Datasets:

hoskinson-center
/

proof-pile

	(*
	Author: René Thiemann
	Akihisa Yamada
	License: BSD
	*)
	section \<open>Real Roots\<close>

	text \<open>This theory contains an algorithm to determine the set of real roots of a
	rational polynomial. For polynomials with real coefficients, we refer to
	the AFP entry "Factor-Algebraic-Polynomial".\<close>

	theory Real_Roots
	imports
	Real_Algebraic_Numbers
	begin

	hide_const (open) UnivPoly.coeff
	hide_const (open) Module.smult

	text \<open>Division of integers, rounding to the upper value.\<close>
	definition div_ceiling :: "int \<Rightarrow> int \<Rightarrow> int" where
	"div_ceiling x y = (let q = x div y in if q * y = x then q else q + 1)"

	definition root_bound :: "int poly \<Rightarrow> rat" where
	"root_bound p \<equiv> let
	n = degree p;
	m = 1 + div_ceiling (max_list_non_empty (map (\<lambda>i. abs (coeff p i)) [0..<n]))
	(abs (lead_coeff p))
	\<comment> \<open>round to the next higher number \<open>2^n\<close>, so that bisection will\<close>
	\<comment> \<open>stay on integers for as long as possible\<close>
	in of_int (2 ^ (log_ceiling 2 m))"

	partial_function (tailrec) roots_of_2_main ::
	"int poly \<Rightarrow> root_info \<Rightarrow> (rat \<Rightarrow> rat \<Rightarrow> nat) \<Rightarrow> (rat \<times> rat)list \<Rightarrow> real_alg_2 list \<Rightarrow> real_alg_2 list" where
	[code]: "roots_of_2_main p ri cr lrs rais = (case lrs of Nil \<Rightarrow> rais
	\| (l,r) # lrs \<Rightarrow> let c = cr l r in
	if c = 0 then roots_of_2_main p ri cr lrs rais
	else if c = 1 then roots_of_2_main p ri cr lrs (real_alg_2'' ri p l r # rais)
	else let m = (l + r) / 2 in roots_of_2_main p ri cr ((m,r) # (l,m) # lrs) rais)"

	definition roots_of_2_irr :: "int poly \<Rightarrow> real_alg_2 list" where
	"roots_of_2_irr p = (if degree p = 1
	then [Rational (Rat.Fract (- coeff p 0) (coeff p 1)) ] else
	let ri = root_info p;
	cr = root_info.l_r ri;
	B = root_bound p
	in (roots_of_2_main p ri cr [(-B,B)] []))"

	lemma root_imp_deg_nonzero: assumes "p \<noteq> 0" "poly p x = 0"
	shows "degree p \<noteq> 0"
	proof
	assume "degree p = 0"
	from degree0_coeffs[OF this] assms show False by auto
	qed

