author | wenzelm |
Thu, 27 Mar 2008 19:22:24 +0100 | |
changeset 26451 | f8a615f3bb31 |
parent 26102 | 2ae572207783 |
child 26838 | 7f7c6a9e083a |
permissions | -rw-r--r-- |
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(* Title: HOLCF/ex/Stream_adm.thy |
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ID: $Id$ |
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Author: David von Oheimb, TU Muenchen |
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*) |
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header {* Admissibility for streams *} |
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theory Stream_adm |
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imports "../ex/Stream" Continuity |
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begin |
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definition |
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stream_monoP :: "(('a stream) set \<Rightarrow> ('a stream) set) \<Rightarrow> bool" where |
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"stream_monoP F = (\<exists>Q i. \<forall>P s. Fin i \<le> #s \<longrightarrow> |
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(s \<in> F P) = (stream_take i\<cdot>s \<in> Q \<and> iterate i\<cdot>rt\<cdot>s \<in> P))" |
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21404
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more robust syntax for definition/abbreviation/notation;
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parents:
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definition |
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stream_antiP :: "(('a stream) set \<Rightarrow> ('a stream) set) \<Rightarrow> bool" where |
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"stream_antiP F = (\<forall>P x. \<exists>Q i. |
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(#x < Fin i \<longrightarrow> (\<forall>y. x \<sqsubseteq> y \<longrightarrow> y \<in> F P \<longrightarrow> x \<in> F P)) \<and> |
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(Fin i <= #x \<longrightarrow> (\<forall>y. x \<sqsubseteq> y \<longrightarrow> |
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(y \<in> F P) = (stream_take i\<cdot>y \<in> Q \<and> iterate i\<cdot>rt\<cdot>y \<in> P))))" |
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definition |
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antitonP :: "'a set => bool" where |
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"antitonP P = (\<forall>x y. x \<sqsubseteq> y \<longrightarrow> y\<in>P \<longrightarrow> x\<in>P)" |
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(* ----------------------------------------------------------------------- *) |
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section "admissibility" |
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lemma flatstream_adm_lemma: |
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assumes 1: "Porder.chain Y" |
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assumes 2: "!i. P (Y i)" |
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assumes 3: "(!!Y. [| Porder.chain Y; !i. P (Y i); !k. ? j. Fin k < #((Y j)::'a::flat stream)|] |
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==> P(lub (range Y)))" |
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shows "P(lub (range Y))" |
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apply (rule increasing_chain_adm_lemma [OF 1 2]) |
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apply (erule 3, assumption) |
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apply (erule thin_rl) |
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apply (rule allI) |
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apply (case_tac "!j. stream_finite (Y j)") |
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apply ( rule chain_incr) |
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apply ( rule allI) |
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apply ( drule spec) |
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apply ( safe) |
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apply ( rule exI) |
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apply ( rule slen_strict_mono) |
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apply ( erule spec) |
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apply ( assumption) |
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apply ( assumption) |
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apply (drule not_ex [THEN iffD1]) |
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apply (subst slen_infinite) |
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apply (erule thin_rl) |
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apply (drule spec) |
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apply (unfold linorder_not_less) |
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apply (erule ile_iless_trans [THEN Infty_eq [THEN iffD1]]) |
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apply (simp) |
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done |
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(* should be without reference to stream length? *) |
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lemma flatstream_admI: "[|(!!Y. [| Porder.chain Y; !i. P (Y i); |
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!k. ? j. Fin k < #((Y j)::'a::flat stream)|] ==> P(lub (range Y)))|]==> adm P" |
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apply (unfold adm_def) |
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apply (intro strip) |
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apply (erule (1) flatstream_adm_lemma) |
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apply (fast) |
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done |
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(* context (theory "Nat_InFinity");*) |
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lemma ile_lemma: "Fin (i + j) <= x ==> Fin i <= x" |
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apply (rule ile_trans) |
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prefer 2 |
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apply (assumption) |
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apply (simp) |
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done |
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lemma stream_monoP2I: |
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"!!X. stream_monoP F ==> !i. ? l. !x y. |
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Fin l <= #x --> (x::'a::flat stream) << y --> x:down_iterate F i --> y:down_iterate F i" |
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apply (unfold stream_monoP_def) |
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apply (safe) |
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apply (rule_tac x="i*ia" in exI) |
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apply (induct_tac "ia") |
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apply ( simp) |
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apply (simp) |
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apply (intro strip) |
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apply (erule allE, erule all_dupE, drule mp, erule ile_lemma) |
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apply (drule_tac P="%x. x" in subst, assumption) |
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apply (erule allE, drule mp, rule ile_lemma) back |
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apply ( erule ile_trans) |
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apply ( erule slen_mono) |
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apply (erule ssubst) |
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apply (safe) |
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apply ( erule (2) ile_lemma [THEN slen_take_lemma3, THEN subst]) |
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apply (erule allE) |
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apply (drule mp) |
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apply ( erule slen_rt_mult) |
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apply (erule allE) |
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apply (drule mp) |
