isabelle: src/HOLCF/Ssum3.ML@dc496bb0638f (annotated)

1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	1	(* Title: HOLCF/ssum3.ML
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	2	ID: $Id$
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	3	Author: Franz Regensburger
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	4	Copyright 1993 Technische Universitaet Muenchen
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	5
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	6	Lemmas for ssum3.thy
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	7	*)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	8
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	9	open Ssum3;
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	10
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	11	(* for compatibility with old HOLCF-Version *)
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	12	qed_goal "inst_ssum_pcpo" thy "UU = Isinl UU"
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	13	(fn prems =>
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	14	[
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	15	(simp_tac (HOL_ss addsimps [UU_def,UU_ssum_def]) 1)
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	16	]);
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2566 diff changeset	17
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	18	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	19	(* continuity for Isinl and Isinr *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	20	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	21
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	22	qed_goal "contlub_Isinl" Ssum3.thy "contlub(Isinl)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	23	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	24	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	25	(rtac contlubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	26	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	27	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	28	(rtac (thelub_ssum1a RS sym) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	29	(rtac allI 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	30	(rtac exI 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	31	(rtac refl 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	32	(etac (monofun_Isinl RS ch2ch_monofun) 2),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	33	(case_tac "lub(range(Y))=UU" 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	34	(res_inst_tac [("s","UU"),("t","lub(range(Y))")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	35	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	36	(res_inst_tac [("f","Isinl")] arg_cong 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	37	(rtac (chain_UU_I_inverse RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	38	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	39	(res_inst_tac [("s","UU"),("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	40	(etac (chain_UU_I RS spec ) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	41	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	42	(rtac Iwhen1 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	43	(res_inst_tac [("f","Isinl")] arg_cong 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	44	(rtac lub_equal 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	45	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	46	(rtac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	47	(etac (monofun_Isinl RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	48	(rtac allI 1),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	49	(case_tac "Y(k)=UU" 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	50	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	51	(asm_simp_tac Ssum0_ss 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	52	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	53
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	54	qed_goal "contlub_Isinr" Ssum3.thy "contlub(Isinr)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	55	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	56	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	57	(rtac contlubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	58	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	59	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	60	(rtac (thelub_ssum1b RS sym) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	61	(rtac allI 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	62	(rtac exI 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	63	(rtac refl 3),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	64	(etac (monofun_Isinr RS ch2ch_monofun) 2),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	65	(case_tac "lub(range(Y))=UU" 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	66	(res_inst_tac [("s","UU"),("t","lub(range(Y))")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	67	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	68	((rtac arg_cong 1) THEN (rtac (chain_UU_I_inverse RS sym) 1)),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	69	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	70	(res_inst_tac [("s","UU"),("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	71	(etac (chain_UU_I RS spec ) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	72	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	73	(rtac (strict_IsinlIsinr RS subst) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	74	(rtac Iwhen1 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	75	((rtac arg_cong 1) THEN (rtac lub_equal 1)),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	76	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	77	(rtac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	78	(etac (monofun_Isinr RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	79	(rtac allI 1),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	80	(case_tac "Y(k)=UU" 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	81	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	82	(asm_simp_tac Ssum0_ss 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	83	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	84
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	85	qed_goal "cont_Isinl" Ssum3.thy "cont(Isinl)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	86	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	87	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	88	(rtac monocontlub2cont 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	89	(rtac monofun_Isinl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	90	(rtac contlub_Isinl 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	91	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	92
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	93	qed_goal "cont_Isinr" Ssum3.thy "cont(Isinr)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	94	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	95	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	96	(rtac monocontlub2cont 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	97	(rtac monofun_Isinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	98	(rtac contlub_Isinr 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	99	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	100
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	101
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	102	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	103	(* continuity for Iwhen in the firts two arguments *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	104	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	105
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	106	qed_goal "contlub_Iwhen1" Ssum3.thy "contlub(Iwhen)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	107	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	108	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	109	(rtac contlubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	110	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	111	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	112	(rtac (thelub_fun RS sym) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	113	(etac (monofun_Iwhen1 RS ch2ch_monofun) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	114	(rtac (expand_fun_eq RS iffD2) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	115	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	116	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	117	(rtac (thelub_fun RS sym) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	118	(rtac ch2ch_fun 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	119	(etac (monofun_Iwhen1 RS ch2ch_monofun) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	120	(rtac (expand_fun_eq RS iffD2) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	121	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	122	(res_inst_tac [("p","xa")] IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	123	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	124	(rtac (lub_const RS thelubI RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	125	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	126	(etac contlub_cfun_fun 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	127	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	128	(rtac (lub_const RS thelubI RS sym) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	129	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	130
