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proof-pile

	(*
	Authors: Jose Divasón
	Sebastiaan Joosten
	René Thiemann
	Akihisa Yamada
	*)
	subsection \<open>Finding a Suitable Prime\<close>

	text \<open>The Berlekamp-Zassenhaus algorithm demands for an input polynomial $f$ to determine
	a prime $p$ such that $f$ is square-free mod $p$ and such that $p$ and the leading coefficient
	of $f$ are coprime. To this end, we first prove that such a prime always exists, provided that
	$f$ is square-free over the integers. Second, we provide a generic algorithm which searches for
	primes have a certain property $P$. Combining both results gives us the suitable prime for
	the Berlekamp-Zassenhaus algorithm.\<close>

	theory Suitable_Prime
	imports
	Poly_Mod
	Finite_Field_Record_Based
	"HOL-Types_To_Sets.Types_To_Sets"
	Poly_Mod_Finite_Field_Record_Based
	Polynomial_Record_Based
	Square_Free_Int_To_Square_Free_GFp
	begin

	lemma square_free_separable_GFp: fixes f :: "'a :: prime_card mod_ring poly"
	assumes card: "CARD('a) > degree f"
	and sf: "square_free f"
	shows "separable f"
	proof (rule ccontr)
	assume "\<not> separable f"
	with square_free_separable_main[OF sf]
	obtain g k where : "f = g k" "degree g \<noteq> 0" and g0: "pderiv g = 0" by auto
	from assms have f: "f \<noteq> 0" unfolding square_free_def by auto
	have "degree f = degree g + degree k" using f unfolding *(1)
	by (subst degree_mult_eq, auto)
	with card have card: "degree g < CARD('a)" by auto
	from *(2) obtain n where deg: "degree g = Suc n" by (cases "degree g", auto)
	from *(2) have cg: "coeff g (degree g) \<noteq> 0" by auto
	from g0 have "coeff (pderiv g) n = 0" by auto
	from this[unfolded coeff_pderiv, folded deg] cg
	have "of_nat (degree g) = (0 :: 'a mod_ring)" by auto
	from of_nat_0_mod_ring_dvd[OF this] have "CARD('a) dvd degree g" .
	with card show False by (simp add: deg nat_dvd_not_less)
	qed

	lemma square_free_iff_separable_GFp: assumes "degree f < CARD('a)"
	shows "square_free (f :: 'a :: prime_card mod_ring poly) = separable f"
	using separable_imp_square_free[of f] square_free_separable_GFp[OF assms] by auto

	definition separable_impl_main :: "int \<Rightarrow> 'i arith_ops_record \<Rightarrow> int poly \<Rightarrow> bool" where
	"separable_impl_main p ff_ops f = separable_i ff_ops (of_int_poly_i ff_ops (poly_mod.Mp p f))"

	lemma (in prime_field_gen) separable_impl:
	shows "separable_impl_main p ff_ops f \<Longrightarrow> square_free_m f"
	"p > degree_m f \<Longrightarrow> p > separable_bound f \<Longrightarrow> square_free f
	\<Longrightarrow> separable_impl_main p ff_ops f" unfolding separable_impl_main_def
	proof -
	define F where F: "(F :: 'a mod_ring poly) = of_int_poly (Mp f)"
	let ?f' = "of_int_poly_i ff_ops (Mp f)"
	define f'' where "f'' \<equiv> of_int_poly (Mp f) :: 'a mod_ring poly"
	have rel_f[transfer_rule]: "poly_rel ?f' f''"
	by (rule poly_rel_of_int_poly[OF refl], simp add: f''_def)
	have "separable_i ff_ops ?f' \<longleftrightarrow> gcd f'' (pderiv f'') = 1"
	unfolding separable_i_def by transfer_prover
	also have "\<dots> \<longleftrightarrow> coprime f'' (pderiv f'')"
	by (auto simp add: gcd_eq_1_imp_coprime)
	finally have id: "separable_i ff_ops ?f' \<longleftrightarrow> separable f''" unfolding separable_def coprime_iff_coprime .
	have Mprel [transfer_rule]: "MP_Rel (Mp f) F" unfolding F MP_Rel_def
	by (simp add: Mp_f_representative)
	have "square_free f'' = square_free F" unfolding f''_def F by simp
	also have "\<dots> = square_free_m (Mp f)"
	by (transfer, simp)
	also have "\<dots> = square_free_m f" by simp
	finally have id2: "square_free f'' = square_free_m f" .
	from separable_imp_square_free[of f'']
	show "separable_i ff_ops ?f' \<Longrightarrow> square_free_m f"
	unfolding id id2 by auto
	let ?m = "map_poly (of_int :: int \<Rightarrow> 'a mod_ring)"
	let ?f = "?m f"
	assume "p > degree_m f" and bnd: "p > separable_bound f" and sf: "square_free f"
	with rel_funD[OF degree_MP_Rel Mprel, folded p]
	have "p > degree F" by simp
	hence "CARD('a) > degree f''" unfolding f''_def F p by simp
	from square_free_iff_separable_GFp[OF this]
	have "separable_i ff_ops ?f' = square_free f''" unfolding id id2 by simp
	also have "\<dots> = square_free F" unfolding f''_def F by simp
	also have "F = ?f" unfolding F
	by (rule poly_eqI, (subst coeff_map_poly, force)+, unfold Mp_coeff,
	auto simp: M_def, transfer, auto simp: p)
	also have "square_free ?f" using square_free_int_imp_square_free_mod_ring[where 'a = 'a, OF sf] bnd m by auto
	finally
	show "separable_i ff_ops ?f'" .
	qed

