| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/Isabelle/Archive-of-Formal-Proofs/thys/AWN/ (Sammlung formaler Beweise Version 2026-5©) Datei vom 29.4.2026 mit Größe 3 kB |
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Quelle OPnet.thySprache: Isabelle |
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(* Title: OPnet.thy License: BSD 2-Clause. See LICENSE. Author: Timothy Bourke *) section "Lemmas for open partial networks" theory OPnet imports OAWN_SOS OInvariants begin text ‹ These lemmas mostly concern the preservation of node structure by @{term opnet_s lemma opnet_maintains_dom: assumes "((σ, ns), a, (σ', ns')) ∈ trans (opnet np p)" shows "net_ips ns = net_ips ns'" using assms proof (induction p arbitrary: σ ns a σ' ns') fix i R σ ns a σ' ns' assume "((σ, ns), a, (σ', ns')) ∈ trans (opnet np ⟨i; R⟩)" hence "((σ, ns), a, (σ', ns')) ∈ onode_sos (trans (np i))" .. thus "net_ips ns = net_ips ns'" by (simp add: net_ips_is_dom_netmap) (erule onode_sos.cases, simp_all) next fix p1 p2 σ ns a σ' ns' assume "∧σ ns a σ' ns'. ((σ, ns), a, (σ', ns')) ∈ trans (opnet np p1) ==> net_ips ns and "∧σ ns a σ' ns'. ((σ, ns), a, (σ', ns')) ∈ trans (opnet np p2) ==> net_ips ns = n and "((σ, ns), a, (σ', ns')) ∈ trans (opnet np (p1 ∥ p2))" thus "net_ips ns = net_ips ns'" by simp (erule opnet_sos.cases, simp_all) qed lemma opnet_net_ips_net_tree_ips: assumes "(σ, ns) ∈ oreachable (opnet np p) S U" shows "net_ips ns = net_tree_ips p" using assms proof (induction rule: oreachable_pair_induct) fix σ s assume "(σ, s) ∈ init (opnet np p)" thus "net_ips s = net_tree_ips p" proof (induction p arbitrary: σ s) fix p1 p2 σ s assume IH1: "(∧σ s. (σ, s) ∈ init (opnet np p1) ==> net_ips s = net_tree_ips p1)" and IH2: "(∧σ s. (σ, s) ∈ init (opnet np p2) ==> net_ips s = net_tree_ips p2)" and "(σ, s) ∈ init (opnet np (p1 ∥ p2))" thus "net_ips s = net_tree_ips (p1 ∥ p2)" by (clarsimp simp add: net_ips_is_dom_netmap) (metis Un_commute) qed (clarsimp simp add: onode_comps) next fix σ s σ' s' a assume "(σ, s) ∈ oreachable (opnet np p) S U" and "net_ips s = net_tree_ips p" and "((σ, s), a, (σ', s')) ∈ trans (opnet np p)" and "S σ σ' a" thus "net_ips s' = net_tree_ips p" by (simp add: net_ips_is_dom_netmap) (metis net_ips_is_dom_netmap opnet_maintains_dom) qed simp lemma opnet_net_ips_net_tree_ips_init: assumes "(σ, ns) ∈ init (opnet np p)" shows "net_ips ns = net_tree_ips p" using assms(1) by (rule oreachable_init [THEN opnet_net_ips_net_tree_ips]) lemma opartial_net_preserves_subnets: assumes "((σ, SubnetS s t), a, (σ', st')) ∈ opnet_sos (trans (opnet np p1)) (trans shows "∃s' t'. st' = SubnetS s' t'" using assms by cases simp_all lemma net_par_oreachable_is_subnet: assumes "(σ, st) ∈ oreachable (opnet np (p1 ∥ p2)) S U" shows "∃s t. st = SubnetS s t" proof - define p where "p = (σ, st)" with assms have "p ∈ oreachable (opnet np (p1 ∥ p2)) S U" by simp hence "∃σ s t. p = (σ, SubnetS s t)" by induct (auto dest!: opartial_net_preserves_subnets) with p_def show ?thesis by simp qed end
¤ Dauer der Verarbeitung: 0.9 Sekunden (vorverarbeitet am 2026-06-10) ¤*© Formatika GbR, Deutschland |
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2026-06-09