isabelle: src/HOLCF/Bifinite.thy@5fe4b543512e (annotated)

25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	1	(* Title: HOLCF/Bifinite.thy
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	2	ID: $Id$
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	3	Author: Brian Huffman
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	4	*)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	5
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	6	header {* Bifinite domains and approximation *}
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	7
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	8	theory Bifinite
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	9	imports Cfun
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	10	begin
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	11
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	12	subsection {* Bifinite domains *}
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	13
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	14	axclass approx < cpo
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	15
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	16	consts approx :: "nat \<Rightarrow> 'a::approx \<rightarrow> 'a"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	17
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	18	axclass bifinite_cpo < approx
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	19	chain_approx_app: "chain (\<lambda>i. approx i\<cdot>x)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	20	lub_approx_app [simp]: "(\<Squnion>i. approx i\<cdot>x) = x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	21	approx_idem: "approx i\<cdot>(approx i\<cdot>x) = approx i\<cdot>x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	22	finite_fixes_approx: "finite {x. approx i\<cdot>x = x}"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	23
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	24	axclass bifinite < bifinite_cpo, pcpo
6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	25
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	26	lemma finite_range_imp_finite_fixes:
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	27	"finite {x. \<exists>y. x = f y} \<Longrightarrow> finite {x. f x = x}"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	28	apply (subgoal_tac "{x. f x = x} \<subseteq> {x. \<exists>y. x = f y}")
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	29	apply (erule (1) finite_subset)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	30	apply (clarify, erule subst, rule exI, rule refl)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	31	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	32
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	33	lemma chain_approx [simp]:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	34	"chain (approx :: nat \<Rightarrow> 'a::bifinite_cpo \<rightarrow> 'a)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	35	apply (rule chainI)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	36	apply (rule less_cfun_ext)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	37	apply (rule chainE)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	38	apply (rule chain_approx_app)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	39	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	40
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	41	lemma lub_approx [simp]: "(\<Squnion>i. approx i) = (\<Lambda>(x::'a::bifinite_cpo). x)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	42	by (rule ext_cfun, simp add: contlub_cfun_fun)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	43
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	44	lemma approx_less: "approx i\<cdot>x \<sqsubseteq> (x::'a::bifinite_cpo)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	45	apply (subgoal_tac "approx i\<cdot>x \<sqsubseteq> (\<Squnion>i. approx i\<cdot>x)", simp)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	46	apply (rule is_ub_thelub, simp)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	47	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	48
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	49	lemma approx_strict [simp]: "approx i\<cdot>(\<bottom>::'a::bifinite) = \<bottom>"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	50	by (rule UU_I, rule approx_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	51
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	52	lemma approx_approx1:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	53	"i \<le> j \<Longrightarrow> approx i\<cdot>(approx j\<cdot>x) = approx i\<cdot>(x::'a::bifinite_cpo)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	54	apply (rule antisym_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	55	apply (rule monofun_cfun_arg [OF approx_less])
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	56	apply (rule sq_ord_eq_less_trans [OF approx_idem [symmetric]])
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	57	apply (rule monofun_cfun_arg)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	58	apply (rule monofun_cfun_fun)
25922 cb04d05e95fb rename lemma chain_mono3 -> chain_mono, chain_mono -> chain_mono_less huffman parents: 25909 diff changeset	59	apply (erule chain_mono [OF chain_approx])
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	60	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	61
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	62	lemma approx_approx2:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	63	"j \<le> i \<Longrightarrow> approx i\<cdot>(approx j\<cdot>x) = approx j\<cdot>(x::'a::bifinite_cpo)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	64	apply (rule antisym_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	65	apply (rule approx_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	66	apply (rule sq_ord_eq_less_trans [OF approx_idem [symmetric]])
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	67	apply (rule monofun_cfun_fun)