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	131	qed_goal "contlub_Iwhen2" Ssum3.thy "contlub(Iwhen(f))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	132	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	133	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	134	(rtac contlubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	135	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	136	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	137	(rtac (thelub_fun RS sym) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	138	(etac (monofun_Iwhen2 RS ch2ch_monofun) 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	139	(rtac (expand_fun_eq RS iffD2) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	140	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	141	(res_inst_tac [("p","x")] IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	142	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	143	(rtac (lub_const RS thelubI RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	144	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	145	(rtac (lub_const RS thelubI RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	146	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	147	(etac contlub_cfun_fun 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	148	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	149
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	150	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	151	(* continuity for Iwhen in its third argument *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	152	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	153
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	154	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	155	(* first 5 ugly lemmas *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	156	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	157
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	158	qed_goal "ssum_lemma9" Ssum3.thy
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	159	"[\| chain(Y); lub(range(Y)) = Isinl(x)\|] ==> !i.? x. Y(i)=Isinl(x)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	160	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	161	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	162	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	163	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	164	(res_inst_tac [("p","Y(i)")] IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	165	(etac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	166	(etac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	167	(res_inst_tac [("P","y=UU")] notE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	168	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	169	(rtac (less_ssum3d RS iffD1) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	170	(etac subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	171	(etac subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	172	(etac is_ub_thelub 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	173	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	174
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	175
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	176	qed_goal "ssum_lemma10" Ssum3.thy
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	177	"[\| chain(Y); lub(range(Y)) = Isinr(x)\|] ==> !i.? x. Y(i)=Isinr(x)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	178	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	179	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	180	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	181	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	182	(res_inst_tac [("p","Y(i)")] IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	183	(rtac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	184	(etac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	185	(rtac strict_IsinlIsinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	186	(etac exI 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	187	(res_inst_tac [("P","xa=UU")] notE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	188	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	189	(rtac (less_ssum3c RS iffD1) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	190	(etac subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	191	(etac subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	192	(etac is_ub_thelub 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	193	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	194
8161 bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	195	Goal
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	196	"[\| chain(Y); lub(range(Y)) = Isinl(UU) \|] ==>\
8161 bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	197	\ Iwhen f g (lub(range Y)) = lub(range(%i. Iwhen f g (Y i)))";
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	198	by (asm_simp_tac Ssum0_ss 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	199	by (rtac (chain_UU_I_inverse RS sym) 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	200	by (rtac allI 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	201	by (res_inst_tac [("s","Isinl(UU)"),("t","Y(i)")] subst 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	202	by (rtac (inst_ssum_pcpo RS subst) 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	203	by (rtac (chain_UU_I RS spec RS sym) 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	204	by (atac 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	205	by (etac (inst_ssum_pcpo RS ssubst) 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	206	by (asm_simp_tac Ssum0_ss 1);
bde1391fd0a5 added range_composition (also to simpset) oheimb parents: 5439 diff changeset	207	qed "ssum_lemma11";
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	208
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	209	qed_goal "ssum_lemma12" Ssum3.thy
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	210	"[\| chain(Y); lub(range(Y)) = Isinl(x); x ~= UU \|] ==>\
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	211	\ Iwhen f g (lub(range Y)) = lub(range(%i. Iwhen f g (Y i)))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	212	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	213	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	214	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	215	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	216	(res_inst_tac [("t","x")] subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	217	(rtac inject_Isinl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	218	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	219	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	220	(rtac (thelub_ssum1a RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	221	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	222	(etac ssum_lemma9 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	223	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	224	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	225	(rtac contlub_cfun_arg 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	226	(rtac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	227	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	228	(rtac lub_equal2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	229	(rtac (chain_mono2 RS exE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	230	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	231	(rtac chain_UU_I_inverse2 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	232	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	233	(etac swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	234	(rtac inject_Isinl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	