isabelle: src/HOL/Tools/cnf_funcs.ML@fff6f11b1f09 (annotated)

17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	1	(* Title: HOL/Tools/cnf_funcs.ML
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	2	Author: Alwen Tiu, QSL Team, LORIA (http://qsl.loria.fr)
29265 5b4247055bd7 moved old add_term_vars, add_term_frees etc. to structure OldTerm; wenzelm parents: 26341 diff changeset	3	Author: Tjark Weber, TU Muenchen
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	4
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	5	FIXME: major overlaps with the code in meson.ML
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	6
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	7	Functions and tactics to transform a formula into Conjunctive Normal
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	8	Form (CNF).
24958 ff15f76741bd rationalized redundant code paulson parents: 21576 diff changeset	9
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	10	A formula in CNF is of the following form:
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	11
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	12	(x11 \| x12 \| ... \| x1n) & ... & (xm1 \| xm2 \| ... \| xmk)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	13	False
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	14	True
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	15
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	16	where each xij is a literal (a positive or negative atomic Boolean
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	17	term), i.e. the formula is a conjunction of disjunctions of literals,
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	18	or "False", or "True".
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	19
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	20	A (non-empty) disjunction of literals is referred to as "clause".
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	21
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	22	For the purpose of SAT proof reconstruction, we also make use of
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	23	another representation of clauses, which we call the "raw clauses".
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	24	Raw clauses are of the form
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	25
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	26	[..., x1', x2', ..., xn'] \|- False ,
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	27
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	28	where each xi is a literal, and each xi' is the negation normal form
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	29	of ~xi.
19236 150e8b0fb991 clauses now use (meta-)hyps instead of (meta-)implications; significant speedup webertj parents: 17809 diff changeset	30
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	31	Literals are successively removed from the hyps of raw clauses by
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32740 diff changeset	32	resolution during SAT proof reconstruction.
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	33	*)
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	34
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	35	signature CNF =
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	36	sig
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	37	val is_atom: term -> bool
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	38	val is_literal: term -> bool
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	39	val is_clause: term -> bool
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	40	val clause_is_trivial: term -> bool
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	41
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	42	val clause2raw_thm: thm -> thm
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	43
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	44	val weakening_tac: int -> tactic (* removes the first hypothesis of a subgoal *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	45
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	46	val make_cnf_thm: theory -> term -> thm
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	47	val make_cnfx_thm: theory -> term -> thm
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	48	val cnf_rewrite_tac: Proof.context -> int -> tactic (* converts all prems of a subgoal to CNF *)
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	49	val cnfx_rewrite_tac: Proof.context -> int -> tactic
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	50	(* converts all prems of a subgoal to (almost) definitional CNF *)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	51	end;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	52
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	53	structure cnf : CNF =
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	54	struct
1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	55
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	56	val clause2raw_notE = @{lemma "[\| P; ~P \|] ==> False" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	57	val clause2raw_not_disj = @{lemma "[\| ~P; ~Q \|] ==> ~(P \| Q)" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	58	val clause2raw_not_not = @{lemma "P ==> ~~P" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	59
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	60	val iff_refl = @{lemma "(P::bool) = P" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	61	val iff_trans = @{lemma "[\| (P::bool) = Q; Q = R \|] ==> P = R" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	62	val conj_cong = @{lemma "[\| P = P'; Q = Q' \|] ==> (P & Q) = (P' & Q')" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	63	val disj_cong = @{lemma "[\| P = P'; Q = Q' \|] ==> (P \| Q) = (P' \| Q')" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	64