	lemma cauchy_root_bound: fixes x :: "'a :: real_normed_field"
	assumes x: "poly p x = 0" and p: "p \<noteq> 0"
	shows "norm x \<le> 1 + max_list_non_empty (map (\<lambda> i. norm (coeff p i)) [0 ..< degree p])
	/ norm (lead_coeff p)" (is "_ \<le> _ + ?max / ?nlc")
	proof -
	let ?n = "degree p"
	let ?p = "coeff p"
	let ?lc = "lead_coeff p"
	define ml where "ml = ?max / ?nlc"
	from p have lc: "?lc \<noteq> 0" by auto
	hence nlc: "norm ?lc > 0" by auto
	from root_imp_deg_nonzero[OF p x] have *: "0 \<in> set [0 ..< degree p]" by auto
	have "0 \<le> norm (?p 0)" by simp
	also have "\<dots> \<le> ?max"
	by (rule max_list_non_empty, insert *, auto)
	finally have max0: "?max \<ge> 0" .
	with nlc have ml0: "ml \<ge> 0" unfolding ml_def by auto
	hence easy: "norm x \<le> 1 \<Longrightarrow> ?thesis" unfolding ml_def[symmetric] by auto
	show ?thesis
	proof (cases "norm x \<le> 1")
	case True
	thus ?thesis using easy by auto
	next
	case False
	hence nx: "norm x > 1" by simp
	hence x0: "x \<noteq> 0" by auto
	hence xn0: "0 < norm x ^ ?n" by auto
	from x[unfolded poly_altdef] have "x ^ ?n * ?lc = x ^ ?n * ?lc - (\<Sum>i\<le>?n. x ^ i * ?p i)"
	unfolding poly_altdef by (simp add: ac_simps)
	also have "(\<Sum>i\<le>?n. x ^ i * ?p i) = x ^ ?n * ?lc + (\<Sum>i < ?n. x ^ i * ?p i)"
	by (subst sum.remove[of _ ?n], auto intro: sum.cong)
	finally have "x ^ ?n * ?lc = - (\<Sum>i < ?n. x ^ i * ?p i)" by simp
	with lc have "x ^ ?n = - (\<Sum>i < ?n. x ^ i * ?p i) / ?lc" by (simp add: field_simps)
	from arg_cong[OF this, of norm]
	have "norm x ^ ?n = norm ((\<Sum>i < ?n. x ^ i * ?p i) / ?lc)" unfolding norm_power by simp
	also have "(\<Sum>i < ?n. x ^ i * ?p i) / ?lc = (\<Sum>i < ?n. x ^ i * ?p i / ?lc)"
	by (rule sum_divide_distrib)
	also have "norm \<dots> \<le> (\<Sum>i < ?n. norm (x ^ i * (?p i / ?lc)))"
	by (simp add: field_simps, rule norm_sum)
	also have "\<dots> = (\<Sum>i < ?n. norm x ^ i * norm (?p i / ?lc))"
	unfolding norm_mult norm_power ..
	also have "\<dots> \<le> (\<Sum>i < ?n. norm x ^ i * ml)"
	proof (rule sum_mono)
	fix i
	assume "i \<in> {..<?n}"
	hence i: "i < ?n" by simp
	show "norm x ^ i * norm (?p i / ?lc) \<le> norm x ^ i * ml"
	proof (rule mult_left_mono)
	show "0 \<le> norm x ^ i" using nx by auto
	show "norm (?p i / ?lc) \<le> ml" unfolding norm_divide ml_def
	by (rule divide_right_mono[OF max_list_non_empty], insert nlc i, auto)
	qed
	qed
	also have "\<dots> = ml * (\<Sum>i < ?n. norm x ^ i)"
	unfolding sum_distrib_right[symmetric] by simp
	also have "(\<Sum>i < ?n. norm x ^ i) = (norm x ^ ?n - 1) / (norm x - 1)"
	by (rule geometric_sum, insert nx, auto)
	finally have "norm x ^ ?n \<le> ml * (norm x ^ ?n - 1) / (norm x - 1)" by simp
	from mult_left_mono[OF this, of "norm x - 1"]
	have "(norm x - 1) * (norm x ^ ?n) \<le> ml * (norm x ^ ?n - 1)" using nx by auto
	also have "\<dots> = (ml * (1 - 1 / (norm x ^ ?n))) * norm x ^ ?n"
	using nx False x0 by (simp add: field_simps)
	finally have "(norm x - 1) * (norm x ^ ?n) \<le> (ml * (1 - 1 / (norm x ^ ?n))) * norm x ^ ?n" .
	from mult_right_le_imp_le[OF this xn0]
	have "norm x - 1 \<le> ml * (1 - 1 / (norm x ^ ?n))" by simp
	hence "norm x \<le> 1 + ml - ml / (norm x ^ ?n)" by (simp add: field_simps)
	also have "\<dots> \<le> 1 + ml" using ml0 xn0 by auto
	finally show ?thesis unfolding ml_def .
	qed
	qed

	lemma div_le_div_ceiling: "x div y \<le> div_ceiling x y"
	unfolding div_ceiling_def Let_def by auto

	lemma div_ceiling: assumes q: "q \<noteq> 0"
	shows "(of_int x :: 'a :: floor_ceiling) / of_int q \<le> of_int (div_ceiling x q)"
	proof (cases "q dvd x")
	case True
	then obtain k where xqk: "x = q * k" unfolding dvd_def by auto
	hence id: "div_ceiling x q = k" unfolding div_ceiling_def Let_def using q by auto
	show ?thesis unfolding id unfolding xqk using q by simp
	next
	case False
	{
	assume "x div q * q = x"
	hence "x = q * (x div q)" by (simp add: ac_simps)
	hence "q dvd x" unfolding dvd_def by auto
	with False have False by simp
	}
	hence id: "div_ceiling x q = x div q + 1"
	unfolding div_ceiling_def Let_def using q by auto
	show ?thesis unfolding id
	by (metis floor_divide_of_int_eq le_less add1_zle_eq floor_less_iff)
	qed

	lemma max_list_non_empty_map: assumes hom: "\<And> x y. max (f x) (f y) = f (max x y)"
	shows "xs \<noteq> [] \<Longrightarrow> max_list_non_empty (map f xs) = f (max_list_non_empty xs)"
	by (induct xs rule: max_list_non_empty.induct, auto simp: hom)