235	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	236	(etac sym 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	237	(etac notnotD 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	238	(rtac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	239	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	240	(rtac (ssum_lemma9 RS spec RS exE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	241	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	242	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	243	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	244	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	245	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	246	(rtac cfun_arg_cong 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	247	(rtac Iwhen2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	248	(res_inst_tac [("Pa","Y(i)=UU")] swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	249	(fast_tac HOL_cs 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	250	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	251	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	252	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	253	(fast_tac HOL_cs 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	254	(stac Iwhen2 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	255	(res_inst_tac [("Pa","Y(i)=UU")] swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	256	(fast_tac HOL_cs 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	257	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	258	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	259	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	260	(fast_tac HOL_cs 1),
4098 71e05eb27fb6 isatool fixclasimp; wenzelm parents: 3842 diff changeset	261	(simp_tac (simpset_of Cfun3.thy) 1),
5291 5706f0ef1d43 eliminated fabs,fapp. slotosch parents: 4721 diff changeset	262	(rtac (monofun_Rep_CFun2 RS ch2ch_monofun) 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	263	(etac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	264	(etac (monofun_Iwhen3 RS ch2ch_monofun) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	265	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	266
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	267
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	268	qed_goal "ssum_lemma13" Ssum3.thy
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	269	"[\| chain(Y); lub(range(Y)) = Isinr(x); x ~= UU \|] ==>\
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	270	\ Iwhen f g (lub(range Y)) = lub(range(%i. Iwhen f g (Y i)))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	271	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	272	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	273	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	274	(asm_simp_tac Ssum0_ss 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	275	(res_inst_tac [("t","x")] subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	276	(rtac inject_Isinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	277	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	278	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	279	(rtac (thelub_ssum1b RS sym) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	280	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	281	(etac ssum_lemma10 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	282	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	283	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	284	(rtac contlub_cfun_arg 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	285	(rtac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	286	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	287	(rtac lub_equal2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	288	(rtac (chain_mono2 RS exE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	289	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	290	(rtac chain_UU_I_inverse2 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	291	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	292	(etac swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	293	(rtac inject_Isinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	294	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	295	(etac sym 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	296	(rtac (strict_IsinlIsinr RS subst) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	297	(etac notnotD 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	298	(rtac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	299	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	300	(rtac (ssum_lemma10 RS spec RS exE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	301	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	302	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	303	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	304	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	305	(rtac trans 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	306	(rtac cfun_arg_cong 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	307	(rtac Iwhen3 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	308	(res_inst_tac [("Pa","Y(i)=UU")] swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	309	(fast_tac HOL_cs 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	310	(dtac notnotD 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	311	(stac inst_ssum_pcpo 1),
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	312	(stac strict_IsinlIsinr 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	313	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	314	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	315	(fast_tac HOL_cs 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	316	(stac Iwhen3 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	317	(res_inst_tac [("Pa","Y(i)=UU")] swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	318	(fast_tac HOL_cs 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	319	(dtac notnotD 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	320	(stac inst_ssum_pcpo 1),
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	321	(stac strict_IsinlIsinr 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	322	(res_inst_tac [("t","Y(i)")] ssubst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	323	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	324	(fast_tac HOL_cs 1),
4098 71e05eb27fb6 isatool fixclasimp; wenzelm parents: 3842 diff changeset	325	(simp_tac (simpset_of Cfun3.thy) 1),
5291 5706f0ef1d43 eliminated fabs,fapp. slotosch parents: 4721 diff changeset	326	(rtac (monofun_Rep_CFun2 RS ch2ch_monofun) 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	327	(etac (monofun_Iwhen3 RS ch2ch_monofun) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	328	(etac (monofun_Iwhen3 RS ch2ch_monofun) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	329	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	330
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	331
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	332	qed_goal "contlub_Iwhen3" Ssum3.thy "contlub(Iwhen(f)(g))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	333	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	334	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	335	(rtac contlubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	336	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	337	(res_inst_tac [("p","lub(range(Y))")] IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	338	(etac ssum_lemma11 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	339	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	340	(etac ssum_lemma12 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	341	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	342	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	343	(etac ssum_lemma13 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	344	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	345	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	346	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	347
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	348	qed_goal "cont_Iwhen1" Ssum3.thy "cont(Iwhen)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	349	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	350	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	351	(rtac monocontlub2cont 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	352	(rtac monofun_Iwhen1 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	353	(rtac contlub_Iwhen1 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	354	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	355