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	65	val make_nnf_imp = @{lemma "[\| (~P) = P'; Q = Q' \|] ==> (P --> Q) = (P' \| Q')" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	66	val make_nnf_iff = @{lemma "[\| P = P'; (~P) = NP; Q = Q'; (~Q) = NQ \|] ==> (P = Q) = ((P' \| NQ) & (NP \| Q'))" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	67	val make_nnf_not_false = @{lemma "(~False) = True" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	68	val make_nnf_not_true = @{lemma "(~True) = False" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	69	val make_nnf_not_conj = @{lemma "[\| (~P) = P'; (~Q) = Q' \|] ==> (~(P & Q)) = (P' \| Q')" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	70	val make_nnf_not_disj = @{lemma "[\| (~P) = P'; (~Q) = Q' \|] ==> (~(P \| Q)) = (P' & Q')" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	71	val make_nnf_not_imp = @{lemma "[\| P = P'; (~Q) = Q' \|] ==> (~(P --> Q)) = (P' & Q')" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	72	val make_nnf_not_iff = @{lemma "[\| P = P'; (~P) = NP; Q = Q'; (~Q) = NQ \|] ==> (~(P = Q)) = ((P' \| Q') & (NP \| NQ))" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	73	val make_nnf_not_not = @{lemma "P = P' ==> (~~P) = P'" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	74
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	75	val simp_TF_conj_True_l = @{lemma "[\| P = True; Q = Q' \|] ==> (P & Q) = Q'" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	76	val simp_TF_conj_True_r = @{lemma "[\| P = P'; Q = True \|] ==> (P & Q) = P'" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	77	val simp_TF_conj_False_l = @{lemma "P = False ==> (P & Q) = False" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	78	val simp_TF_conj_False_r = @{lemma "Q = False ==> (P & Q) = False" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	79	val simp_TF_disj_True_l = @{lemma "P = True ==> (P \| Q) = True" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	80	val simp_TF_disj_True_r = @{lemma "Q = True ==> (P \| Q) = True" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	81	val simp_TF_disj_False_l = @{lemma "[\| P = False; Q = Q' \|] ==> (P \| Q) = Q'" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	82	val simp_TF_disj_False_r = @{lemma "[\| P = P'; Q = False \|] ==> (P \| Q) = P'" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	83
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	84	val make_cnf_disj_conj_l = @{lemma "[\| (P \| R) = PR; (Q \| R) = QR \|] ==> ((P & Q) \| R) = (PR & QR)" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	85	val make_cnf_disj_conj_r = @{lemma "[\| (P \| Q) = PQ; (P \| R) = PR \|] ==> (P \| (Q & R)) = (PQ & PR)" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	86
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	87	val make_cnfx_disj_ex_l = @{lemma "((EX (x::bool). P x) \| Q) = (EX x. P x \| Q)" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	88	val make_cnfx_disj_ex_r = @{lemma "(P \| (EX (x::bool). Q x)) = (EX x. P \| Q x)" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	89	val make_cnfx_newlit = @{lemma "(P \| Q) = (EX x. (P \| x) & (Q \| ~x))" by auto};
c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	90	val make_cnfx_ex_cong = @{lemma "(ALL (x::bool). P x = Q x) ==> (EX x. P x) = (EX x. Q x)" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	91
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	92	val weakening_thm = @{lemma "[\| P; Q \|] ==> Q" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	93
30607 c3d1590debd8 eliminated global SIMPSET, CLASET etc. -- refer to explicit context; wenzelm parents: 29265 diff changeset	94	val cnftac_eq_imp = @{lemma "[\| P = Q; P \|] ==> Q" by auto};
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	95
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	96	fun is_atom (Const ("False", _)) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	97	\| is_atom (Const ("True", _)) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	98	\| is_atom (Const ("op &", _) $ _ $ _) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	99	\| is_atom (Const ("op \|", _) $ _ $ _) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	100	\| is_atom (Const ("op -->", _) $ _ $ _) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	101	\| is_atom (Const ("op =", Type ("fun", Type ("bool", []) :: _)) $ _ $ _) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	102	\| is_atom (Const ("Not", _) $ _) = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	103	\| is_atom _ = true;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	104
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	105	fun is_literal (Const ("Not", _) $ x) = is_atom x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	106	\| is_literal x = is_atom x;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	107
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	108	fun is_clause (Const ("op \|", _) $ x $ y) = is_clause x andalso is_clause y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	109	\| is_clause x = is_literal x;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	110
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	111	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	112	(* clause_is_trivial: a clause is trivially true if it contains both an atom *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	113	(* and the atom's negation *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	114	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	115
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	116	(* Term.term -> bool *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	117
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	118	fun clause_is_trivial c =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	119	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	120	(* Term.term -> Term.term *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	121	fun dual (Const ("Not", _) $ x) = x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	122	\| dual x = HOLogic.Not $ x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	123	(* Term.term list -> bool *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	124	fun has_duals [] = false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	125	\| has_duals (x::xs) = (dual x) mem xs orelse has_duals xs
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	126	in
24958 ff15f76741bd rationalized redundant code paulson parents: 21576 diff changeset	127	has_duals (HOLogic.disjuncts c)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	128	end;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	129
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	130	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	131	(* clause2raw_thm: translates a clause into a raw clause, i.e. *)
