i A /=; move/(congr1 (row i)): cBE.
  rewrite row_mul mul_rV_lin -/A; move/(canRL mxvecK).
  by move/(canRL (subrK _)); rewrite !linear0 add0r.
apply: (canLR vec_mxK); apply/row_matrixP=> i.
by rewrite row_mul mul_rV_lin /= cBE subrr !linear0.
Qed.
Arguments cent_rowP {m n B R}.

Lemma cent_mxP m n B (R : 'A_(m, n)) :
  reflect (forall A, A \in R -> A *m B = B *m A) (B \in 'C(R))%MS.
Proof.
apply: (iffP cent_rowP) => cEB => [A sAE | i A].
  rewrite -[A]mxvecK -(mulmxKpV sAE); move: (mxvec A *m _) => u.
  rewrite !mulmx_sum_row !linear_sum mulmx_suml; apply: eq_bigr => i _ /=.
  by rewrite !linearZ -scalemxAl /= cEB.
by rewrite cEB // vec_mxK row_sub.
Qed.
Arguments cent_mxP {m n B R}.

Lemma scalar_mx_cent m n a (R : 'A_(m, n)) : (a%:M \in 'C(R))%MS.
Proof. by apply/cent_mxP=> A _; apply: scalar_mxC. Qed.

Lemma center_mx_sub m n (R : 'A_(m, n)) : ('Z(R) <= R)%MS.
Proof. exact: capmxSl. Qed.

Lemma center_mxP m n A (R : 'A_(m, n)) :
  reflect (A \in R /\ forall B, B \in R -> B *m A = A *m B)
          (A \in 'Z(R))%MS.
Proof.
rewrite sub_capmx; case R_A: (A \in R); last by right; case.
by apply: (iffP cent_mxP) => [cAR | [_ cAR]].
Qed.
Arguments center_mxP {m n A R}.

Lemma mxring_id_uniq m n (R : 'A_(m, n)) e1 e2 :
  mxring_id R e1 -> mxring_id R e2 -> e1 = e2.
Proof.
by case=> [_ Re1 idRe1 _] [_ Re2 _ ide2R]; rewrite -(idRe1 _ Re2) ide2R.
Qed.

Lemma cent_mx_ideal m n (R : 'A_(m, n)) : left_mx_ideal 'C(R)%MS 'C(R)%MS.
Proof.
apply/mulsmx_subP=> A1 A2 C_A1 C_A2; apply/cent_mxP=> B R_B.
by rewrite mulmxA (cent_mxP C_A1) // -!mulmxA (cent_mxP C_A2).
Qed.

Lemma cent_mx_ring m n (R : 'A_(m, n)) : n > 0 -> mxring 'C(R)%MS.
Proof.
move=> n_gt0; rewrite /mxring cent_mx_ideal; apply/mxring_idP.
exists 1%:M; split=> [||A _|A _]; rewrite ?mulmx1 ?mul1mx ?scalar_mx_cent //.
by rewrite -mxrank_eq0 mxrank1 -lt0n.
Qed.