	context poly_mod_prime begin

	lemmas separable_impl_integer = prime_field_gen.separable_impl
	[OF prime_field.prime_field_finite_field_ops_integer, unfolded prime_field_def mod_ring_locale_def,
	unfolded poly_mod_type_simps, internalize_sort "'a :: prime_card", OF type_to_set, unfolded remove_duplicate_premise,cancel_type_definition, OF non_empty]

	lemmas separable_impl_uint32 = prime_field_gen.separable_impl
	[OF prime_field.prime_field_finite_field_ops32, unfolded prime_field_def mod_ring_locale_def,
	unfolded poly_mod_type_simps, internalize_sort "'a :: prime_card", OF type_to_set, unfolded remove_duplicate_premise,cancel_type_definition, OF non_empty]

	lemmas separable_impl_uint64 = prime_field_gen.separable_impl
	[OF prime_field.prime_field_finite_field_ops64, unfolded prime_field_def mod_ring_locale_def,
	unfolded poly_mod_type_simps, internalize_sort "'a :: prime_card", OF type_to_set, unfolded remove_duplicate_premise,cancel_type_definition, OF non_empty]

	end

	definition separable_impl :: "int \<Rightarrow> int poly \<Rightarrow> bool" where
	"separable_impl p = (
	if p \<le> 65535
	then separable_impl_main p (finite_field_ops32 (uint32_of_int p))
	else if p \<le> 4294967295
	then separable_impl_main p (finite_field_ops64 (uint64_of_int p))
	else separable_impl_main p (finite_field_ops_integer (integer_of_int p)))"

	lemma square_free_mod_imp_square_free: assumes
	p: "prime p" and sf: "poly_mod.square_free_m p f"
	and cop: "coprime (lead_coeff f) p"
	shows "square_free f"
	proof -
	interpret poly_mod p .
	from sf[unfolded square_free_m_def] have f0: "Mp f \<noteq> 0" and ndvd: "\<And> g. degree_m g > 0 \<Longrightarrow> \<not> (g * g) dvdm f"
	by auto
	from f0 have ff0: "f \<noteq> 0" by auto
	show "square_free f" unfolding square_free_def
	proof (intro conjI[OF ff0] allI impI notI)
	fix g
	assume deg: "degree g > 0" and dvd: "g * g dvd f"
	then obtain h where f: "f = g * g * h" unfolding dvd_def by auto
	from arg_cong[OF this, of Mp] have "(g * g) dvdm f" unfolding dvdm_def by auto
	with ndvd[of g] have deg0: "degree_m g = 0" by auto
	hence g0: "M (lead_coeff g) = 0" unfolding Mp_def using deg
	by (metis M_def deg0 p poly_mod.degree_m_eq prime_gt_1_int neq0_conv)
	from p have p0: "p \<noteq> 0" by auto
	from arg_cong[OF f, of lead_coeff] have "lead_coeff f = lead_coeff g * lead_coeff g * lead_coeff h"
	by (auto simp: lead_coeff_mult)
	hence "lead_coeff g dvd lead_coeff f" by auto
	with cop have cop: "coprime (lead_coeff g) p"
	by (auto elim: coprime_imp_coprime intro: dvd_trans)
	with p0 have "coprime (lead_coeff g mod p) p" by simp
	also have "lead_coeff g mod p = 0"
	using M_def g0 by simp
	finally show False using p
	unfolding prime_int_iff
	by (simp add: prime_int_iff)
	qed
	qed

	lemma(in poly_mod_prime) separable_impl:
	shows "separable_impl p f \<Longrightarrow> square_free_m f"
	"nat p > degree_m f \<Longrightarrow> nat p > separable_bound f \<Longrightarrow> square_free f
	\<Longrightarrow> separable_impl p f"
	using
	separable_impl_integer[of f]
	separable_impl_uint32[of f]
	separable_impl_uint64[of f]
	unfolding separable_impl_def by (auto split: if_splits)