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	132	(* [...] \|- x1 \| ... \| xn *)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	133	(* (where each xi is a literal) is translated to *)
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	134	(* [..., x1', ..., xn'] \|- False , *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	135	(* where each xi' is the negation normal form of ~xi *)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	136	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	137
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	138	(* Thm.thm -> Thm.thm *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	139
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	140	fun clause2raw_thm clause =
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	141	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	142	(* eliminates negated disjunctions from the i-th premise, possibly *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	143	(* adding new premises, then continues with the (i+1)-th premise *)
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	144	(* int -> Thm.thm -> Thm.thm *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	145	fun not_disj_to_prem i thm =
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	146	if i > nprems_of thm then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	147	thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	148	else
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	149	not_disj_to_prem (i+1) (Seq.hd (REPEAT_DETERM (rtac clause2raw_not_disj i) thm))
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	150	(* moves all premises to hyps, i.e. "[...] \|- A1 ==> ... ==> An ==> B" *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	151	(* becomes "[..., A1, ..., An] \|- B" *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	152	(* Thm.thm -> Thm.thm *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	153	fun prems_to_hyps thm =
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	154	fold (fn cprem => fn thm' =>
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	155	Thm.implies_elim thm' (Thm.assume cprem)) (cprems_of thm) thm
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	156	in
20440 e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	157	(* [...] \|- ~(x1 \| ... \| xn) ==> False *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	158	(clause2raw_notE OF [clause])
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	159	(* [...] \|- ~x1 ==> ... ==> ~xn ==> False *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	160	\|> not_disj_to_prem 1
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	161	(* [...] \|- x1' ==> ... ==> xn' ==> False *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	162	\|> Seq.hd o TRYALL (rtac clause2raw_not_not)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	163	(* [..., x1', ..., xn'] \|- False *)
e6fe74eebda3 faster clause representation (again): full CNF formula as a hypothesis, instead of separate clauses webertj parents: 19236 diff changeset	164	\|> prems_to_hyps
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	165	end;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	166
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	167	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	168	(* inst_thm: instantiates a theorem with a list of terms *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	169	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	170
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	171	fun inst_thm thy ts thm =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	172	instantiate' [] (map (SOME o cterm_of thy) ts) thm;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	173
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	174	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	175	(* Naive CNF transformation *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	176	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	177
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	178	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	179	(* make_nnf_thm: produces a theorem of the form t = t', where t' is the *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	180	(* negation normal form (i.e. negation only occurs in front of atoms) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	181	(* of t; implications ("-->") and equivalences ("=" on bool) are *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	182	(* eliminated (possibly causing an exponential blowup) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	183	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	184
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	185	(* Theory.theory -> Term.term -> Thm.thm *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	186
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	187	fun make_nnf_thm thy (Const ("op &", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	188	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	189	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	190	val thm2 = make_nnf_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	191	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	192	conj_cong OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	193	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	194	\| make_nnf_thm thy (Const ("op \|", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	195	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	196	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	197	val thm2 = make_nnf_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	198	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	199	disj_cong OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	200	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	201	\| make_nnf_thm thy (Const ("op -->", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	202	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	203	val thm1 = make_nnf_thm thy (HOLogic.Not $ x)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	204	val thm2 = make_nnf_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	205	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	206	make_nnf_imp OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	207	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	208	\| make_nnf_thm thy (Const ("op =", Type ("fun", Type ("bool", []) :: _)) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	209	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	210	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	211	val thm2 = make_nnf_thm thy (HOLogic.Not $ x)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	212	val thm3 = make_nnf_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	213	val thm4 = make_nnf_thm thy (HOLogic.Not $ y)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	214	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	215	make_nnf_iff OF [thm1, thm2, thm3, thm4]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	216	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	217	\| make_nnf_thm thy (Const ("Not", _) $ Const ("False", _)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	218	make_nnf_not_false