	lemma root_bound: assumes "root_bound p = B" and deg: "degree p > 0"
	shows "ipoly p (x :: real) = 0 \<Longrightarrow> norm x \<le> of_rat B" "B \<ge> 0"
	proof -
	let ?r = real_of_rat
	let ?i = real_of_int
	let ?p = "real_of_int_poly p"
	define n where "n = degree p"
	let ?lc = "coeff p n"
	let ?list = "map (\<lambda>i. abs (coeff p i)) [0..<n]"
	let ?list' = "(map (\<lambda>i. ?i (abs ((coeff p i)))) [0..<n])"
	define m where "m = max_list_non_empty ?list"
	define m_up where "m_up = 1 + div_ceiling m (abs ?lc)"
	define C where "C = rat_of_int (2^(log_ceiling 2 m_up))"
	from deg have p0: "p \<noteq> 0" by auto
	from p0 have alc0: "abs ?lc \<noteq> 0" unfolding n_def by auto
	from deg have mem: "abs (coeff p 0) \<in> set ?list" unfolding n_def by auto
	from max_list_non_empty[OF this, folded m_def]
	have m0: "m \<ge> 0" by auto
	have "div_ceiling m (abs ?lc) \<ge> 0"
	by (rule order_trans[OF _ div_le_div_ceiling[of m "abs ?lc"]], subst
	pos_imp_zdiv_nonneg_iff, insert p0 m0, auto simp: n_def)
	hence mup: "m_up \<ge> 1" unfolding m_up_def by auto
	have "m_up \<le> 2 ^ (log_ceiling 2 m_up)" using mup log_ceiling_sound(1) by auto
	hence Cmup: "C \<ge> of_int m_up" unfolding C_def by linarith
	with mup have C: "C \<ge> 1" by auto
	from assms(1)[unfolded root_bound_def Let_def]
	have B: "C = of_rat B" unfolding C_def m_up_def n_def m_def by auto
	note dc = div_le_div_ceiling[of m "abs ?lc"]
	with C show "B \<ge> 0" unfolding B by auto
	assume "ipoly p x = 0"
	hence rt: "poly ?p x = 0" by simp
	from root_imp_deg_nonzero[OF _ this] p0 have n0: "n \<noteq> 0" unfolding n_def by auto
	from cauchy_root_bound[OF rt] p0
	have "norm x \<le> 1 + max_list_non_empty ?list' / ?i (abs ?lc)"
	by (simp add: n_def)
	also have "?list' = map ?i ?list" by simp
	also have "max_list_non_empty \<dots> = ?i m" unfolding m_def
	by (rule max_list_non_empty_map, insert mem, auto)
	also have "1 + m / ?i (abs ?lc) \<le> ?i m_up"
	unfolding m_up_def using div_ceiling[OF alc0, of m] by auto
	also have "\<dots> \<le> ?r C" using Cmup using of_rat_less_eq by force
	finally have "norm x \<le> ?r C" .
	thus "norm x \<le> ?r B" unfolding B by simp
	qed

	fun pairwise_disjoint :: "'a set list \<Rightarrow> bool" where
	"pairwise_disjoint [] = True"
	\| "pairwise_disjoint (x # xs) = ((x \<inter> (\<Union> y \<in> set xs. y) = {}) \<and> pairwise_disjoint xs)"