25922 cb04d05e95fb rename lemma chain_mono3 -> chain_mono, chain_mono -> chain_mono_less huffman parents: 25909 diff changeset	68	apply (erule chain_mono [OF chain_approx])
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	69	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	70
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	71	lemma approx_approx [simp]:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	72	"approx i\<cdot>(approx j\<cdot>x) = approx (min i j)\<cdot>(x::'a::bifinite_cpo)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	73	apply (rule_tac x=i and y=j in linorder_le_cases)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	74	apply (simp add: approx_approx1 min_def)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	75	apply (simp add: approx_approx2 min_def)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	76	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	77
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	78	lemma idem_fixes_eq_range:
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	79	"\<forall>x. f (f x) = f x \<Longrightarrow> {x. f x = x} = {y. \<exists>x. y = f x}"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	80	by (auto simp add: eq_sym_conv)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	81
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	82	lemma finite_approx: "finite {y::'a::bifinite_cpo. \<exists>x. y = approx n\<cdot>x}"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	83	using finite_fixes_approx by (simp add: idem_fixes_eq_range)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	84
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	85	lemma finite_range_approx:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	86	"finite (range (\<lambda>x::'a::bifinite_cpo. approx n\<cdot>x))"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	87	by (simp add: image_def finite_approx)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	88
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	89	lemma compact_approx [simp]:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	90	fixes x :: "'a::bifinite_cpo"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	91	shows "compact (approx n\<cdot>x)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	92	proof (rule compactI2)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	93	fix Y::"nat \<Rightarrow> 'a"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	94	assume Y: "chain Y"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	95	have "finite_chain (\<lambda>i. approx n\<cdot>(Y i))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	96	proof (rule finite_range_imp_finch)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	97	show "chain (\<lambda>i. approx n\<cdot>(Y i))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	98	using Y by simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	99	have "range (\<lambda>i. approx n\<cdot>(Y i)) \<subseteq> {x. approx n\<cdot>x = x}"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	100	by clarsimp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	101	thus "finite (range (\<lambda>i. approx n\<cdot>(Y i)))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	102	using finite_fixes_approx by (rule finite_subset)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	103	qed
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	104	hence "\<exists>j. (\<Squnion>i. approx n\<cdot>(Y i)) = approx n\<cdot>(Y j)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	105	by (simp add: finite_chain_def maxinch_is_thelub Y)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	106	then obtain j where j: "(\<Squnion>i. approx n\<cdot>(Y i)) = approx n\<cdot>(Y j)" ..
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	107
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	108	assume "approx n\<cdot>x \<sqsubseteq> (\<Squnion>i. Y i)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	109	hence "approx n\<cdot>(approx n\<cdot>x) \<sqsubseteq> approx n\<cdot>(\<Squnion>i. Y i)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	110	by (rule monofun_cfun_arg)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	111	hence "approx n\<cdot>x \<sqsubseteq> (\<Squnion>i. approx n\<cdot>(Y i))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	112	by (simp add: contlub_cfun_arg Y)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	113	hence "approx n\<cdot>x \<sqsubseteq> approx n\<cdot>(Y j)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	114	using j by simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	115	hence "approx n\<cdot>x \<sqsubseteq> Y j"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	116	using approx_less by (rule trans_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	117	thus "\<exists>j. approx n\<cdot>x \<sqsubseteq> Y j" ..
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	118	qed
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	119
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	120	lemma bifinite_compact_eq_approx:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	121	fixes x :: "'a::bifinite_cpo"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	122	assumes x: "compact x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	123	shows "\<exists>i. approx i\<cdot>x = x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	124	proof -
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	125	have chain: "chain (\<lambda>i. approx i\<cdot>x)" by simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	126	have less: "x \<sqsubseteq> (\<Squnion>i. approx i\<cdot>x)" by simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	127	obtain i where i: "x \<sqsubseteq> approx i\<cdot>x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	128	using compactD2 [OF x chain less] ..
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	129	with approx_less have "approx i\<cdot>x = x"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	130	by (rule antisym_less)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	131	thus "\<exists>i. approx i\<cdot>x = x" ..