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	219	\| make_nnf_thm thy (Const ("Not", _) $ Const ("True", _)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	220	make_nnf_not_true
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	221	\| make_nnf_thm thy (Const ("Not", _) $ (Const ("op &", _) $ x $ y)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	222	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	223	val thm1 = make_nnf_thm thy (HOLogic.Not $ x)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	224	val thm2 = make_nnf_thm thy (HOLogic.Not $ y)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	225	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	226	make_nnf_not_conj OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	227	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	228	\| make_nnf_thm thy (Const ("Not", _) $ (Const ("op \|", _) $ x $ y)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	229	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	230	val thm1 = make_nnf_thm thy (HOLogic.Not $ x)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	231	val thm2 = make_nnf_thm thy (HOLogic.Not $ y)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	232	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	233	make_nnf_not_disj OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	234	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	235	\| make_nnf_thm thy (Const ("Not", _) $ (Const ("op -->", _) $ x $ y)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	236	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	237	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	238	val thm2 = make_nnf_thm thy (HOLogic.Not $ y)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	239	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	240	make_nnf_not_imp OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	241	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	242	\| make_nnf_thm thy (Const ("Not", _) $ (Const ("op =", Type ("fun", Type ("bool", []) :: _)) $ x $ y)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	243	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	244	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	245	val thm2 = make_nnf_thm thy (HOLogic.Not $ x)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	246	val thm3 = make_nnf_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	247	val thm4 = make_nnf_thm thy (HOLogic.Not $ y)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	248	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	249	make_nnf_not_iff OF [thm1, thm2, thm3, thm4]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	250	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	251	\| make_nnf_thm thy (Const ("Not", _) $ (Const ("Not", _) $ x)) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	252	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	253	val thm1 = make_nnf_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	254	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	255	make_nnf_not_not OF [thm1]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	256	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	257	\| make_nnf_thm thy t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	258	inst_thm thy [t] iff_refl;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	259
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	260	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	261	(* simp_True_False_thm: produces a theorem t = t', where t' is equivalent to *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	262	(* t, but simplified wrt. the following theorems: *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	263	(* (True & x) = x *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	264	(* (x & True) = x *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	265	(* (False & x) = False *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	266	(* (x & False) = False *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	267	(* (True \| x) = True *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	268	(* (x \| True) = True *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	269	(* (False \| x) = x *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	270	(* (x \| False) = x *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	271	(* No simplification is performed below connectives other than & and \|. *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	272	(* Optimization: The right-hand side of a conjunction (disjunction) is *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	273	(* simplified only if the left-hand side does not simplify to False *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	274	(* (True, respectively). *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	275	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	276
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	277	(* Theory.theory -> Term.term -> Thm.thm *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	278
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	279	fun simp_True_False_thm thy (Const ("op &", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	280	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	281	val thm1 = simp_True_False_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	282	val x' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	283	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	284	if x' = HOLogic.false_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	285	simp_TF_conj_False_l OF [thm1] (* (x & y) = False *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	286	else