	lemma roots_of_2_irr: assumes pc: "poly_cond p" and deg: "degree p > 0"
	shows "real_of_2 ` set (roots_of_2_irr p) = {x. ipoly p x = 0}" (is ?one)
	"Ball (set (roots_of_2_irr p)) invariant_2" (is ?two)
	"distinct (map real_of_2 (roots_of_2_irr p))" (is ?three)
	proof -
	note d = roots_of_2_irr_def
	from poly_condD[OF pc] have mon: "lead_coeff p > 0" and irr: "irreducible p" by auto
	let ?norm = "real_alg_2'"
	have "?one \<and> ?two \<and> ?three"
	proof (cases "degree p = 1")
	case True
	define c where "c = coeff p 0"
	define d where "d = coeff p 1"
	from True have rr: "roots_of_2_irr p = [Rational (Rat.Fract (- c) (d))]" unfolding d d_def c_def by auto
	from degree1_coeffs[OF True] have p: "p = [:c,d:]" and d: "d \<noteq> 0" unfolding c_def d_def by auto
	have : "real_of_int c + x real_of_int d = 0 \<Longrightarrow> x = - (real_of_int c / real_of_int d)" for x
	using d by (simp add: field_simps)
	show ?thesis unfolding rr using d * unfolding p using of_rat_1[of "Rat.Fract (- c) (d)"]
	by (auto simp: Fract_of_int_quotient hom_distribs)
	next
	case False
	let ?r = real_of_rat
	let ?rp = "map_poly ?r"
	let ?rr = "set (roots_of_2_irr p)"
	define ri where "ri = root_info p"
	define cr where "cr = root_info.l_r ri"
	define bnds where "bnds = [(-root_bound p, root_bound p)]"
	define empty where "empty = (Nil :: real_alg_2 list)"
	have empty: "Ball (set empty) invariant_2 \<and> distinct (map real_of_2 empty)" unfolding empty_def by auto
	from mon have p: "p \<noteq> 0" by auto
	from root_info[OF irr deg] have ri: "root_info_cond ri p" unfolding ri_def .
	from False
	have rr: "roots_of_2_irr p = roots_of_2_main p ri cr bnds empty"
	unfolding d ri_def cr_def Let_def bnds_def empty_def by auto
	note root_bound = root_bound[OF refl deg]
	from root_bound(2)
	have bnds: "\<And> l r. (l,r) \<in> set bnds \<Longrightarrow> l \<le> r" unfolding bnds_def by auto
	have "ipoly p x = 0 \<Longrightarrow> ?r (- root_bound p) \<le> x \<and> x \<le> ?r (root_bound p)" for x
	using root_bound(1)[of x] by (auto simp: hom_distribs)
	hence rts: "{x. ipoly p x = 0}
	= real_of_2 ` set empty \<union> {x. \<exists> l r. root_cond (p,l,r) x \<and> (l,r) \<in> set bnds}"
	unfolding empty_def bnds_def by (force simp: root_cond_def)
	define rts where "rts lr = Collect (root_cond (p,lr))" for lr
	have disj: "pairwise_disjoint (real_of_2 ` set empty # map rts bnds)"
	unfolding empty_def bnds_def by auto
	from deg False have deg1: "degree p > 1" by auto
	define delta where "delta = ipoly_root_delta p"
	note delta = ipoly_root_delta[OF p, folded delta_def]
	define rel' where "rel' = ({(x, y). 0 \<le> y \<and> delta_gt delta x y})^-1"
	define mm where "mm = (\<lambda>bnds. mset (map (\<lambda> (l,r). ?r r - ?r l) bnds))"
	define rel where "rel = inv_image (mult1 rel') mm"
	have wf: "wf rel" unfolding rel_def rel'_def
	by (rule wf_inv_image[OF wf_mult1[OF SN_imp_wf[OF delta_gt_SN[OF delta(1)]]]])
	let ?main = "roots_of_2_main p ri cr"
	have "real_of_2 ` set (?main bnds empty) =
	real_of_2 ` set empty \<union>
	{x. \<exists>l r. root_cond (p, l, r) x \<and> (l, r) \<in> set bnds} \<and>
	Ball (set (?main bnds empty)) invariant_2 \<and> distinct (map real_of_2 (?main bnds empty))" (is "?one' \<and> ?two' \<and> ?three'")
	using empty bnds disj
	proof (induct bnds arbitrary: empty rule: wf_induct[OF wf])
	case (1 lrss rais)
	note rais = 1(2)[rule_format]
	note lrs = 1(3)
	note disj = 1(4)
	note IH = 1(1)[rule_format]
	note simp = roots_of_2_main.simps[of p ri cr lrss rais]
	show ?case
	proof (cases lrss)
	case Nil
	with rais show ?thesis unfolding simp by auto
	next
	case (Cons lr lrs)
	obtain l r where lr': "lr = (l,r)" by force
	{
	fix lr'
	assume lt: "\<And> l' r'. (l',r') \<in> set lr' \<Longrightarrow>
	l' \<le> r' \<and> delta_gt delta (?r r - ?r l) (?r r' - ?r l')"
	have l: "mm (lr' @ lrs) = mm lrs + mm lr'" unfolding mm_def by (auto simp: ac_simps)
	have r: "mm lrss = mm lrs + {# ?r r - ?r l #}" unfolding Cons lr' rel_def mm_def
	by auto
	have "(mm (lr' @ lrs), mm lrss) \<in> mult1 rel'" unfolding l r mult1_def
	proof (rule, unfold split, intro exI conjI, unfold add_mset_add_single[symmetric], rule refl, rule refl, intro allI impI)
	fix d
	assume "d \<in># mm lr'"
	then obtain l' r' where d: "d = ?r r' - ?r l'" and lr': "(l',r') \<in> set lr'"
	unfolding mm_def in_multiset_in_set by auto
	from lt[OF lr']
	show "(d, ?r r - ?r l) \<in> rel'" unfolding d rel'_def
	by (auto simp: of_rat_less_eq)
	qed
	hence "(lr' @ lrs, lrss) \<in> rel" unfolding rel_def by auto
	} note rel = this
	from rel[of Nil] have easy_rel: "(lrs,lrss) \<in> rel" by auto
	define c where "c = cr l r"
	from simp Cons lr' have simp: "?main lrss rais =
	(if c = 0 then ?main lrs rais else if c = 1 then
	?main lrs (real_alg_2' ri p l r # rais)
	else let m = (l + r) / 2 in ?main ((m, r) # (l, m) # lrs) rais)"
	unfolding c_def simp Cons lr' using real_alg_2''[OF False] by auto
	note lrs = lrs[unfolded Cons lr']
	from lrs have lr: "l \<le> r" by auto
	from root_info_condD(1)[OF ri lr, folded cr_def]
	have c: "c = card {x. root_cond (p,l,r) x}" unfolding c_def by auto
	let ?rt = "\<lambda> lrs. {x. \<exists>l r. root_cond (p, l, r) x \<and> (l, r) \<in> set lrs}"
	have rts: "?rt lrss = ?rt lrs \<union> {x. root_cond (p,l,r) x}" (is "?rt1 = ?rt2 \<union> ?rt3")
	unfolding Cons lr' by auto
	show ?thesis
	proof (cases "c = 0")
