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theory CSP_F_law_SKIP_DIV(*-------------------------------------------* | CSP-Prover on Isabelle2004 | | December 2004 | | July 2005 (modified) | | September 2005 (modified) | | | | CSP-Prover on Isabelle2005 | | November 2005 (modified) | | April 2006 (modified) | | March 2007 (modified) | | | | Yoshinao Isobe (AIST JAPAN) | *-------------------------------------------*) theory CSP_F_law_SKIP_DIV imports CSP_F_law_SKIP CSP_F_law_DIV CSP_T_law_SKIP_DIV begin (********************************************************* (SKIP [+] DIV) *********************************************************) lemma cspF_SKIP_DIV_Ext_choice1: "(SKIP [+] DIV) =F[M1,M2] SKIP" apply (simp add: cspF_cspT_semantics) apply (simp add: cspT_SKIP_DIV_Ext_choice) apply (rule order_antisym) (* => *) apply (rule, simp add: in_traces in_failures) apply (force) (* <= *) apply (rule, simp add: in_traces in_failures) apply (force) done (********************************************************* (DIV [+] SKIP) *********************************************************) lemma cspF_SKIP_DIV_Ext_choice2: "(DIV [+] SKIP) =F[M1,M2] SKIP" apply (rule cspF_rw_left) apply (rule cspF_commut) apply (rule cspF_SKIP_DIV_Ext_choice1) done lemmas cspF_SKIP_DIV_Ext_choice = cspF_SKIP_DIV_Ext_choice1 cspF_SKIP_DIV_Ext_choice2 (********************************************************* SKIP |[X]| DIV *********************************************************) lemma cspF_SKIP_DIV_Parallel1: "SKIP |[X]| DIV =F[M1,M2] DIV" apply (simp add: cspF_cspT_semantics) apply (simp add: cspT_SKIP_DIV_Parallel1) apply (rule order_antisym) (* => *) apply (rule) apply (simp add: in_failures) (* <= *) apply (rule) apply (simp add: in_failures) done lemma cspF_SKIP_DIV_Parallel2: "DIV |[X]| SKIP =F[M1,M2] DIV" apply (rule cspF_rw_left) apply (rule cspF_commut) apply (rule cspF_rw_left) apply (rule cspF_SKIP_DIV_Parallel1) apply (rule cspF_reflex) done lemmas cspF_SKIP_DIV_Parallel = cspF_SKIP_DIV_Parallel1 cspF_SKIP_DIV_Parallel2 cspF_Parallel_term cspF_DIV_Parallel (********************************************************* DIV and Parallel-SKIP *********************************************************) (********************************************************* SKIP and Parallel *********************************************************) (*** SKIP and DIV ***) lemma cspF_DIV_Parallel_Ext_choice_SKIP_l: "(P [+] SKIP) |[X]| DIV =F[M,M] (P |[X]| DIV)" apply (simp add: cspF_cspT_semantics) apply (simp add: cspT_DIV_Parallel_Ext_choice_SKIP_l) apply (rule order_antisym) apply (rule, simp add: in_failures)+ done lemma cspF_DIV_Parallel_Ext_choice_SKIP_r: "DIV |[X]| (P [+] SKIP) =F[M,M] (DIV |[X]| P)" apply (rule cspF_rw_left) apply (rule cspF_commut) apply (rule cspF_rw_left) apply (rule cspF_DIV_Parallel_Ext_choice_SKIP_l) apply (rule cspF_commut) done lemmas cspF_DIV_Parallel_Ext_choice_SKIP = cspF_DIV_Parallel_Ext_choice_SKIP_l