(* Title: HOL/Groebner_Basis.thy
Author: Amine Chaieb, TU Muenchen
*)
header {* Groebner bases *}
theory Groebner_Basis
imports Semiring_Normalization
keywords "try0" :: diag
begin
subsection {* Groebner Bases *}
lemmas bool_simps = simp_thms(1-34) -- {* FIXME move to @{theory HOL} *}
lemma nnf_simps: -- {* FIXME shadows fact binding in @{theory HOL} *}
"(\<not>(P \<and> Q)) = (\<not>P \<or> \<not>Q)" "(\<not>(P \<or> Q)) = (\<not>P \<and> \<not>Q)"
"(P \<longrightarrow> Q) = (\<not>P \<or> Q)"
"(P = Q) = ((P \<and> Q) \<or> (\<not>P \<and> \<not> Q))" "(\<not> \<not>(P)) = P"
by blast+
lemma dnf:
"(P & (Q | R)) = ((P&Q) | (P&R))"
"((Q | R) & P) = ((Q&P) | (R&P))"
"(P \<and> Q) = (Q \<and> P)"
"(P \<or> Q) = (Q \<or> P)"
by blast+
lemmas weak_dnf_simps = dnf bool_simps
lemma PFalse:
"P \<equiv> False \<Longrightarrow> \<not> P"
"\<not> P \<Longrightarrow> (P \<equiv> False)"
by auto
ML {*
structure Algebra_Simplification = Named_Thms
(
val name = @{binding algebra}
val description = "pre-simplification rules for algebraic methods"
)
*}
setup Algebra_Simplification.setup
ML_file "Tools/groebner.ML"
method_setup algebra = {*
let
fun keyword k = Scan.lift (Args.$$$ k -- Args.colon) >> K ()
val addN = "add"
val delN = "del"
val any_keyword = keyword addN || keyword delN
val thms = Scan.repeat (Scan.unless any_keyword Attrib.multi_thm) >> flat;
in
Scan.optional (keyword addN |-- thms) [] --
Scan.optional (keyword delN |-- thms) [] >>
(fn (add_ths, del_ths) => fn ctxt =>
SIMPLE_METHOD' (Groebner.algebra_tac add_ths del_ths ctxt))
end
*} "solve polynomial equations over (semi)rings and ideal membership problems using Groebner bases"
declare dvd_def[algebra]
declare dvd_eq_mod_eq_0[symmetric, algebra]
declare mod_div_trivial[algebra]
declare mod_mod_trivial[algebra]
declare div_by_0[algebra]
declare mod_by_0[algebra]
declare zmod_zdiv_equality[symmetric,algebra]
declare div_mod_equality2[symmetric, algebra]
declare div_minus_minus[algebra]
declare mod_minus_minus[algebra]
declare div_minus_right[algebra]
declare mod_minus_right[algebra]
declare div_0[algebra]
declare mod_0[algebra]
declare mod_by_1[algebra]
declare div_by_1[algebra]
declare mod_minus1_right[algebra]
declare div_minus1_right[algebra]
declare mod_mult_self2_is_0[algebra]
declare mod_mult_self1_is_0[algebra]
declare zmod_eq_0_iff[algebra]
declare dvd_0_left_iff[algebra]
declare zdvd1_eq[algebra]
declare zmod_eq_dvd_iff[algebra]
declare nat_mod_eq_iff[algebra]
subsection {* Try0 *}
ML_file "Tools/try0.ML"
end