	lemma coprime_lead_coeff_large_prime: assumes prime: "prime (p :: int)"
	and large: "p > abs (lead_coeff f)"
	and f: "f \<noteq> 0"
	shows "coprime (lead_coeff f) p"
	proof -
	{
	fix lc
	assume "0 < lc" "lc < p"
	then have "\<not> p dvd lc"
	by (simp add: zdvd_not_zless)
	with \<open>prime p\<close> have "coprime p lc"
	by (auto intro: prime_imp_coprime)
	then have "coprime lc p"
	by (simp add: ac_simps)
	} note main = this
	define lc where "lc = lead_coeff f"
	from f have lc0: "lc \<noteq> 0" unfolding lc_def by auto
	from large have large: "p > abs lc" unfolding lc_def by auto
	have "coprime lc p"
	proof (cases "lc > 0")
	case True
	from large have "p > lc" by auto
	from main[OF True this] show ?thesis .
	next
	case False
	let ?mlc = "- lc"
	from large False lc0 have "?mlc > 0" "p > ?mlc" by auto
	from main[OF this] show ?thesis by simp
	qed
	thus ?thesis unfolding lc_def by auto
	qed

	lemma prime_for_berlekamp_zassenhaus_exists: assumes sf: "square_free f"
	shows "\<exists> p. prime p \<and> (coprime (lead_coeff f) p \<and> separable_impl p f)"
	proof (rule ccontr)
	from assms have f0: "f \<noteq> 0" unfolding square_free_def by auto
	define n where "n = max (max (abs (lead_coeff f)) (degree f)) (separable_bound f)"
	assume contr: "\<not> ?thesis"
	{
	fix p :: int
	assume prime: "prime p" and n: "p > n"
	then interpret poly_mod_prime p by unfold_locales
	from n have large: "p > abs (lead_coeff f)" "nat p > degree f" "nat p > separable_bound f"
	unfolding n_def by auto
	from coprime_lead_coeff_large_prime[OF prime large(1) f0]
	have cop: "coprime (lead_coeff f) p" by auto
	with prime contr have nsf: "\<not> separable_impl p f" by auto
	from large(2) have "nat p > degree_m f" using degree_m_le[of f] by auto
	from separable_impl(2)[OF this large(3) sf] nsf have False by auto
	}
	hence no_large_prime: "\<And> p. prime p \<Longrightarrow> p > n \<Longrightarrow> False" by auto
	from bigger_prime[of "nat n"] obtain p where *: "prime p" "p > nat n" by auto
	define q where "q \<equiv> int p"
	from * have "prime q" "q > n" unfolding q_def by auto
	from no_large_prime[OF this]
	show False .
	qed

	definition next_primes :: "nat \<Rightarrow> nat \<times> nat list" where
	"next_primes n = (if n = 0 then next_candidates 0 else
	let (m,ps) = next_candidates n in (m,filter prime ps))"

	partial_function (tailrec) find_prime_main ::
	"(nat \<Rightarrow> bool) \<Rightarrow> nat \<Rightarrow> nat list \<Rightarrow> nat" where
	[code]: "find_prime_main f np ps = (case ps of [] \<Rightarrow>
	let (np',ps') = next_primes np
	in find_prime_main f np' ps'
	\| (p # ps) \<Rightarrow> if f p then p else find_prime_main f np ps)"

	definition find_prime :: "(nat \<Rightarrow> bool) \<Rightarrow> nat" where
	"find_prime f = find_prime_main f 0 []"


	lemma next_primes: assumes res: "next_primes n = (m,ps)"
	and n: "candidate_invariant n"
	shows "candidate_invariant m" "sorted ps" "distinct ps" "n < m"
	"set ps = {i. prime i \<and> n \<le> i \<and> i < m}"
	proof -
	have "candidate_invariant m \<and> sorted ps \<and> distinct ps \<and> n < m \<and>
	set ps = {i. prime i \<and> n \<le> i \<and> i < m}"
	proof (cases "n = 0")
	case True
	with res[unfolded next_primes_def] have nc: "next_candidates 0 = (m,ps)" by auto
	from this[unfolded next_candidates_def] have ps: "ps = primes_1000" and m: "m = 1001" by auto
	have ps: "set ps = {i. prime i \<and> n \<le> i \<and> i < m}" unfolding m True ps
	by (auto simp: primes_1000)
	with next_candidates[OF nc n[unfolded True]] True
	show ?thesis by simp
	next
	case False
	with res[unfolded next_primes_def Let_def] obtain qs where nc: "next_candidates n = (m, qs)"
	and ps: "ps = filter prime qs" by (cases "next_candidates n", auto)
	have "sorted qs \<Longrightarrow> sorted ps" unfolding ps using sorted_filter[of id qs prime] by auto
	with next_candidates[OF nc n] show ?thesis unfolding ps by auto
	qed
	thus "candidate_invariant m" "sorted ps" "distinct ps" "n < m"
	"set ps = {i. prime i \<and> n \<le> i \<and> i < m}" by auto
	qed