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	356	qed_goal "cont_Iwhen2" Ssum3.thy "cont(Iwhen(f))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	357	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	358	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	359	(rtac monocontlub2cont 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	360	(rtac monofun_Iwhen2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	361	(rtac contlub_Iwhen2 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	362	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	363
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	364	qed_goal "cont_Iwhen3" Ssum3.thy "cont(Iwhen(f)(g))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	365	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	366	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	367	(rtac monocontlub2cont 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	368	(rtac monofun_Iwhen3 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	369	(rtac contlub_Iwhen3 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	370	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	371
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	372	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	373	(* continuous versions of lemmas for 'a ++ 'b *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	374	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	375
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	376	qed_goalw "strict_sinl" Ssum3.thy [sinl_def] "sinl`UU =UU"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	377	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	378	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	379	(simp_tac (Ssum0_ss addsimps [cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	380	(rtac (inst_ssum_pcpo RS sym) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	381	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	382
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	383	qed_goalw "strict_sinr" Ssum3.thy [sinr_def] "sinr`UU=UU"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	384	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	385	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	386	(simp_tac (Ssum0_ss addsimps [cont_Isinr]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	387	(rtac (inst_ssum_pcpo RS sym) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	388	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	389
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	390	qed_goalw "noteq_sinlsinr" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	391	"sinl`a=sinr`b ==> a=UU & b=UU"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	392	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	393	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	394	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	395	(rtac noteq_IsinlIsinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	396	(etac box_equals 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	397	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	398	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	399	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	400
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	401	qed_goalw "inject_sinl" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	402	"sinl`a1=sinl`a2==> a1=a2"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	403	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	404	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	405	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	406	(rtac inject_Isinl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	407	(etac box_equals 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	408	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	409	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	410	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	411
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	412	qed_goalw "inject_sinr" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	413	"sinr`a1=sinr`a2==> a1=a2"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	414	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	415	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	416	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	417	(rtac inject_Isinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	418	(etac box_equals 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	419	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	420	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	421	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	422
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	423
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	424	qed_goal "defined_sinl" Ssum3.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	425	"x~=UU ==> sinl`x ~= UU"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	426	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	427	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	428	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	429	(etac swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	430	(rtac inject_sinl 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	431	(stac strict_sinl 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	432	(etac notnotD 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	433	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	434
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	435	qed_goal "defined_sinr" Ssum3.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	436	"x~=UU ==> sinr`x ~= UU"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	437	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	438	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	439	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	440	(etac swap 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	441	(rtac inject_sinr 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	442	(stac strict_sinr 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	443	(etac notnotD 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	444	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	445
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	446	qed_goalw "Exh_Ssum1" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	447	"z=UU \| (? a. z=sinl`a & a~=UU) \| (? b. z=sinr`b & b~=UU)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	448	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	449	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	450	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	451	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	452	(rtac Exh_Ssum 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	453	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	454
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	455
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	456	qed_goalw "ssumE" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	457	"[\|p=UU ==> Q ;\
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	458	\ !!x.[\|p=sinl`x; x~=UU \|] ==> Q;\
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	459	\ !!y.[\|p=sinr`y; y~=UU \|] ==> Q\|] ==> Q"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	460	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	461	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	462	(rtac IssumE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	463	(resolve_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	464	(stac inst_ssum_pcpo 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	465	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	466	(resolve_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	467	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	468	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	469	(resolve_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	470	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	471	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	472	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	473
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	474
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	475	qed_goalw "ssumE2" Ssum3.thy [sinl_def,sinr_def]
1168 74be52691d62 The curried version of HOLCF is now just called HOLCF. The old regensbu parents: 892 diff changeset	476	"[\|!!x.[\|p=sinl`x\|] ==> Q;\