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	287	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	288	val thm2 = simp_True_False_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	289	val y' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	290	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	291	if x' = HOLogic.true_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	292	simp_TF_conj_True_l OF [thm1, thm2] (* (x & y) = y' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	293	else if y' = HOLogic.false_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	294	simp_TF_conj_False_r OF [thm2] (* (x & y) = False *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	295	else if y' = HOLogic.true_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	296	simp_TF_conj_True_r OF [thm1, thm2] (* (x & y) = x' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	297	else
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	298	conj_cong OF [thm1, thm2] (* (x & y) = (x' & y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	299	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	300	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	301	\| simp_True_False_thm thy (Const ("op \|", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	302	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	303	val thm1 = simp_True_False_thm thy x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	304	val x' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	305	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	306	if x' = HOLogic.true_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	307	simp_TF_disj_True_l OF [thm1] (* (x \| y) = True *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	308	else
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	309	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	310	val thm2 = simp_True_False_thm thy y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	311	val y' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	312	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	313	if x' = HOLogic.false_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	314	simp_TF_disj_False_l OF [thm1, thm2] (* (x \| y) = y' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	315	else if y' = HOLogic.true_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	316	simp_TF_disj_True_r OF [thm2] (* (x \| y) = True *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	317	else if y' = HOLogic.false_const then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	318	simp_TF_disj_False_r OF [thm1, thm2] (* (x \| y) = x' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	319	else
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	320	disj_cong OF [thm1, thm2] (* (x \| y) = (x' \| y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	321	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	322	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	323	\| simp_True_False_thm thy t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	324	inst_thm thy [t] iff_refl; (* t = t *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	325
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	326	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	327	(* make_cnf_thm: given any HOL term 't', produces a theorem t = t', where t' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	328	(* is in conjunction normal form. May cause an exponential blowup *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	329	(* in the length of the term. *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	330	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	331
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	332	(* Theory.theory -> Term.term -> Thm.thm *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	333
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	334	fun make_cnf_thm thy t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	335	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	336	(* Term.term -> Thm.thm *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	337	fun make_cnf_thm_from_nnf (Const ("op &", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	338	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	339	val thm1 = make_cnf_thm_from_nnf x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	340	val thm2 = make_cnf_thm_from_nnf y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	341	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	342	conj_cong OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	343	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	344	\| make_cnf_thm_from_nnf (Const ("op \|", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	345	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	346	(* produces a theorem "(x' \| y') = t'", where x', y', and t' are in CNF *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	347	fun make_cnf_disj_thm (Const ("op &", _) $ x1 $ x2) y' =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	348	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	349	val thm1 = make_cnf_disj_thm x1 y'
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	350	val thm2 = make_cnf_disj_thm x2 y'
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	351	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	352	make_cnf_disj_conj_l OF [thm1, thm2] (* ((x1 & x2) \| y') = ((x1 \| y')' & (x2 \| y')') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	353	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	354	\| make_cnf_disj_thm x' (Const ("op &", _) $ y1 $ y2) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	355	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	356	val thm1 = make_cnf_disj_thm x' y1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	357	val thm2 = make_cnf_disj_thm x' y2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	358	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	359	make_cnf_disj_conj_r OF [thm1, thm2] (* (x' \| (y1 & y2)) = ((x' \| y1)' & (x' \| y2)') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	360	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	361	\| make_cnf_disj_thm x' y' =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	362	inst_thm thy [HOLogic.mk_disj (x', y')] iff_refl (* (x' \| y') = (x' \| y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	363	val thm1 = make_cnf_thm_from_nnf x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	364	val thm2 = make_cnf_thm_from_nnf y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	365	val x' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	366	val y' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	367	val disj_thm = disj_cong OF [thm1, thm2] (* (x \| y) = (x' \| y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	368	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	369	iff_trans OF [disj_thm, make_cnf_disj_thm x' y']