Lemma mxdirect_adds_center m1 m2 n (R1 : 'A_(m1, n)) (R2 : 'A_(m2, n)) :
    mx_ideal (R1 + R2)%MS R1 -> mx_ideal (R1 + R2)%MS R2 ->
    mxdirect (R1 + R2) ->
  ('Z((R1 + R2)%MS) :=: 'Z(R1) + 'Z(R2))%MS.
Proof.
case/andP=> idlR1 idrR1 /andP[idlR2 idrR2] /mxdirect_addsP dxR12.
apply/eqmxP/andP; split.
  apply/memmx_subP=> z0; rewrite sub_capmx => /andP[].
  case/memmx_addsP=> z [R1z1 R2z2 ->{z0}] Cz.
  rewrite linearD addmx_sub_adds //= ?sub_capmx ?R1z1 ?R2z2 /=.
    apply/cent_mxP=> A R1_A; have R_A := submx_trans R1_A (addsmxSl R1 R2).
    have Rz2 := submx_trans R2z2 (addsmxSr R1 R2).
    rewrite -{1}[z.1](addrK z.2) mulmxBr (cent_mxP Cz) // mulmxDl.
    rewrite [A *m z.2]memmx0 1?[z.2 *m A]memmx0 ?addrK //.
      by rewrite -dxR12 sub_capmx (mulsmx_subP idlR1) // (mulsmx_subP idrR2).
    by rewrite -dxR12 sub_capmx (mulsmx_subP idrR1) // (mulsmx_subP idlR2).
  apply/cent_mxP=> A R2_A; have R_A := submx_trans R2_A (addsmxSr R1 R2).
  have Rz1 := submx_trans R1z1 (addsmxSl R1 R2).
  rewrite -{1}[z.2](addKr z.1) mulmxDr (cent_mxP Cz) // mulmxDl.
  rewrite mulmxN [A *m z.1]memmx0 1?[z.1 *m A]memmx0 ?addKr //.
    by rewrite -dxR12 sub_capmx (mulsmx_subP idrR1) // (mulsmx_subP idlR2).
  by rewrite -dxR12 sub_capmx (mulsmx_subP idlR1) // (mulsmx_subP idrR2).
rewrite addsmx_sub; apply/andP; split.
  apply/memmx_subP=> z; rewrite sub_capmx => /andP[R1z cR1z].
  have Rz := submx_trans R1z (addsmxSl R1 R2).
  rewrite sub_capmx Rz; apply/cent_mxP=> A0.
  case/memmx_addsP=> A [R1_A1 R2_A2] ->{A0}.
  have R_A2 := submx_trans R2_A2 (addsmxSr R1 R2).
  rewrite mulmxDl mulmxDr (cent_mxP cR1z) //; congr (_ + _).
  rewrite [A.2 *m z]memmx0 1?[z *m A.2]memmx0 //.
    by rewrite -dxR12 sub_capmx (mulsmx_subP idrR1) // (mulsmx_subP idlR2).
  by rewrite -dxR12 sub_capmx (mulsmx_subP idlR1) // (mulsmx_subP idrR2).
apply/memmx_subP=> z; rewrite !sub_capmx => /andP[R2z cR2z].
have Rz := submx_trans R2z (addsmxSr R1 R2); rewrite Rz.
apply/cent_mxP=> _ /memmx_addsP[A [R1_A1 R2_A2 ->]].
rewrite mulmxDl mulmxDr (cent_mxP cR2z _ R2_A2) //; congr (_ + _).
have R_A1 := submx_trans R1_A1 (addsmxSl R1 R2).
rewrite [A.1 *m z]memmx0 1?[z *m A.1]memmx0 //.
  by rewrite -dxR12 sub_capmx (mulsmx_subP idlR1) // (mulsmx_subP idrR2).
by rewrite -dxR12 sub_capmx (mulsmx_subP idrR1) // (mulsmx_subP idlR2).
Qed.

Lemma mxdirect_sums_center (I : finType) m n (R : 'A_(m, n)) R_ :
    (\sum_i R_ i :=: R)%MS -> mxdirect (\sum_i R_ i) ->
    (forall i : I, mx_ideal R (R_ i)) ->
  ('Z(R) :=: \sum_i 'Z(R_ i))%MS.
Proof.
move=> defR dxR idealR.
have sR_R: (R_ _ <= R)%MS by move=> i; rewrite -defR (sumsmx_sup i).
have anhR i j A B : i != j -> A \in R_ i -> B \in R_ j -> A *m B = 0.
  move=> ne_ij RiA RjB; apply: memmx0.
  have [[_ idRiR] [idRRj _]] := (andP (idealR i), andP (idealR j)).
  rewrite -(mxdirect_sumsP dxR j) // sub_capmx (sumsmx_sup i) //.
    by rewrite (mulsmx_subP idRRj) // (memmx_subP (sR_R i)).
  by rewrite (mulsmx_subP idRiR) // (memmx_subP (sR_R j)).
apply/eqmxP/andP; split.
  apply/memmx_subP=> Z; rewrite sub_capmx => /andP[].
  rewrite -{1}defR => /memmx_sumsP[z ->{Z} Rz cRz].
  apply/memmx_sumsP; exists z => // i; rewrite sub_capmx Rz.
  apply/cent_mxP=> A RiA; have:= cent_mxP cRz A (memmx_subP (sR_R i) A RiA).
  rewrite (bigD1 i) //= mulmxDl mulmxDr mulmx_suml mulmx_sumr.
  by rewrite !big1 ?addr0 // => j; last rewrite eq_sym; move/anhR->.
apply/sumsmx_subP => i _; apply/memmx_subP=> z; rewrite sub_capmx.
case/andP=> Riz cRiz; rewrite sub_capmx (memmx_subP (sR_R i)) //=.
apply/cent_mxP=> A; rewrite -{1}defR; case/memmx_sumsP=> a -> R_a.
rewrite (bigD1 i) // mulmxDl mulmxDr mulmx_suml mulmx_sumr.
rewrite !big1 => [|j|j]; first by rewrite !addr0 (cent_mxP cRiz).
  by rewrite eq_sym => /anhR->.
by move/anhR->.
Qed.