	case True
	with simp have simp: "?main lrss rais = ?main lrs rais" by simp
	from disj have disj: "pairwise_disjoint (real_of_2 ` set rais # map rts lrs)"
	unfolding Cons by auto
	from finite_ipoly_roots[OF p] True[unfolded c] have empty: "?rt3 = {}"
	unfolding root_cond_def[abs_def] split by simp
	with rts have rts: "?rt1 = ?rt2" by auto
	show ?thesis unfolding simp rts
	by (rule IH[OF easy_rel rais lrs disj], auto)
	next
	case False
	show ?thesis
	proof (cases "c = 1")
	case True
	let ?rai = "real_alg_2' ri p l r"
	from True simp have simp: "?main lrss rais = ?main lrs (?rai # rais)" by auto
	from card_1_Collect_ex1[OF c[symmetric, unfolded True]]
	have ur: "unique_root (p,l,r)" .
	from real_alg_2'[OF ur pc ri]
	have rai: "invariant_2 ?rai" "real_of_2 ?rai = the_unique_root (p, l, r)" by auto
	with rais have rais: "\<And> x. x \<in> set (?rai # rais) \<Longrightarrow> invariant_2 x"
	and dist: "distinct (map real_of_2 rais)" by auto
	have rt3: "?rt3 = {real_of_2 ?rai}"
	using ur rai by (auto intro: the_unique_root_eqI theI')
	have "real_of_2 ` set (roots_of_2_main p ri cr lrs (?rai # rais)) =
	real_of_2 ` set (?rai # rais) \<union> ?rt2 \<and>
	Ball (set (roots_of_2_main p ri cr lrs (?rai # rais))) invariant_2 \<and>
	distinct (map real_of_2 (roots_of_2_main p ri cr lrs (?rai # rais)))"
	(is "?one \<and> ?two \<and> ?three")
	proof (rule IH[OF easy_rel, of "?rai # rais", OF conjI lrs])
	show "Ball (set (real_alg_2' ri p l r # rais)) invariant_2" using rais by auto
	have "real_of_2 (real_alg_2' ri p l r) \<notin> set (map real_of_2 rais)"
	using disj rt3 unfolding Cons lr' rts_def by auto
	thus "distinct (map real_of_2 (real_alg_2' ri p l r # rais))" using dist by auto
	show "pairwise_disjoint (real_of_2 ` set (real_alg_2' ri p l r # rais) # map rts lrs)"
	using disj rt3 unfolding Cons lr' rts_def by auto
	qed auto
	hence ?one ?two ?three by blast+
	show ?thesis unfolding simp rts rt3
	by (rule conjI[OF _ conjI[OF \<open>?two\<close> \<open>?three\<close>]], unfold \<open>?one\<close>, auto)
	next
	case False
	let ?m = "(l+r)/2"
	let ?lrs = "[(?m,r),(l,?m)] @ lrs"
	from False \<open>c \<noteq> 0\<close> have simp: "?main lrss rais = ?main ?lrs rais"
	unfolding simp by (auto simp: Let_def)
	from False \<open>c \<noteq> 0\<close> have "c \<ge> 2" by auto
	from delta(2)[OF this[unfolded c]] have delta: "delta \<le> ?r (r - l) / 4" by auto
	have lrs: "\<And> l r. (l,r) \<in> set ?lrs \<Longrightarrow> l \<le> r"
	using lr lrs by (fastforce simp: field_simps)
	have "?r ?m \<in> \<rat>" unfolding Rats_def by blast
	with poly_cond_degree_gt_1[OF pc deg1, of "?r ?m"]
	have disj1: "?r ?m \<notin> rts lr" for lr unfolding rts_def root_cond_def by auto
	have disj2: "rts (?m, r) \<inter> rts (l, ?m) = {}" using disj1[of "(l,?m)"] disj1[of "(?m,r)"]
	unfolding rts_def root_cond_def by auto
	have disj3: "(rts (l,?m) \<union> rts (?m,r)) = rts (l,r)"
	unfolding rts_def root_cond_def by (auto simp: hom_distribs)
	have disj4: "real_of_2 ` set rais \<inter> rts (l,r) = {}" using disj unfolding Cons lr' by auto
	have disj: "pairwise_disjoint (real_of_2 ` set rais # map rts ([(?m, r), (l, ?m)] @ lrs))"
	using disj disj2 disj3 disj4 by (auto simp: Cons lr')
	have "(?lrs,lrss) \<in> rel"
	proof (rule rel, intro conjI)
	fix l' r'
	assume mem: "(l', r') \<in> set [(?m,r),(l,?m)]"
	from mem lr show "l' \<le> r'" by auto
	from mem have diff: "?r r' - ?r l' = (?r r - ?r l) / 2" by auto
	(metis eq_diff_eq minus_diff_eq mult_2_right of_rat_add of_rat_diff,
	metis of_rat_add of_rat_mult of_rat_numeral_eq)
	show "delta_gt delta (?r r - ?r l) (?r r' - ?r l')" unfolding diff
	delta_gt_def by (rule order.trans[OF delta], insert lr,
	auto simp: field_simps of_rat_diff of_rat_less_eq)
	qed
	note IH = IH[OF this, of rais, OF rais lrs disj]
	have "real_of_2 ` set (?main ?lrs rais) =
	real_of_2 ` set rais \<union> ?rt ?lrs \<and>
	Ball (set (?main ?lrs rais)) invariant_2 \<and> distinct (map real_of_2 (?main ?lrs rais))"
	(is "?one \<and> ?two")
	by (rule IH)
	hence ?one ?two by blast+
	have cong: "\<And> a b c. b = c \<Longrightarrow> a \<union> b = a \<union> c" by auto
	have id: "?rt ?lrs = ?rt lrs \<union> ?rt [(?m,r),(l,?m)]" by auto
	show ?thesis unfolding rts simp \<open>?one\<close> id
	proof (rule conjI[OF cong[OF cong] conjI])
	have "\<And> x. root_cond (p,l,r) x = (root_cond (p,l,?m) x \<or> root_cond (p,?m,r) x)"
	unfolding root_cond_def by (auto simp:hom_distribs)
	hence id: "Collect (root_cond (p,l,r)) = {x. (root_cond (p,l,?m) x \<or> root_cond (p,?m,r) x)}"
	by auto
	show "?rt [(?m,r),(l,?m)] = Collect (root_cond (p,l,r))" unfolding id list.simps by blast
	show "\<forall> a \<in> set (?main ?lrs rais). invariant_2 a" using \<open>?two\<close> by auto
	show "distinct (map real_of_2 (?main ?lrs rais))" using \<open>?two\<close> by auto
	qed
	qed
	qed
	qed
	qed
	hence idd: "?one'" and cond: ?two' ?three' by blast+
	define res where "res = roots_of_2_main p ri cr bnds empty"
	have e: "set empty = {}" unfolding empty_def by auto
	from idd[folded res_def] e have idd: "real_of_2 ` set res = {} \<union> {x. \<exists>l r. root_cond (p, l, r) x \<and> (l, r) \<in> set bnds}"
	by auto
	show ?thesis
	unfolding rr unfolding rts id e norm_def using cond
	unfolding res_def[symmetric] image_empty e idd[symmetric] by auto
	qed
	thus ?one ?two ?three by blast+
	qed