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	370	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	371	\| make_cnf_thm_from_nnf t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	372	inst_thm thy [t] iff_refl
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	373	(* convert 't' to NNF first *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	374	val nnf_thm = make_nnf_thm thy t
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	375	val nnf = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) nnf_thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	376	(* then simplify wrt. True/False (this should preserve NNF) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	377	val simp_thm = simp_True_False_thm thy nnf
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	378	val simp = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) simp_thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	379	(* finally, convert to CNF (this should preserve the simplification) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	380	val cnf_thm = make_cnf_thm_from_nnf simp
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	381	in
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	382	iff_trans OF [iff_trans OF [nnf_thm, simp_thm], cnf_thm]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	383	end;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	384
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	385	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	386	(* CNF transformation by introducing new literals *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	387	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	388
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	389	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	390	(* make_cnfx_thm: given any HOL term 't', produces a theorem t = t', where *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	391	(* t' is almost in conjunction normal form, except that conjunctions *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	392	(* and existential quantifiers may be nested. (Use e.g. 'REPEAT_DETERM *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	393	(* (etac exE i ORELSE etac conjE i)' afterwards to normalize.) May *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	394	(* introduce new (existentially bound) literals. Note: the current *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	395	(* implementation calls 'make_nnf_thm', causing an exponential blowup *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	396	(* in the case of nested equivalences. *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	397	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	398
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	399	(* Theory.theory -> Term.term -> Thm.thm *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	400
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	401	fun make_cnfx_thm thy t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	402	let
32740 9dd0a2f83429 explicit indication of Unsynchronized.ref; wenzelm parents: 32283 diff changeset	403	val var_id = Unsynchronized.ref 0 (* properly initialized below *)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	404	fun new_free () =
32740 9dd0a2f83429 explicit indication of Unsynchronized.ref; wenzelm parents: 32283 diff changeset	405	Free ("cnfx_" ^ string_of_int (Unsynchronized.inc var_id), HOLogic.boolT)
9dd0a2f83429 explicit indication of Unsynchronized.ref; wenzelm parents: 32283 diff changeset	406	fun make_cnfx_thm_from_nnf (Const ("op &", _) $ x $ y) : thm =
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	407	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	408	val thm1 = make_cnfx_thm_from_nnf x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	409	val thm2 = make_cnfx_thm_from_nnf y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	410	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	411	conj_cong OF [thm1, thm2]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	412	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	413	\| make_cnfx_thm_from_nnf (Const ("op \|", _) $ x $ y) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	414	if is_clause x andalso is_clause y then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	415	inst_thm thy [HOLogic.mk_disj (x, y)] iff_refl
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	416	else if is_literal y orelse is_literal x then let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	417	(* produces a theorem "(x' \| y') = t'", where x', y', and t' are *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	418	(* almost in CNF, and x' or y' is a literal *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	419	fun make_cnfx_disj_thm (Const ("op &", _) $ x1 $ x2) y' =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	420	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	421	val thm1 = make_cnfx_disj_thm x1 y'
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	422	val thm2 = make_cnfx_disj_thm x2 y'
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	423	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	424	make_cnf_disj_conj_l OF [thm1, thm2] (* ((x1 & x2) \| y') = ((x1 \| y')' & (x2 \| y')') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	425	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	426	\| make_cnfx_disj_thm x' (Const ("op &", _) $ y1 $ y2) =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	427	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	428	val thm1 = make_cnfx_disj_thm x' y1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	429	val thm2 = make_cnfx_disj_thm x' y2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	430	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	431	make_cnf_disj_conj_r OF [thm1, thm2] (* (x' \| (y1 & y2)) = ((x' \| y1)' & (x' \| y2)') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	432	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	433	\| make_cnfx_disj_thm (Const ("Ex", _) $ x') y' =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	434	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	435	val thm1 = inst_thm thy [x', y'] make_cnfx_disj_ex_l (* ((Ex x') \| y') = (Ex (x' \| y')) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	436	val var = new_free ()