cspF_DIV_Parallel_Ext_choice_SKIP_r lemmas cspF_DIV_Parallel_Ext_choice = cspF_DIV_Parallel_Ext_choice_SKIP cspF_DIV_Parallel_Ext_choice_DIV (********************************************************* SKIP and Parallel-DIV *********************************************************) (*** DIV and SKIP ***) lemma cspF_SKIP_Parallel_Ext_choice_DIV_l: "((? :Y -> Pf) [+] DIV) |[X]| SKIP =F[M,M] (? x:(Y - X) -> (Pf x |[X]| SKIP)) [+] DIV" apply (simp add: cspF_cspT_semantics) apply (simp add: cspT_SKIP_Parallel_Ext_choice_DIV_l) apply (rule order_antisym) (* => *) apply (rule, simp add: in_failures) apply (elim conjE exE disjE) apply (simp_all) apply (simp add: par_tr_nil_right) apply (elim conjE) apply (simp add: image_iff) apply (rule_tac x="Ya" in exI) apply (rule_tac x="Z" in exI) apply (simp) apply (rule_tac x="sb" in exI) apply (rule_tac x="<>" in exI) apply (simp add: par_tr_nil_right) apply (simp add: par_tr_Tick_right) apply (elim conjE) apply (simp add: image_iff) apply (rule_tac x="Ya" in exI) apply (rule_tac x="Z" in exI) apply (simp) apply (rule_tac x="sb" in exI) apply (rule_tac x="<Tick>" in exI) apply (simp add: par_tr_Tick_right) apply (simp add: in_traces) (* <= *) apply (rule, simp add: in_failures) apply (elim conjE exE disjE) apply (simp_all) apply (simp add: in_traces) apply (rule_tac x="Ya" in exI) apply (rule_tac x="Z" in exI) apply (simp add: par_tr_nil_right) apply (rule_tac x="<Ev a> ^^^ sb" in exI) apply (rule_tac x="<>" in exI) apply (simp add: par_tr_nil_right) apply (simp add: image_iff) apply (fast) apply (rule_tac x="Ya" in exI) apply (rule_tac x="Z" in exI) apply (simp add: par_tr_Tick_right) apply (rule_tac x="<Ev a> ^^^ sb" in exI) apply (rule_tac x="<Tick>" in exI) apply (simp add: par_tr_Tick_right) apply (simp add: image_iff) apply (fast) apply (simp add: in_traces) apply (simp add: in_traces) done lemma cspF_SKIP_Parallel_Ext_choice_DIV_r: "SKIP |[X]| ((? :Y -> Pf) [+] DIV) =F[M,M] (? x:(Y - X) -> (SKIP |[X]| Pf x)) [+] DIV" apply (rule cspF_rw_left) apply (rule cspF_commut) apply (rule cspF_rw_left) apply (rule cspF_SKIP_Parallel_Ext_choice_DIV_l) apply (rule cspF_rw_left) apply (rule cspF_decompo) apply (rule cspF_decompo) apply (simp) apply (rule cspF_commut) apply (rule cspF_reflex) apply (rule cspF_reflex) done lemmas cspF_SKIP_Parallel_Ext_choice_DIV = cspF_SKIP_Parallel_Ext_choice_DIV_l cspF_SKIP_Parallel_Ext_choice_DIV_r lemmas cspF_SKIP_Parallel_Ext_choice = cspF_SKIP_Parallel_Ext_choice_SKIP cspF_SKIP_Parallel_Ext_choice_DIV (*---------------------------------------------* | SKIP , DIV | *---------------------------------------------*) lemmas cspF_SKIP_DIV_Parallel_step = cspF_Parallel_preterm cspF_DIV_Parallel_step lemmas cspF_SKIP_DIV_Parallel_Ext_choice = cspF_SKIP_Parallel_Ext_choice cspF_DIV_Parallel_Ext_choice lemmas cspF_SKIP_DIV_Hiding_Id = cspF_SKIP_Hiding_Id cspF_DIV_Hiding_Id lemmas cspF_SKIP_DIV_Hiding_step = cspF_DIV_Hiding_step cspF_SKIP_Hiding_step lemmas cspF_SKIP_DIV_Renaming_Id = cspF_SKIP_Renaming_Id cspF_DIV_Renaming_Id lemmas cspF_SKIP_DIV_Seq_compo = cspF_Seq_compo_unit cspF_DIV_Seq_compo lemmas cspF_SKIP_DIV_Seq_compo_step = cspF_SKIP_Seq_compo_step cspF_DIV_Seq_compo_step lemmas cspF_SKIP_DIV_Depth_rest = cspF_SKIP_Depth_rest cspF_DIV_Depth_rest lemmas cspF_SKIP_DIV = cspF_SKIP_DIV_Parallel_step cspF_SKIP_DIV_Ext_choice cspF_SKIP_DIV_Parallel cspF_SKIP_DIV_Parallel_Ext_choice cspF_SKIP_DIV_Hiding_Id cspF_SKIP_DIV_Hiding_step cspF_SKIP_DIV_Renaming_Id cspF_SKIP_DIV_Seq_compo cspF_SKIP_DIV_Seq_compo_step cspF_SKIP_DIV_Depth_rest (*** resolve ***) lemmas cspF_Ext_choice_SKIP_DIV_resolve = cspF_Ext_choice_SKIP_resolve cspF_Ext_choice_DIV_resolve (*----------------------------------------------* | | | for convenienve (SKIP or DIV) | | | *----------------------------------------------*) (********************************************************* (SKIP or DIV [+] SKIP or DIV) *********************************************************) lemma cspF_SKIP_or_DIV_Ext_choice: "[| P = SKIP | P = DIV ; Q = SKIP | Q = DIV |] ==> (P [+] Q) =F[M1,M2] (if (P = SKIP | Q = SKIP) then SKIP else DIV)" apply (elim disjE) apply (simp_all) apply (rule cspF_rw_left) apply (rule cspF_Ext_choice_idem) apply (simp) apply (simp add: cspF_SKIP_DIV) apply (simp add: cspF_SKIP_DIV) apply (rule cspF_rw_left) apply (rule cspF_Ext_choice_idem) apply (simp) done (********************************************************* (SKIP or DIV |[X]| SKIP or DIV) *********************************************************) lemma cspF_SKIP_or_DIV_Parallel: "[| P = SKIP | P = DIV ; Q = SKIP | Q = DIV |] ==> (P |[X]| Q) =F[M1,M2] (if (P = SKIP & Q = SKIP) then SKIP else DIV)" apply (elim disjE) apply (simp_all add: cspF_SKIP_DIV) done (********************************************************* (SKIP or DIV) and Hiding *********************************************************) lemma cspF_SKIP_or_DIV_Hiding_step: "Q = SKIP | Q = DIV ==> ((? :Y -> Pf) [+] Q) -- X =F[M,M] (((? x:(Y-X) -> (Pf x -- X)) [+] Q) |~| (! x:(Y Int X) .. (Pf x -- X)))" apply (erule disjE) apply (simp_all add: cspF_SKIP_DIV) done (********************************************************* SKIP or DIV |. Suc n *********************************************************) lemma cspF_SKIP_or_DIV_Depth_rest: "Q = SKIP | Q = DIV ==> Q |. (Suc n) =F[M1,M2] Q" apply (erule disjE) apply (simp_all add: cspF_SKIP_DIV) done (********************************************************* P [+] (SKIP or DIV) *********************************************************) lemma cspF_Ext_choice_SKIP_or_DIV_resolve: "Q = SKIP | Q = DIV ==> P [+] Q =F[M,M] P [> Q" apply (erule disjE) apply (simp_all add: cspF_Ext_choice_SKIP_DIV_resolve) done lemmas cspF_SKIP_or_DIV = cspF_SKIP_or_DIV_Ext_choice cspF_SKIP_or_DIV_Parallel cspF_SKIP_or_DIV_Hiding_step cspF_SKIP_or_DIV_Depth_rest (* no resolv *) end