	definition roots_of_2 :: "int poly \<Rightarrow> real_alg_2 list" where
	"roots_of_2 p = concat (map roots_of_2_irr
	(factors_of_int_poly p))"

	lemma roots_of_2:
	shows "p \<noteq> 0 \<Longrightarrow> real_of_2 ` set (roots_of_2 p) = {x. ipoly p x = 0}"
	"Ball (set (roots_of_2 p)) invariant_2"
	"distinct (map real_of_2 (roots_of_2 p))"
	proof -
	let ?rr = "roots_of_2 p"
	note d = roots_of_2_def
	note frp1 = factors_of_int_poly
	{
	fix q r
	assume "q \<in> set ?rr"
	then obtain s where
	s: "s \<in> set (factors_of_int_poly p)" and
	q: "q \<in> set (roots_of_2_irr s)"
	unfolding d by auto
	from frp1(1)[OF refl s] have "poly_cond s" "degree s > 0" by (auto simp: poly_cond_def)
	from roots_of_2_irr[OF this] q
	have "invariant_2 q" by auto
	}
	thus "Ball (set ?rr) invariant_2" by auto
	{
	assume p: "p \<noteq> 0"
	have "real_of_2 ` set ?rr = (\<Union> ((\<lambda> p. real_of_2 ` set (roots_of_2_irr p)) `
	(set (factors_of_int_poly p))))"
	(is "_ = ?rrr")
	unfolding d set_concat set_map by auto
	also have "\<dots> = {x. ipoly p x = 0}"
	proof -
	{
	fix x
	assume "x \<in> ?rrr"
	then obtain q s where
	s: "s \<in> set (factors_of_int_poly p)" and
	q: "q \<in> set (roots_of_2_irr s)" and
	x: "x = real_of_2 q" by auto
	from frp1(1)[OF refl s] have s0: "s \<noteq> 0" and pt: "poly_cond s" "degree s > 0"
	by (auto simp: poly_cond_def)
	from roots_of_2_irr[OF pt] q have rt: "ipoly s x = 0" unfolding x by auto
	from frp1(2)[OF refl p, of x] rt s have rt: "ipoly p x = 0" by auto
	}
	moreover
	{
	fix x :: real
	assume rt: "ipoly p x = 0"
	from rt frp1(2)[OF refl p, of x] obtain s where s: "s \<in> set (factors_of_int_poly p)"
	and rt: "ipoly s x = 0" by auto
	from frp1(1)[OF refl s] have s0: "s \<noteq> 0" and ty: "poly_cond s" "degree s > 0"
	by (auto simp: poly_cond_def)
	from roots_of_2_irr(1)[OF ty] rt obtain q where
	q: "q \<in> set (roots_of_2_irr s)" and
	x: "x = real_of_2 q" by blast
	have "x \<in> ?rrr" unfolding x using q s by auto
	}
	ultimately show ?thesis by auto
	qed
	finally show "real_of_2 ` set ?rr = {x. ipoly p x = 0}" by auto
	}
	show "distinct (map real_of_2 (roots_of_2 p))"
	proof (cases "p = 0")
	case True
	from factors_of_int_poly_const[of 0] True show ?thesis unfolding roots_of_2_def by auto
	next
	case p: False
	note frp1 = frp1[OF refl]
	let ?fp = "factors_of_int_poly p"
	let ?cc = "concat (map roots_of_2_irr ?fp)"
	show ?thesis unfolding roots_of_2_def distinct_conv_nth length_map
	proof (intro allI impI notI)
	fix i j
	assume ij: "i < length ?cc" "j < length ?cc" "i \<noteq> j" and id: "map real_of_2 ?cc ! i = map real_of_2 ?cc ! j"
	from ij id have id: "real_of_2 (?cc ! i) = real_of_2 (?cc ! j)" by auto
	from nth_concat_diff[OF ij, unfolded length_map] obtain j1 k1 j2 k2 where
	*: "(j1,k1) \<noteq> (j2,k2)"
	"j1 < length ?fp" "j2 < length ?fp" and
	"k1 < length (map roots_of_2_irr ?fp ! j1)"
	"k2 < length (map roots_of_2_irr ?fp ! j2)"
	"?cc ! i = map roots_of_2_irr ?fp ! j1 ! k1"
	"?cc ! j = map roots_of_2_irr ?fp ! j2 ! k2" by blast
	hence **: "k1 < length (roots_of_2_irr (?fp ! j1))"
	"k2 < length (roots_of_2_irr (?fp ! j2))"
	"?cc ! i = roots_of_2_irr (?fp ! j1) ! k1"
	"?cc ! j = roots_of_2_irr (?fp ! j2) ! k2"
	by auto
	from * have mem: "?fp ! j1 \<in> set ?fp" "?fp ! j2 \<in> set ?fp" by auto
	from frp1(1)[OF mem(1)] frp1(1)[OF mem(2)]
	have pc1: "poly_cond (?fp ! j1)" "degree (?fp ! j1) > 0" and pc10: "?fp ! j1 \<noteq> 0"
	and pc2: "poly_cond (?fp ! j2)" "degree (?fp ! j2) > 0"
	by (auto simp: poly_cond_def)
	show False
	proof (cases "j1 = j2")
	case True
	with * have neq: "k1 \<noteq> k2" by auto
	from *[unfolded True] id
	have "map real_of_2 (roots_of_2_irr (?fp ! j2)) ! k1 = real_of_2 (?cc ! j)"
	"map real_of_2 (roots_of_2_irr (?fp ! j2)) ! k1 = real_of_2 (?cc ! j)"
	by auto
	hence "\<not> distinct (map real_of_2 (roots_of_2_irr (?fp ! j2)))"
	unfolding distinct_conv_nth using * ** True by auto
	with roots_of_2_irr(3)[OF pc2] show False by auto
	next
	case neq: False
	with frp1(4)[of p] * have neq: "?fp ! j1 \<noteq> ?fp ! j2" unfolding distinct_conv_nth by auto
	let ?x = "real_of_2 (?cc ! i)"
	define x where "x = ?x"
	from ** have "x \<in> real_of_2 ` set (roots_of_2_irr (?fp ! j1))" unfolding x_def by auto
	with roots_of_2_irr(1)[OF pc1] have x1: "ipoly (?fp ! j1) x = 0" by auto
	from ** id have "x \<in> real_of_2 ` set (roots_of_2_irr (?fp ! j2))" unfolding x_def
	by (metis image_eqI nth_mem)
	with roots_of_2_irr(1)[OF pc2] have x2: "ipoly (?fp ! j2) x = 0" by auto
	have "ipoly p x = 0" using x1 mem unfolding roots_of_2_def by (metis frp1(2) p)
	from frp1(3)[OF p this] x1 x2 neq mem show False by blast
	qed
	qed
	qed
	qed