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	437	val thm2 = make_cnfx_disj_thm (betapply (x', var)) y' (* (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	438	val thm3 = forall_intr (cterm_of thy var) thm2 (* !!v. (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	439	val thm4 = strip_shyps (thm3 COMP allI) (* ALL v. (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	440	val thm5 = strip_shyps (thm4 RS make_cnfx_ex_cong) (* (EX v. (x' \| y')) = (EX v. body') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	441	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	442	iff_trans OF [thm1, thm5] (* ((Ex x') \| y') = (Ex v. body') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	443	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	444	\| make_cnfx_disj_thm x' (Const ("Ex", _) $ y') =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	445	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	446	val thm1 = inst_thm thy [x', y'] make_cnfx_disj_ex_r (* (x' \| (Ex y')) = (Ex (x' \| y')) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	447	val var = new_free ()
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	448	val thm2 = make_cnfx_disj_thm x' (betapply (y', var)) (* (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	449	val thm3 = forall_intr (cterm_of thy var) thm2 (* !!v. (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	450	val thm4 = strip_shyps (thm3 COMP allI) (* ALL v. (x' \| y') = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	451	val thm5 = strip_shyps (thm4 RS make_cnfx_ex_cong) (* (EX v. (x' \| y')) = (EX v. body') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	452	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	453	iff_trans OF [thm1, thm5] (* (x' \| (Ex y')) = (EX v. body') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	454	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	455	\| make_cnfx_disj_thm x' y' =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	456	inst_thm thy [HOLogic.mk_disj (x', y')] iff_refl (* (x' \| y') = (x' \| y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	457	val thm1 = make_cnfx_thm_from_nnf x
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	458	val thm2 = make_cnfx_thm_from_nnf y
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	459	val x' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm1
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	460	val y' = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) thm2
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	461	val disj_thm = disj_cong OF [thm1, thm2] (* (x \| y) = (x' \| y') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	462	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	463	iff_trans OF [disj_thm, make_cnfx_disj_thm x' y']
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	464	end else let (* neither 'x' nor 'y' is a literal: introduce a fresh variable *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	465	val thm1 = inst_thm thy [x, y] make_cnfx_newlit (* (x \| y) = EX v. (x \| v) & (y \| ~v) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	466	val var = new_free ()
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	467	val body = HOLogic.mk_conj (HOLogic.mk_disj (x, var), HOLogic.mk_disj (y, HOLogic.Not $ var))
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	468	val thm2 = make_cnfx_thm_from_nnf body (* (x \| v) & (y \| ~v) = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	469	val thm3 = forall_intr (cterm_of thy var) thm2 (* !!v. (x \| v) & (y \| ~v) = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	470	val thm4 = strip_shyps (thm3 COMP allI) (* ALL v. (x \| v) & (y \| ~v) = body' *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	471	val thm5 = strip_shyps (thm4 RS make_cnfx_ex_cong) (* (EX v. (x \| v) & (y \| ~v)) = (EX v. body') *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	472	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	473	iff_trans OF [thm1, thm5]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	474	end
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	475	\| make_cnfx_thm_from_nnf t =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	476	inst_thm thy [t] iff_refl
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	477	(* convert 't' to NNF first *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	478	val nnf_thm = make_nnf_thm thy t
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	479	val nnf = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) nnf_thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	480	(* then simplify wrt. True/False (this should preserve NNF) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	481	val simp_thm = simp_True_False_thm thy nnf
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	482	val simp = (snd o HOLogic.dest_eq o HOLogic.dest_Trueprop o prop_of) simp_thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	483	(* initialize var_id, in case the term already contains variables of the form "cnfx_<int>" *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	484	val _ = (var_id := fold (fn free => fn max =>
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	485	let
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	486	val (name, _) = dest_Free free
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	487	val idx = if String.isPrefix "cnfx_" name then
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	488	(Int.fromString o String.extract) (name, String.size "cnfx_", NONE)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	489	else
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	490	NONE
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	491	in
