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(* Title: HOL/IOA/NTP/Multiset.ML
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ID: $Id$
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Author: Tobias Nipkow & Konrad Slind
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Copyright 1994 TU Muenchen
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Axiomatic multisets.
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Should be done as a subtype and moved to a global place.
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*)
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goalw Multiset.thy [Multiset.count_def, Multiset.countm_empty_def]
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"count {|} x = 0";
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by (rtac refl 1);
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qed "count_empty";
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goal Multiset.thy
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"count (addm M x) y = (if y=x then Suc(count M y) else count M y)";
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by (asm_simp_tac (!simpset addsimps
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[Multiset.count_def,Multiset.countm_nonempty_def]
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setloop (split_tac [expand_if])) 1);
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qed "count_addm_simp";
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goal Multiset.thy "count M y <= count (addm M x) y";
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by (simp_tac (!simpset addsimps [count_addm_simp]
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setloop (split_tac [expand_if])) 1);
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qed "count_leq_addm";
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goalw Multiset.thy [Multiset.count_def]
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"count (delm M x) y = (if y=x then pred(count M y) else count M y)";
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by (res_inst_tac [("M","M")] Multiset.induction 1);
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by (asm_simp_tac (!simpset
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addsimps [Multiset.delm_empty_def,Multiset.countm_empty_def]
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setloop (split_tac [expand_if])) 1);
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by (asm_full_simp_tac (!simpset
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addsimps [Multiset.delm_nonempty_def,
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Multiset.countm_nonempty_def]
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setloop (split_tac [expand_if])) 1);
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by (safe_tac (!claset));
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by (Asm_full_simp_tac 1);
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qed "count_delm_simp";
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goal Multiset.thy "!!M. (!x. P(x) --> Q(x)) ==> (countm M P <= countm M Q)";
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by (res_inst_tac [("M","M")] Multiset.induction 1);
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by (simp_tac (!simpset addsimps [Multiset.countm_empty_def]) 1);
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by (simp_tac (!simpset addsimps[Multiset.countm_nonempty_def]) 1);
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by (etac (less_eq_add_cong RS mp RS mp) 1);
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by (asm_full_simp_tac (!simpset addsimps [le_eq_less_or_eq]
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setloop (split_tac [expand_if])) 1);
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qed "countm_props";
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goal Multiset.thy "!!P. ~P(obj) ==> countm M P = countm (delm M obj) P";
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by (res_inst_tac [("M","M")] Multiset.induction 1);
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by (simp_tac (!simpset addsimps [Multiset.delm_empty_def,
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Multiset.countm_empty_def]) 1);
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by (asm_simp_tac (!simpset addsimps[Multiset.countm_nonempty_def,
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Multiset.delm_nonempty_def]
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setloop (split_tac [expand_if])) 1);
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qed "countm_spurious_delm";
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goal Multiset.thy "!!P. P(x) ==> 0<count M x --> 0<countm M P";
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by (res_inst_tac [("M","M")] Multiset.induction 1);
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by (simp_tac (!simpset addsimps
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[Multiset.delm_empty_def,Multiset.count_def,
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Multiset.countm_empty_def]) 1);
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by (asm_simp_tac (!simpset addsimps
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[Multiset.count_def,Multiset.delm_nonempty_def,
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Multiset.countm_nonempty_def]
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setloop (split_tac [expand_if])) 1);
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val pos_count_imp_pos_countm = store_thm("pos_count_imp_pos_countm", standard(result() RS mp));
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goal Multiset.thy
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"!!P. P(x) ==> 0<count M x --> countm (delm M x) P = pred (countm M P)";
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by (res_inst_tac [("M","M")] Multiset.induction 1);
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by (simp_tac (!simpset addsimps
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[Multiset.delm_empty_def,
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Multiset.countm_empty_def]) 1);
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by (asm_simp_tac (!simpset addsimps
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[eq_sym_conv,count_addm_simp,Multiset.delm_nonempty_def,
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Multiset.countm_nonempty_def,pos_count_imp_pos_countm,
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suc_pred_id]
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setloop (split_tac [expand_if])) 1);
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qed "countm_done_delm";
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Addsimps [count_addm_simp, count_delm_simp,
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Multiset.countm_empty_def, Multiset.delm_empty_def,
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count_empty];
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