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apply (erule monofun_rt_mult) |
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apply (drule (1) mp) |
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apply (assumption) |
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done |
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lemma stream_monoP2_gfp_admI: "[| !i. ? l. !x y. |
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Fin l <= #x --> (x::'a::flat stream) << y --> x:down_iterate F i --> y:down_iterate F i; |
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down_cont F |] ==> adm (%x. x:gfp F)" |
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apply (erule INTER_down_iterate_is_gfp [THEN ssubst]) (* cont *) |
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apply (simp (no_asm)) |
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apply (rule adm_lemmas) |
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apply (rule flatstream_admI) |
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apply (erule allE) |
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apply (erule exE) |
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apply (erule allE, erule exE) |
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apply (erule allE, erule allE, drule mp) (* stream_monoP *) |
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apply ( drule ileI1) |
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apply ( drule ile_trans) |
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apply ( rule ile_iSuc) |
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apply ( drule iSuc_ile_mono [THEN iffD1]) |
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apply ( assumption) |
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apply (drule mp) |
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apply ( erule is_ub_thelub) |
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apply (fast) |
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done |
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lemmas fstream_gfp_admI = stream_monoP2I [THEN stream_monoP2_gfp_admI] |
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lemma stream_antiP2I: |
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"!!X. [|stream_antiP (F::(('a::flat stream)set => ('a stream set)))|] |
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==> !i x y. x << y --> y:down_iterate F i --> x:down_iterate F i" |
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apply (unfold stream_antiP_def) |
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apply (rule allI) |
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apply (induct_tac "i") |
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apply ( simp) |
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apply (simp) |
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apply (intro strip) |
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apply (erule allE, erule all_dupE, erule exE, erule exE) |
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apply (erule conjE) |
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apply (case_tac "#x < Fin i") |
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apply ( fast) |
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apply (unfold linorder_not_less) |
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apply (drule (1) mp) |
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apply (erule all_dupE, drule mp, rule refl_less) |
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apply (erule ssubst) |
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apply (erule allE, drule (1) mp) |
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apply (drule_tac P="%x. x" in subst, assumption) |
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apply (erule conjE, rule conjI) |
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apply ( erule slen_take_lemma3 [THEN ssubst], assumption) |
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apply ( assumption) |
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apply (erule allE, erule allE, drule mp, erule monofun_rt_mult) |
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apply (drule (1) mp) |
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apply (assumption) |
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done |
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lemma stream_antiP2_non_gfp_admI: |
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"!!X. [|!i x y. x << y --> y:down_iterate F i --> x:down_iterate F i; down_cont F |] |
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==> adm (%u. ~ u:gfp F)" |
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apply (unfold adm_def) |
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apply (simp add: INTER_down_iterate_is_gfp) |
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apply (fast dest!: is_ub_thelub) |
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done |
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lemmas fstream_non_gfp_admI = stream_antiP2I [THEN stream_antiP2_non_gfp_admI] |
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(**new approach for adm********************************************************) |
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section "antitonP" |
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lemma antitonPD: "[| antitonP P; y:P; x<<y |] ==> x:P" |
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apply (unfold antitonP_def) |
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apply auto |
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done |
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lemma antitonPI: "!x y. y:P --> x<<y --> x:P ==> antitonP P" |
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apply (unfold antitonP_def) |
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apply (fast) |
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done |
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lemma antitonP_adm_non_P: "antitonP P ==> adm (%u. u~:P)" |
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apply (unfold adm_def) |
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apply (auto dest: antitonPD elim: is_ub_thelub) |
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done |
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lemma def_gfp_adm_nonP: "P \<equiv> gfp F \<Longrightarrow> {y. \<exists>x::'a::pcpo. y \<sqsubseteq> x \<and> x \<in> P} \<subseteq> F {y. \<exists>x. y \<sqsubseteq> x \<and> x \<in> P} \<Longrightarrow> |
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adm (\<lambda>u. u\<notin>P)" |
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apply (simp) |
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apply (rule antitonP_adm_non_P) |
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apply (rule antitonPI) |
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apply (drule gfp_upperbound) |
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apply (fast) |
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done |
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lemma adm_set: |
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"{lub (range Y) |Y. Porder.chain Y & (\<forall>i. Y i \<in> P)} \<subseteq> P \<Longrightarrow> adm (\<lambda>x. x\<in>P)" |
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apply (unfold adm_def) |
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apply (fast) |
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done |
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lemma def_gfp_admI: "P \<equiv> gfp F \<Longrightarrow> {lub (range Y) |Y. Porder.chain Y \<and> (\<forall>i. Y i \<in> P)} \<subseteq> |
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F {lub (range Y) |Y. Porder.chain Y \<and> (\<forall>i. Y i \<in> P)} \<Longrightarrow> adm (\<lambda>x. x\<in>P)" |
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apply (simp) |
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apply (rule adm_set) |
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apply (erule gfp_upperbound) |
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done |
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end |