33035 15eab423e573 standardized basic operations on type option; wenzelm parents: 32960 diff changeset	492	Int.max (max, the_default 0 idx)
29265 5b4247055bd7 moved old add_term_vars, add_term_frees etc. to structure OldTerm; wenzelm parents: 26341 diff changeset	493	end) (OldTerm.term_frees simp) 0)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	494	(* finally, convert to definitional CNF (this should preserve the simplification) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	495	val cnfx_thm = make_cnfx_thm_from_nnf simp
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	496	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	497	iff_trans OF [iff_trans OF [nnf_thm, simp_thm], cnfx_thm]
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	498	end;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	499
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	500	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	501	(* Tactics *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	502	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	503
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	504	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	505	(* weakening_tac: removes the first hypothesis of the 'i'-th subgoal *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	506	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	507
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	508	fun weakening_tac i =
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	509	dtac weakening_thm i THEN atac (i+1);
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	510
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	511	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	512	(* cnf_rewrite_tac: converts all premises of the 'i'-th subgoal to CNF *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	513	(* (possibly causing an exponential blowup in the length of each *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	514	(* premise) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	515	(* ------------------------------------------------------------------------- *)
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	516
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	517	fun cnf_rewrite_tac ctxt i =
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	518	(* cut the CNF formulas as new premises *)
32283 3bebc195c124 qualified Subgoal.FOCUS; wenzelm parents: 32232 diff changeset	519	Subgoal.FOCUS (fn {prems, ...} =>
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	520	let
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	521	val thy = ProofContext.theory_of ctxt
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	522	val cnf_thms = map (make_cnf_thm thy o HOLogic.dest_Trueprop o Thm.prop_of) prems
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	523	val cut_thms = map (fn (th, pr) => cnftac_eq_imp OF [th, pr]) (cnf_thms ~~ prems)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	524	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	525	cut_facts_tac cut_thms 1
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	526	end) ctxt i
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	527	(* remove the original premises *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	528	THEN SELECT_GOAL (fn thm =>
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	529	let
21576 8c11b1ce2f05 simplified Logic.count_prems; wenzelm parents: 20547 diff changeset	530	val n = Logic.count_prems ((Term.strip_all_body o fst o Logic.dest_implies o prop_of) thm)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	531	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	532	PRIMITIVE (funpow (n div 2) (Seq.hd o weakening_tac 1)) thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	533	end) i;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	534
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	535	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	536	(* cnfx_rewrite_tac: converts all premises of the 'i'-th subgoal to CNF *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	537	(* (possibly introducing new literals) *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	538	(* ------------------------------------------------------------------------- *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	539
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	540	fun cnfx_rewrite_tac ctxt i =
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	541	(* cut the CNF formulas as new premises *)
32283 3bebc195c124 qualified Subgoal.FOCUS; wenzelm parents: 32232 diff changeset	542	Subgoal.FOCUS (fn {prems, ...} =>
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	543	let
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	544	val thy = ProofContext.theory_of ctxt;
6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	545	val cnfx_thms = map (make_cnfx_thm thy o HOLogic.dest_Trueprop o prop_of) prems
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	546	val cut_thms = map (fn (th, pr) => cnftac_eq_imp OF [th, pr]) (cnfx_thms ~~ prems)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	547	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	548	cut_facts_tac cut_thms 1
32232 6c394343360f proper context for SAT tactics; wenzelm parents: 32231 diff changeset	549	end) ctxt i
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	550	(* remove the original premises *)
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	551	THEN SELECT_GOAL (fn thm =>
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	552	let
21576 8c11b1ce2f05 simplified Logic.count_prems; wenzelm parents: 20547 diff changeset	553	val n = Logic.count_prems ((Term.strip_all_body o fst o Logic.dest_implies o prop_of) thm)
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	554	in
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	555	PRIMITIVE (funpow (n div 2) (Seq.hd o weakening_tac 1)) thm
195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	556	end) i;
17618 1330157e156a new sat tactic imports resolution proofs from zChaff webertj parents: diff changeset	557
17809 195045659c06 Tactics sat and satx reimplemented, several improvements webertj parents: 17618 diff changeset	558	end; (* of structure *)

author	haftmann
	Tue, 24 Nov 2009 17:28:25 +0100
changeset 33955	fff6f11b1f09
parent 33035	15eab423e573
child 36614	b6c031ad3690
permissions	-rw-r--r--