src/HOL/UNITY/Follows.thy
author wenzelm
Wed Dec 29 17:34:41 2010 +0100 (2010-12-29)
changeset 41413 64cd30d6b0b8
parent 35416 d8d7d1b785af
child 54859 64ff7f16d5b7
permissions -rw-r--r--
explicit file specifications -- avoid secondary load path;
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(*  Title:      HOL/UNITY/Follows.thy
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    Author:     Lawrence C Paulson, Cambridge University Computer Laboratory
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    Copyright   1998  University of Cambridge
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*)
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header{*The Follows Relation of Charpentier and Sivilotte*}
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theory Follows
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imports SubstAx ListOrder "~~/src/HOL/Library/Multiset"
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begin
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definition Follows :: "['a => 'b::{order}, 'a => 'b::{order}] => 'a program set" (infixl "Fols" 65) where
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   "f Fols g == Increasing g \<inter> Increasing f Int
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                Always {s. f s \<le> g s} Int
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                (\<Inter>k. {s. k \<le> g s} LeadsTo {s. k \<le> f s})"
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(*Does this hold for "invariant"?*)
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lemma mono_Always_o:
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     "mono h ==> Always {s. f s \<le> g s} \<subseteq> Always {s. h (f s) \<le> h (g s)}"
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apply (simp add: Always_eq_includes_reachable)
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apply (blast intro: monoD)
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done
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lemma mono_LeadsTo_o:
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     "mono (h::'a::order => 'b::order)  
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      ==> (\<Inter>j. {s. j \<le> g s} LeadsTo {s. j \<le> f s}) \<subseteq>  
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          (\<Inter>k. {s. k \<le> h (g s)} LeadsTo {s. k \<le> h (f s)})"
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apply auto
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apply (rule single_LeadsTo_I)
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apply (drule_tac x = "g s" in spec)
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apply (erule LeadsTo_weaken)
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apply (blast intro: monoD order_trans)+
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done
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lemma Follows_constant [iff]: "F \<in> (%s. c) Fols (%s. c)"
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by (simp add: Follows_def)
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lemma mono_Follows_o: "mono h ==> f Fols g \<subseteq> (h o f) Fols (h o g)"
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by (auto simp add: Follows_def mono_Increasing_o [THEN [2] rev_subsetD]
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                   mono_Always_o [THEN [2] rev_subsetD]
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                   mono_LeadsTo_o [THEN [2] rev_subsetD, THEN INT_D])
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lemma mono_Follows_apply:
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     "mono h ==> f Fols g \<subseteq> (%x. h (f x)) Fols (%x. h (g x))"
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apply (drule mono_Follows_o)
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apply (force simp add: o_def)
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done
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lemma Follows_trans: 
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     "[| F \<in> f Fols g;  F \<in> g Fols h |] ==> F \<in> f Fols h"
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apply (simp add: Follows_def)
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apply (simp add: Always_eq_includes_reachable)
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apply (blast intro: order_trans LeadsTo_Trans)
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done
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subsection{*Destruction rules*}
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lemma Follows_Increasing1: "F \<in> f Fols g ==> F \<in> Increasing f"
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by (simp add: Follows_def)
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lemma Follows_Increasing2: "F \<in> f Fols g ==> F \<in> Increasing g"
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by (simp add: Follows_def)
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lemma Follows_Bounded: "F \<in> f Fols g ==> F \<in> Always {s. f s \<le> g s}"
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by (simp add: Follows_def)
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lemma Follows_LeadsTo: 
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     "F \<in> f Fols g ==> F \<in> {s. k \<le> g s} LeadsTo {s. k \<le> f s}"
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by (simp add: Follows_def)
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lemma Follows_LeadsTo_pfixLe:
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     "F \<in> f Fols g ==> F \<in> {s. k pfixLe g s} LeadsTo {s. k pfixLe f s}"
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apply (rule single_LeadsTo_I, clarify)
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apply (drule_tac k="g s" in Follows_LeadsTo)
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apply (erule LeadsTo_weaken)
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 apply blast 
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apply (blast intro: pfixLe_trans prefix_imp_pfixLe)
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done
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lemma Follows_LeadsTo_pfixGe:
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     "F \<in> f Fols g ==> F \<in> {s. k pfixGe g s} LeadsTo {s. k pfixGe f s}"
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apply (rule single_LeadsTo_I, clarify)
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apply (drule_tac k="g s" in Follows_LeadsTo)
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apply (erule LeadsTo_weaken)
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 apply blast 
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apply (blast intro: pfixGe_trans prefix_imp_pfixGe)
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done
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lemma Always_Follows1: 
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     "[| F \<in> Always {s. f s = f' s}; F \<in> f Fols g |] ==> F \<in> f' Fols g"
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apply (simp add: Follows_def Increasing_def Stable_def, auto)
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apply (erule_tac [3] Always_LeadsTo_weaken)
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apply (erule_tac A = "{s. z \<le> f s}" and A' = "{s. z \<le> f s}" 
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       in Always_Constrains_weaken, auto)
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apply (drule Always_Int_I, assumption)
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apply (force intro: Always_weaken)
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done
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lemma Always_Follows2: 
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     "[| F \<in> Always {s. g s = g' s}; F \<in> f Fols g |] ==> F \<in> f Fols g'"
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apply (simp add: Follows_def Increasing_def Stable_def, auto)
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apply (erule_tac [3] Always_LeadsTo_weaken)
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apply (erule_tac A = "{s. z \<le> g s}" and A' = "{s. z \<le> g s}"
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       in Always_Constrains_weaken, auto)