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	132	qed
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	133
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	134	lemma bifinite_compact_iff:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	135	"compact (x::'a::bifinite_cpo) = (\<exists>n. approx n\<cdot>x = x)"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	136	apply (rule iffI)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	137	apply (erule bifinite_compact_eq_approx)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	138	apply (erule exE)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	139	apply (erule subst)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	140	apply (rule compact_approx)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	141	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	142
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	143	lemma approx_induct:
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	144	assumes adm: "adm P" and P: "\<And>n x. P (approx n\<cdot>x)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	145	shows "P (x::'a::bifinite)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	146	proof -
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	147	have "P (\<Squnion>n. approx n\<cdot>x)"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	148	by (rule admD [OF adm], simp, simp add: P)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	149	thus "P x" by simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	150	qed
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	151
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	152	lemma bifinite_less_ext:
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	153	fixes x y :: "'a::bifinite_cpo"
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	154	shows "(\<And>i. approx i\<cdot>x \<sqsubseteq> approx i\<cdot>y) \<Longrightarrow> x \<sqsubseteq> y"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	155	apply (subgoal_tac "(\<Squnion>i. approx i\<cdot>x) \<sqsubseteq> (\<Squnion>i. approx i\<cdot>y)", simp)
25923 5fe4b543512e convert lemma lub_mono to rule_format huffman parents: 25922 diff changeset	156	apply (rule lub_mono, simp, simp, simp)
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	157	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	158
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	159	subsection {* Instance for continuous function space *}
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	160
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	161	lemma finite_range_lemma:
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	162	fixes h :: "'a::cpo \<rightarrow> 'b::cpo"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	163	fixes k :: "'c::cpo \<rightarrow> 'd::cpo"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	164	shows "\<lbrakk>finite {y. \<exists>x. y = h\<cdot>x}; finite {y. \<exists>x. y = k\<cdot>x}\<rbrakk>
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	165	\<Longrightarrow> finite {g. \<exists>f. g = (\<Lambda> x. k\<cdot>(f\<cdot>(h\<cdot>x)))}"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	166	apply (rule_tac f="\<lambda>g. {(h\<cdot>x, y) \|x y. y = g\<cdot>x}" in finite_imageD)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	167	apply (rule_tac B="Pow ({y. \<exists>x. y = h\<cdot>x} \<times> {y. \<exists>x. y = k\<cdot>x})"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	168	in finite_subset)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	169	apply (rule image_subsetI)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	170	apply (clarsimp, fast)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	171	apply simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	172	apply (rule inj_onI)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	173	apply (clarsimp simp add: expand_set_eq)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	174	apply (rule ext_cfun, simp)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	175	apply (drule_tac x="h\<cdot>x" in spec)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	176	apply (drule_tac x="k\<cdot>(f\<cdot>(h\<cdot>x))" in spec)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	177	apply (drule iffD1, fast)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	178	apply clarsimp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	179	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	180
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	181	instance "->" :: (bifinite_cpo, bifinite_cpo) approx ..
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	182
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	183	defs (overloaded)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	184	approx_cfun_def:
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	185	"approx \<equiv> \<lambda>n. \<Lambda> f x. approx n\<cdot>(f\<cdot>(approx n\<cdot>x))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	186
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	187	instance "->" :: (bifinite_cpo, bifinite_cpo) bifinite_cpo
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	188	apply (intro_classes, unfold approx_cfun_def)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	189	apply simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	190	apply (simp add: lub_distribs eta_cfun)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	191	apply simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	192	apply simp
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	193	apply (rule finite_range_imp_finite_fixes)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	194	apply (intro finite_range_lemma finite_approx)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	195	done
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	196
25909 6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	197	instance "->" :: (bifinite_cpo, bifinite) bifinite ..
6b96b9392873 add class bifinite_cpo for possibly-unpointed bifinite domains huffman parents: 25903 diff changeset	198
25903 5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	199	lemma approx_cfun: "approx n\<cdot>f\<cdot>x = approx n\<cdot>(f\<cdot>(approx n\<cdot>x))"
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	200	by (simp add: approx_cfun_def)
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	201
5e59af604d4f new theory of bifinite domains huffman parents: diff changeset	202	end

author	huffman
	Thu, 17 Jan 2008 21:56:33 +0100
changeset 25923	5fe4b543512e
parent 25922	cb04d05e95fb
child 26407	562a1d615336
permissions	-rw-r--r--