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	477	\ !!y.[\|p=sinr`y\|] ==> Q\|] ==> Q"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	478	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	479	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	480	(rtac IssumE2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	481	(resolve_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	482	(stac beta_cfun 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	483	(rtac cont_Isinl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	484	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	485	(resolve_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	486	(stac beta_cfun 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	487	(rtac cont_Isinr 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	488	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	489	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	490
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	491	qed_goalw "sscase1" Ssum3.thy [sscase_def,sinl_def,sinr_def]
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	492	"sscase`f`g`UU = UU" (fn _ => let
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	493	val tac = (REPEAT (resolve_tac (cont_lemmas1 @ [cont_Iwhen1,cont_Iwhen2,
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	494	cont_Iwhen3,cont2cont_CF1L]) 1)) in
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	495	[
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	496	(stac inst_ssum_pcpo 1),
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	497	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	498	tac,
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	499	(stac beta_cfun 1),
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	500	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	501	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	502	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	503	(simp_tac Ssum0_ss 1)
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	504	] end);
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	505
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	506
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	507	val tac = (REPEAT (resolve_tac (cont_lemmas1 @ [cont_Iwhen1,cont_Iwhen2,
cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	508	cont_Iwhen3,cont_Isinl,cont_Isinr,cont2cont_CF1L]) 1));
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	509
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	510	qed_goalw "sscase2" Ssum3.thy [sscase_def,sinl_def,sinr_def]
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	511	"x~=UU==> sscase`f`g`(sinl`x) = f`x" (fn prems => [
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	512	(cut_facts_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	513	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	514	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	515	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	516	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	517	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	518	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	519	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	520	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	521	(asm_simp_tac Ssum0_ss 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	522	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	523
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	524	qed_goalw "sscase3" Ssum3.thy [sscase_def,sinl_def,sinr_def]
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	525	"x~=UU==> sscase`f`g`(sinr`x) = g`x" (fn prems => [
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	526	(cut_facts_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	527	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	528	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	529	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	530	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	531	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	532	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	533	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	534	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	535	(asm_simp_tac Ssum0_ss 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	536	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	537
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	538
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	539	qed_goalw "less_ssum4a" Ssum3.thy [sinl_def,sinr_def]
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	540	"(sinl`x << sinl`y) = (x << y)" (fn prems => [
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	541	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	542	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	543	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	544	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	545	(rtac less_ssum3a 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	546	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	547
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	548	qed_goalw "less_ssum4b" Ssum3.thy [sinl_def,sinr_def]
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	549	"(sinr`x << sinr`y) = (x << y)" (fn prems => [
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	550	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	551	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	552	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	553	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	554	(rtac less_ssum3b 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	555	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	556
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	557	qed_goalw "less_ssum4c" Ssum3.thy [sinl_def,sinr_def]
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	558	"(sinl`x << sinr`y) = (x = UU)" (fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	559	[
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	560	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	561	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	562	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	563	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	564	(rtac less_ssum3c 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	565	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	566
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	567	qed_goalw "less_ssum4d" Ssum3.thy [sinl_def,sinr_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	568	"(sinr`x << sinl`y) = (x = UU)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	569	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	570	[
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	571	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	572	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	573	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	574	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	575	(rtac less_ssum3d 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	576	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	577
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	578	qed_goalw "ssum_chainE" Ssum3.thy [sinl_def,sinr_def]
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	579	"chain(Y) ==> (!i.? x.(Y i)=sinl`x)\|(!i.? y.(Y i)=sinr`y)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	580	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	581	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	582	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	583	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinr,cont_Isinl]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	584	(etac ssum_lemma4 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	585	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	586
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	587
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	588	qed_goalw "thelub_ssum2a" Ssum3.thy [sinl_def,sinr_def,sscase_def]
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	589	"[\| chain(Y); !i.? x. Y(i) = sinl`x \|] ==>\