	lift_definition roots_of_3 :: "int poly \<Rightarrow> real_alg_3 list" is roots_of_2
	by (insert roots_of_2, auto simp: list_all_iff)

	lemma roots_of_3:
	shows "p \<noteq> 0 \<Longrightarrow> real_of_3 ` set (roots_of_3 p) = {x. ipoly p x = 0}"
	"distinct (map real_of_3 (roots_of_3 p))"
	proof -
	show "p \<noteq> 0 \<Longrightarrow> real_of_3 ` set (roots_of_3 p) = {x. ipoly p x = 0}"
	by (transfer; intro roots_of_2, auto)
	show "distinct (map real_of_3 (roots_of_3 p))"
	by (transfer; insert roots_of_2, auto)
	qed

	lift_definition roots_of_real_alg :: "int poly \<Rightarrow> real_alg list" is roots_of_3 .

	lemma roots_of_real_alg:
	"p \<noteq> 0 \<Longrightarrow> real_of ` set (roots_of_real_alg p) = {x. ipoly p x = 0}"
	"distinct (map real_of (roots_of_real_alg p))"
	proof -
	show "p \<noteq> 0 \<Longrightarrow> real_of ` set (roots_of_real_alg p) = {x. ipoly p x = 0}"
	by (transfer', insert roots_of_3, auto)
	show "distinct (map real_of (roots_of_real_alg p))"
	by (transfer, insert roots_of_3(2), auto)
	qed

	text \<open>It follows an implementation for @{const roots_of_3},
	since the current definition does not provide a code equation.\<close>
	context
	begin
	private typedef real_alg_2_list = "{xs. Ball (set xs) invariant_2}" by (intro exI[of _ Nil], auto)

	setup_lifting type_definition_real_alg_2_list

	private lift_definition roots_of_2_list :: "int poly \<Rightarrow> real_alg_2_list" is roots_of_2
	by (insert roots_of_2, auto)
	private lift_definition real_alg_2_list_nil :: "real_alg_2_list \<Rightarrow> bool" is "\<lambda> xs. case xs of Nil \<Rightarrow> True \| _ \<Rightarrow> False" .