End MatrixAlgebra.

Arguments mulsmx {F m1%N m2%N n%N} R1%MS R2%MS.
Arguments left_mx_ideal {F m1%N m2%N n%N} R%MS S%MS : rename.
Arguments right_mx_ideal {F m1%N m2%N n%N} R%MS S%MS : rename.
Arguments mx_ideal {F m1%N m2%N n%N} R%MS S%MS : rename.
Arguments mxring_id {F m%N n%N} R%MS e%R.
Arguments has_mxring_id {F m%N n%N} R%MS.
Arguments mxring {F m%N n%N} R%MS.
Arguments cent_mx {F m%N n%N} R%MS.
Arguments center_mx {F m%N n%N} R%MS.

Notation "A \in R" := (submx (mxvec A) R) : matrix_set_scope.
Notation "R * S" := (mulsmx R S) : matrix_set_scope.
Notation "''C' ( R )" := (cent_mx R) : matrix_set_scope.
Notation "''C_' R ( S )" := (R :&: 'C(S))%MS : matrix_set_scope.
Notation "''C_' ( R ) ( S )" := ('C_R(S))%MS (only parsing) : matrix_set_scope.
Notation "''Z' ( R )" := (center_mx R) : matrix_set_scope.

Arguments memmx_subP {F m1 m2 n R1 R2}.
Arguments memmx_eqP {F m1 m2 n R1 R2}.
Arguments memmx_addsP {F m1 m2 n} A {R1 R2}.
Arguments memmx_sumsP {F I P n A R_}.
Arguments mulsmx_subP {F m1 m2 m n R1 R2 R}.
Arguments mulsmxP {F m1 m2 n A R1 R2}.
Arguments mxring_idP F {m n R}.
Arguments cent_rowP {F m n B R}.
Arguments cent_mxP {F m n B R}.
Arguments center_mxP {F m n A R}.

(* Parametricity for the row-space/F-algebra theory.                         *)
Section MapMatrixSpaces.

Variables (aF rF : fieldType) (f : {rmorphism aF -> rF}).
Local Notation "A ^f" := (map_mx f A) : ring_scope.

Lemma Gaussian_elimination_map m n (A : 'M_(m, n)) :
  Gaussian_elimination A^f = ((col_ebase A)^f, (row_ebase A)^f, \rank A).
Proof.
rewrite mxrankE /row_ebase /col_ebase unlock.
elim: m n A => [|m IHm] [|n] A /=; rewrite ?map_mx1 //.
set pAnz := [pred k | A k.1 k.2 != 0].
rewrite (@eq_pick _ _ pAnz) => [|k]; last by rewrite /= mxE fmorph_eq0.
case: {+}(pick _) => [[i j]|]; last by rewrite !map_mx1.
rewrite mxE -fmorphV  -map_xcol -map_xrow -map_dlsubmx -map_drsubmx.
rewrite -map_ursubmx -map_mxZ -map_mxM -map_mxB {}IHm /=.
case: {+}(Gaussian_elimination _) => [[L U] r] /=; rewrite map_xrow map_xcol.
by rewrite !(@map_block_mx _ _ f 1 _ 1) !map_mx0 ?map_mx1 ?map_scalar_mx.
Qed.