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	590	\ lub(range(Y)) = sinl`(lub(range(%i. sscase`(LAM x. x)`(LAM y. UU)`(Y i))))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	591	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	592	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	593	(cut_facts_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	594	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	595	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	596	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	597	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	598	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	599	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	600	(stac (beta_cfun RS ext) 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	601	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	602	(rtac thelub_ssum1a 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	603	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	604	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	605	(etac allE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	606	(etac exE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	607	(rtac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	608	(etac box_equals 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	609	(rtac refl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	610	(asm_simp_tac (Ssum0_ss addsimps [cont_Isinl]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	611	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	612
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	613	qed_goalw "thelub_ssum2b" Ssum3.thy [sinl_def,sinr_def,sscase_def]
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	614	"[\| chain(Y); !i.? x. Y(i) = sinr`x \|] ==>\
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	615	\ lub(range(Y)) = sinr`(lub(range(%i. sscase`(LAM y. UU)`(LAM x. x)`(Y i))))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	616	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	617	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	618	(cut_facts_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	619	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	620	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	621	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	622	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	623	(stac beta_cfun 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	624	tac,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1675 diff changeset	625	(stac (beta_cfun RS ext) 1),
2566 cbf02fc74332 changed handling of cont_lemmas and adm_lemmas oheimb parents: 2033 diff changeset	626	tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	627	(rtac thelub_ssum1b 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	628	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	629	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	630	(etac allE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	631	(etac exE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	632	(rtac exI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	633	(etac box_equals 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	634	(rtac refl 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	635	(asm_simp_tac (Ssum0_ss addsimps
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	636	[cont_Isinr,cont_Isinl,cont_Iwhen1,cont_Iwhen2,
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	637	cont_Iwhen3]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	638	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	639
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	640	qed_goalw "thelub_ssum2a_rev" Ssum3.thy [sinl_def,sinr_def]
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	641	"[\| chain(Y); lub(range(Y)) = sinl`x\|] ==> !i.? x. Y(i)=sinl`x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	642	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	643	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	644	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	645	(asm_simp_tac (Ssum0_ss addsimps
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	646	[cont_Isinr,cont_Isinl,cont_Iwhen1,cont_Iwhen2,
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	647	cont_Iwhen3]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	648	(etac ssum_lemma9 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	649	(asm_simp_tac (Ssum0_ss addsimps
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	650	[cont_Isinr,cont_Isinl,cont_Iwhen1,cont_Iwhen2,
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	651	cont_Iwhen3]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	652	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	653
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	654	qed_goalw "thelub_ssum2b_rev" Ssum3.thy [sinl_def,sinr_def]
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	655	"[\| chain(Y); lub(range(Y)) = sinr`x\|] ==> !i.? x. Y(i)=sinr`x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	656	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	657	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	658	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	659	(asm_simp_tac (Ssum0_ss addsimps
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	660	[cont_Isinr,cont_Isinl,cont_Iwhen1,cont_Iwhen2,
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	661	cont_Iwhen3]) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	662	(etac ssum_lemma10 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	663	(asm_simp_tac (Ssum0_ss addsimps
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	664	[cont_Isinr,cont_Isinl,cont_Iwhen1,cont_Iwhen2,
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	665	cont_Iwhen3]) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	666	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	667
892 d0dc8d057929 added qed, qed_goal[w] clasohm parents: 676 diff changeset	668	qed_goal "thelub_ssum3" Ssum3.thy
4721 c8a8482a8124 renamed is_chain to chain, is_tord to tord, replaced chain_finite by chfin oheimb parents: 4098 diff changeset	669	"chain(Y) ==>\
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	670	\ lub(range(Y)) = sinl`(lub(range(%i. sscase`(LAM x. x)`(LAM y. UU)`(Y i))))\
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	671	\ \| lub(range(Y)) = sinr`(lub(range(%i. sscase`(LAM y. UU)`(LAM x. x)`(Y i))))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	672	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	673	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	674	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	675	(rtac (ssum_chainE RS disjE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	676	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	677	(rtac disjI1 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	678	(etac thelub_ssum2a 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	679	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	680	(rtac disjI2 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	681	(etac thelub_ssum2b 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	682	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	683	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	684
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	685
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	686	qed_goal "sscase4" Ssum3.thy
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	687	"sscase`sinl`sinr`z=z"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	688	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	689	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	690	(res_inst_tac [("p","z")] ssumE 1),
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	691	(asm_simp_tac ((simpset_of Cfun3.thy) addsimps [sscase1,sscase2,sscase3]) 1),
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	692	(asm_simp_tac ((simpset_of Cfun3.thy) addsimps [sscase1,sscase2,sscase3]) 1),
2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	693	(asm_simp_tac ((simpset_of Cfun3.thy) addsimps [sscase1,sscase2,sscase3]) 1)
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1277 diff changeset	694	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	695
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	696
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	697	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	698	(* install simplifier for Ssum *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	699	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	700
1274 ea0668a1c0ba added 8bit pragmas regensbu parents: 1267 diff changeset	701	val Ssum_rews = [strict_sinl,strict_sinr,defined_sinl,defined_sinr,
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	702	sscase1,sscase2,sscase3];
1274 ea0668a1c0ba added 8bit pragmas regensbu parents: 1267 diff changeset	703
ea0668a1c0ba added 8bit pragmas regensbu parents: 1267 diff changeset	704	Addsimps [strict_sinl,strict_sinr,defined_sinl,defined_sinr,
5439 2e0c18eedfd0 renamed sswhen to sscase oheimb parents: 5291 diff changeset	705	sscase1,sscase2,sscase3];

author	wenzelm
	Sat, 01 Apr 2000 20:11:50 +0200
changeset 8649	dc496bb0638f
parent 8161	bde1391fd0a5
child 9169	85a47aa21f74
permissions	-rw-r--r--