	private fun real_alg_2_list_hd_intern :: "real_alg_2 list \<Rightarrow> real_alg_2" where
	"real_alg_2_list_hd_intern (Cons x xs) = x"
	\| "real_alg_2_list_hd_intern Nil = of_rat_2 0"

	private lift_definition real_alg_2_list_hd :: "real_alg_2_list \<Rightarrow> real_alg_3" is real_alg_2_list_hd_intern
	proof (goal_cases)
	case (1 xs)
	thus ?case using of_rat_2[of 0] by (cases xs, auto)
	qed

	private lift_definition real_alg_2_list_tl :: "real_alg_2_list \<Rightarrow> real_alg_2_list" is tl
	proof (goal_cases)
	case (1 xs)
	thus ?case by (cases xs, auto)
	qed

	private lift_definition real_alg_2_list_length :: "real_alg_2_list \<Rightarrow> nat" is length .

	private lemma real_alg_2_list_length[simp]: "\<not> real_alg_2_list_nil xs \<Longrightarrow> real_alg_2_list_length (real_alg_2_list_tl xs) < real_alg_2_list_length xs"
	by (transfer, auto split: list.splits)

	private function real_alg_2_list_convert :: "real_alg_2_list \<Rightarrow> real_alg_3 list" where
	"real_alg_2_list_convert xs = (if real_alg_2_list_nil xs then [] else real_alg_2_list_hd xs
	# real_alg_2_list_convert (real_alg_2_list_tl xs))" by pat_completeness auto

	termination by (relation "measure real_alg_2_list_length", auto)

	private definition roots_of_3_impl :: "int poly \<Rightarrow> real_alg_3 list" where
	"roots_of_3_impl p = real_alg_2_list_convert (roots_of_2_list p)"

	private lift_definition real_alg_2_list_convert_id :: "real_alg_2_list \<Rightarrow> real_alg_3 list" is id
	by (auto simp: list_all_iff)

	lemma real_alg_2_list_convert: "real_alg_2_list_convert xs = real_alg_2_list_convert_id xs"
	proof (induct xs rule: wf_induct[OF wf_measure[of real_alg_2_list_length], rule_format])
	case (1 xs)
	show ?case
	proof (cases "real_alg_2_list_nil xs")
	case True
	hence "real_alg_2_list_convert xs = []" by auto
	also have "[] = real_alg_2_list_convert_id xs" using True
	by (transfer', auto split: list.splits)
	finally show ?thesis .
	next
	case False
	hence "real_alg_2_list_convert xs = real_alg_2_list_hd xs # real_alg_2_list_convert (real_alg_2_list_tl xs)" by simp
	also have "real_alg_2_list_convert (real_alg_2_list_tl xs) = real_alg_2_list_convert_id (real_alg_2_list_tl xs)"
	by (rule 1, insert False, simp)
	also have "real_alg_2_list_hd xs # \<dots> = real_alg_2_list_convert_id xs" using False
	by (transfer', auto split: list.splits)
	finally show ?thesis .
	qed
	qed

	lemma roots_of_3_code[code]: "roots_of_3 p = roots_of_3_impl p"
	unfolding roots_of_3_impl_def real_alg_2_list_convert
	by (transfer, simp)
	end

	definition real_roots_of_int_poly :: "int poly \<Rightarrow> real list" where
	"real_roots_of_int_poly p = map real_of (roots_of_real_alg p)"

	definition real_roots_of_rat_poly :: "rat poly \<Rightarrow> real list" where
	"real_roots_of_rat_poly p = map real_of (roots_of_real_alg (snd (rat_to_int_poly p)))"

	abbreviation rpoly :: "rat poly \<Rightarrow> 'a :: field_char_0 \<Rightarrow> 'a"
	where "rpoly f \<equiv> poly (map_poly of_rat f)"

	lemma real_roots_of_int_poly: "p \<noteq> 0 \<Longrightarrow> set (real_roots_of_int_poly p) = {x. ipoly p x = 0}"
	"distinct (real_roots_of_int_poly p)"
	unfolding real_roots_of_int_poly_def using roots_of_real_alg[of p] by auto

	lemma real_roots_of_rat_poly: "p \<noteq> 0 \<Longrightarrow> set (real_roots_of_rat_poly p) = {x. rpoly p x = 0}"
	"distinct (real_roots_of_rat_poly p)"
	proof -
	obtain c q where cq: "rat_to_int_poly p = (c,q)" by force
	from rat_to_int_poly[OF this]
	have pq: "p = smult (inverse (of_int c)) (of_int_poly q)"
	and c: "c \<noteq> 0" by auto
	have id: "{x. rpoly p x = (0 :: real)} = {x. ipoly q x = 0}"
	unfolding pq by (simp add: c of_rat_of_int_poly hom_distribs)
	show "distinct (real_roots_of_rat_poly p)" unfolding real_roots_of_rat_poly_def cq snd_conv
	using roots_of_real_alg(2)[of q] .
	assume "p \<noteq> 0"
	with pq c have q: "q \<noteq> 0" by auto
	show "set (real_roots_of_rat_poly p) = {x. rpoly p x = 0}" unfolding id
	unfolding real_roots_of_rat_poly_def cq snd_conv using roots_of_real_alg(1)[OF q]
	by auto
	qed

	end