Lemma mxrank_map m n (A : 'M_(m, n)) : \rank A^f = \rank A.
Proof. by rewrite mxrankE Gaussian_elimination_map. Qed.

Lemma row_free_map m n (A : 'M_(m, n)) : row_free A^f = row_free A.
Proof. by rewrite /row_free mxrank_map. Qed.

Lemma row_full_map m n (A : 'M_(m, n)) : row_full A^f = row_full A.
Proof. by rewrite /row_full mxrank_map. Qed.

Lemma map_row_ebase m n (A : 'M_(m, n)) : (row_ebase A)^f = row_ebase A^f.
Proof. by rewrite {2}/row_ebase unlock Gaussian_elimination_map. Qed.

Lemma map_col_ebase m n (A : 'M_(m, n)) : (col_ebase A)^f = col_ebase A^f.
Proof. by rewrite {2}/col_ebase unlock Gaussian_elimination_map. Qed.

Lemma map_row_base m n (A : 'M_(m, n)) :
  (row_base A)^f = castmx (mxrank_map A, erefl n) (row_base A^f).
Proof.
move: (mxrank_map A); rewrite {2}/row_base mxrank_map => eqrr.
by rewrite castmx_id map_mxM map_pid_mx map_row_ebase.
Qed.

Lemma map_col_base m n (A : 'M_(m, n)) :
  (col_base A)^f = castmx (erefl m, mxrank_map A) (col_base A^f).
Proof.
move: (mxrank_map A); rewrite {2}/col_base mxrank_map => eqrr.
by rewrite castmx_id map_mxM map_pid_mx map_col_ebase.
Qed.

Lemma map_pinvmx m n (A : 'M_(m, n)) : (pinvmx A)^f = pinvmx A^f.
Proof.
rewrite !map_mxM !map_invmx map_row_ebase map_col_ebase.
by rewrite map_pid_mx -mxrank_map.
Qed.

Lemma map_kermx m n (A : 'M_(m, n)) : (kermx A)^f = kermx A^f.
Proof.
by rewrite !map_mxM map_invmx map_col_ebase -mxrank_map map_copid_mx.
Qed.

Lemma map_cokermx m n (A : 'M_(m, n)) : (cokermx A)^f = cokermx A^f.
Proof.
by rewrite !map_mxM map_invmx map_row_ebase -mxrank_map map_copid_mx.
Qed.

Lemma map_submx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A^f <= B^f)%MS = (A <= B)%MS.
Proof. by rewrite !submxE -map_cokermx -map_mxM map_mx_eq0. Qed.

Lemma map_ltmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A^f < B^f)%MS = (A < B)%MS.
Proof. by rewrite /ltmx !map_submx. Qed.

Lemma map_eqmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (A^f :=: B^f)%MS <-> (A :=: B)%MS.
Proof.
split=> [/eqmxP|eqAB]; first by rewrite !map_submx => /eqmxP.
by apply/eqmxP; rewrite !map_submx !eqAB !submx_refl.
Qed.

Lemma map_genmx m n (A : 'M_(m, n)) : (<<A>>^f :=: <<A^f>>)%MS.
Proof. by apply/eqmxP; rewrite !(genmxE, map_submx) andbb. Qed.

Lemma map_addsmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (((A + B)%MS)^f :=: A^f + B^f)%MS.
Proof.
by apply/eqmxP; rewrite !addsmxE -map_col_mx !map_submx !addsmxE andbb.
Qed.

Lemma map_capmx_gen m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  (capmx_gen A B)^f = capmx_gen A^f B^f.
Proof. by rewrite map_mxM map_lsubmx map_kermx map_col_mx. Qed.

Lemma map_capmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  ((A :&: B)^f :=: A^f :&: B^f)%MS.
Proof.
by apply/eqmxP; rewrite !capmxE -map_capmx_gen !map_submx -!capmxE andbb.
Qed.