	lemma find_prime: assumes "\<exists> n. prime n \<and> f n"
	shows "prime (find_prime f) \<and> f (find_prime f)"
	proof -
	from assms obtain n where fn: "prime n" "f n" by auto
	{
	fix i ps m
	assume "candidate_invariant i"
	and "n \<in> set ps \<or> n \<ge> i"
	and "m = (Suc n - i, length ps)"
	and "\<And> p. p \<in> set ps \<Longrightarrow> prime p"
	hence "prime (find_prime_main f i ps) \<and> f (find_prime_main f i ps)"
	proof (induct m arbitrary: i ps rule: wf_induct[OF wf_measures[of "[fst, snd]"]])
	case (1 m i ps)
	note IH = 1(1)[rule_format]
	note can = 1(2)
	note n = 1(3)
	note m = 1(4)
	note ps = 1(5)
	note simps [simp] = find_prime_main.simps[of f i ps]
	show ?case
	proof (cases ps)
	case Nil
	with n have i_n: "i \<le> n" by auto
	obtain j qs where np: "next_primes i = (j,qs)" by force
	note j = next_primes[OF np can]
	from j(4) i_n m have meas: "((Suc n - j, length qs), m) \<in> measures [fst, snd]" by auto
	have n: "n \<in> set qs \<or> j \<le> n" unfolding j(5) using i_n fn by auto
	show ?thesis unfolding simps using IH[OF meas j(1) n refl] j(5) by (simp add: Nil np)
	next
	case (Cons p qs)
	show ?thesis
	proof (cases "f p")
	case True
	thus ?thesis unfolding simps using ps unfolding Cons by simp
	next
	case False
	have m: "((Suc n - i, length qs), m) \<in> measures [fst, snd]" using m unfolding Cons by simp
	have n: "n \<in> set qs \<or> i \<le> n" using False n fn by (auto simp: Cons)
	from IH[OF m can n refl ps]
	show ?thesis unfolding simps using Cons False by simp
	qed
	qed
	qed
	} note main = this
	have "candidate_invariant 0" by (simp add: candidate_invariant_def)
	from main[OF this _ refl, of Nil] show ?thesis unfolding find_prime_def by auto
	qed

	definition suitable_prime_bz :: "int poly \<Rightarrow> int" where
	"suitable_prime_bz f \<equiv> let lc = lead_coeff f in int (find_prime (\<lambda> n. let p = int n in
	coprime lc p \<and> separable_impl p f))"

	lemma suitable_prime_bz: assumes sf: "square_free f" and p: "p = suitable_prime_bz f"
	shows "prime p" "coprime (lead_coeff f) p" "poly_mod.square_free_m p f"
	proof -
	let ?lc = "lead_coeff f"
	from prime_for_berlekamp_zassenhaus_exists[OF sf, unfolded Let_def]
	obtain P where *: "prime P \<and> coprime ?lc P \<and> separable_impl P f"
	by auto
	hence "prime (nat P)" using prime_int_nat_transfer by blast
	with * have "\<exists> p. prime p \<and> coprime ?lc (int p) \<and> separable_impl p f"
	by (intro exI [of _ "nat P"]) (auto dest: prime_gt_0_int)
	from find_prime[OF this]
	have prime: "prime p" and cop: "coprime ?lc p" and sf: "separable_impl p f"
	unfolding p suitable_prime_bz_def Let_def by auto
	then interpret poly_mod_prime p by unfold_locales
	from prime cop separable_impl(1)[OF sf]
	show "prime p" "coprime ?lc p" "square_free_m f" by auto
	qed

	definition square_free_heuristic :: "int poly \<Rightarrow> int option" where
	"square_free_heuristic f = (let lc = lead_coeff f in
	find (\<lambda> p. coprime lc p \<and> separable_impl p f) [2, 3, 5, 7, 11, 13, 17, 19, 23])"

	lemma find_Some_D: "find f xs = Some y \<Longrightarrow> y \<in> set xs \<and> f y" unfolding find_Some_iff by auto

	lemma square_free_heuristic: assumes "square_free_heuristic f = Some p"
	shows "coprime (lead_coeff f) p \<and> separable_impl p f \<and> prime p"
	proof -
	from find_Some_D[OF assms[unfolded square_free_heuristic_def Let_def]]
	show ?thesis by auto
	qed

	end