Lemma map_complmx m n (A : 'M_(m, n)) : (A^C^f = A^f^C)%MS.
Proof. by rewrite map_mxM map_row_ebase -mxrank_map map_copid_mx. Qed.

Lemma map_diffmx m1 m2 n (A : 'M_(m1, n)) (B : 'M_(m2, n)) :
  ((A :\: B)^f :=: A^f :\: B^f)%MS.
Proof.
apply/eqmxP; rewrite !diffmxE -map_capmx_gen -map_complmx.
by rewrite -!map_capmx !map_submx -!diffmxE andbb.
Qed.

Lemma map_eigenspace n (g : 'M_n) a : (eigenspace g a)^f = eigenspace g^f (f a).
Proof. by rewrite map_kermx map_mxB ?map_scalar_mx. Qed.

Lemma eigenvalue_map n (g : 'M_n) a : eigenvalue g^f (f a) = eigenvalue g a.
Proof. by rewrite /eigenvalue -map_eigenspace map_mx_eq0. Qed.

Lemma memmx_map m n A (E : 'A_(m, n)) : (A^f \in E^f)%MS = (A \in E)%MS.
Proof. by rewrite -map_mxvec map_submx. Qed.

Lemma map_mulsmx m1 m2 n (E1 : 'A_(m1, n)) (E2 : 'A_(m2, n)) :
  ((E1 * E2)%MS^f :=: E1^f * E2^f)%MS.
Proof.
rewrite /mulsmx; elim/big_rec2: _ => [|i A Af _ eqA]; first by rewrite map_mx0.
apply: (eqmx_trans (map_addsmx _ _)); apply: adds_eqmx {A Af}eqA.
apply/eqmxP; rewrite !map_genmx !genmxE map_mxM.
apply/rV_eqP=> u; congr (u <= _ *m _)%MS.
by apply: map_lin_mx => //= A; rewrite map_mxM // map_vec_mx map_row.
Qed.

Lemma map_cent_mx m n (E : 'A_(m, n)) : ('C(E)%MS)^f = 'C(E^f)%MS.
Proof.
rewrite map_kermx; congr kermx; apply: map_lin_mx => A; rewrite map_mxM.
by congr (_ *m _); apply: map_lin_mx => B; rewrite map_mxB ?map_mxM.
Qed.

Lemma map_center_mx m n (E : 'A_(m, n)) : (('Z(E))^f :=: 'Z(E^f))%MS.
Proof. by rewrite /center_mx -map_cent_mx; apply: map_capmx. Qed.

End MapMatrixSpaces.

Section RowColDiagBlockMatrix.
Import tagnat.
Context {F : fieldType} {n : nat} {p_ : 'I_n -> nat}.

Lemma eqmx_col {m} (V_ : forall i, 'M[F]_(p_ i, m)) :
  (\mxcol_i V_ i :=: \sum_i <<V_ i>>)%MS.
Proof.
apply/eqmxP/andP; split.
  apply/row_subP => i; rewrite row_mxcol.
  by rewrite (sumsmx_sup (sig1 i))// genmxE row_sub.
apply/sumsmx_subP => i0 _; rewrite genmxE; apply/row_subP => j.
apply: (eq_row_sub (Rank _ j)); apply/rowP => k.
by rewrite !mxE Rank2K; case: _ / esym; rewrite cast_ord_id.
Qed.

Lemma rank_mxdiag (V_ : forall i, 'M[F]_(p_ i)) :
  (\rank (\mxdiag_i V_ i) = \sum_i \rank (V_ i))%N.
Proof.
elim: {+}n {+}p_ V_ => [|m IHm] q_ V_.
  by move: (\mxdiag__ _); rewrite !big_ord0 => M; rewrite flatmx0 mxrank0.
rewrite mxdiag_recl [RHS]big_ord_recl/= -IHm.
by case: _ / mxsize_recl; rewrite ?castmx_id rank_diag_block_mx.
Qed.

End RowColDiagBlockMatrix.