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apply (drule Always_Int_I, assumption)
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apply (force intro: Always_weaken)
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done
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subsection{*Union properties (with the subset ordering)*}
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(*Can replace "Un" by any sup.  But existing max only works for linorders.*)
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lemma increasing_Un: 
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    "[| F \<in> increasing f;  F \<in> increasing g |]  
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     ==> F \<in> increasing (%s. (f s) \<union> (g s))"
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apply (simp add: increasing_def stable_def constrains_def, auto)
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apply (drule_tac x = "f xa" in spec)
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apply (drule_tac x = "g xa" in spec)
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apply (blast dest!: bspec)
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done
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lemma Increasing_Un: 
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    "[| F \<in> Increasing f;  F \<in> Increasing g |]  
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     ==> F \<in> Increasing (%s. (f s) \<union> (g s))"
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apply (auto simp add: Increasing_def Stable_def Constrains_def
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                      stable_def constrains_def)
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apply (drule_tac x = "f xa" in spec)
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apply (drule_tac x = "g xa" in spec)
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apply (blast dest!: bspec)
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done
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lemma Always_Un:
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     "[| F \<in> Always {s. f' s \<le> f s}; F \<in> Always {s. g' s \<le> g s} |]  
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      ==> F \<in> Always {s. f' s \<union> g' s \<le> f s \<union> g s}"
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by (simp add: Always_eq_includes_reachable, blast)
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(*Lemma to re-use the argument that one variable increases (progress)
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  while the other variable doesn't decrease (safety)*)
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lemma Follows_Un_lemma:
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     "[| F \<in> Increasing f; F \<in> Increasing g;  
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         F \<in> Increasing g'; F \<in> Always {s. f' s \<le> f s}; 
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         \<forall>k. F \<in> {s. k \<le> f s} LeadsTo {s. k \<le> f' s} |] 
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      ==> F \<in> {s. k \<le> f s \<union> g s} LeadsTo {s. k \<le> f' s \<union> g s}"
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apply (rule single_LeadsTo_I)
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apply (drule_tac x = "f s" in IncreasingD)
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apply (drule_tac x = "g s" in IncreasingD)
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apply (rule LeadsTo_weaken)
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apply (rule PSP_Stable)
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apply (erule_tac x = "f s" in spec)
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apply (erule Stable_Int, assumption, blast+)
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done
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lemma Follows_Un: 
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    "[| F \<in> f' Fols f;  F \<in> g' Fols g |]  
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     ==> F \<in> (%s. (f' s) \<union> (g' s)) Fols (%s. (f s) \<union> (g s))"
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apply (simp add: Follows_def Increasing_Un Always_Un del: Un_subset_iff le_sup_iff, auto)
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apply (rule LeadsTo_Trans)
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apply (blast intro: Follows_Un_lemma)
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(*Weakening is used to exchange Un's arguments*)
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apply (blast intro: Follows_Un_lemma [THEN LeadsTo_weaken])
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done
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subsection{*Multiset union properties (with the multiset ordering)*}
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lemma increasing_union: 
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    "[| F \<in> increasing f;  F \<in> increasing g |]  
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     ==> F \<in> increasing (%s. (f s) + (g s :: ('a::order) multiset))"
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apply (simp add: increasing_def stable_def constrains_def, auto)
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apply (drule_tac x = "f xa" in spec)
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apply (drule_tac x = "g xa" in spec)
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apply (drule bspec, assumption) 
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apply (blast intro: add_mono order_trans)
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done
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lemma Increasing_union: 
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    "[| F \<in> Increasing f;  F \<in> Increasing g |]  
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     ==> F \<in> Increasing (%s. (f s) + (g s :: ('a::order) multiset))"
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apply (auto simp add: Increasing_def Stable_def Constrains_def
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                      stable_def constrains_def)
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apply (drule_tac x = "f xa" in spec)
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apply (drule_tac x = "g xa" in spec)
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apply (drule bspec, assumption) 
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apply (blast intro: add_mono order_trans)
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done
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lemma Always_union:
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     "[| F \<in> Always {s. f' s \<le> f s}; F \<in> Always {s. g' s \<le> g s} |]  
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      ==> F \<in> Always {s. f' s + g' s \<le> f s + (g s :: ('a::order) multiset)}"
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apply (simp add: Always_eq_includes_reachable)
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apply (blast intro: add_mono)
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done
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(*Except the last line, IDENTICAL to the proof script for Follows_Un_lemma*)
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lemma Follows_union_lemma:
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     "[| F \<in> Increasing f; F \<in> Increasing g;  
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         F \<in> Increasing g'; F \<in> Always {s. f' s \<le> f s}; 
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         \<forall>k::('a::order) multiset.  
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           F \<in> {s. k \<le> f s} LeadsTo {s. k \<le> f' s} |] 
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      ==> F \<in> {s. k \<le> f s + g s} LeadsTo {s. k \<le> f' s + g s}"
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apply (rule single_LeadsTo_I)
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apply (drule_tac x = "f s" in IncreasingD)
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apply (drule_tac x = "g s" in IncreasingD)
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apply (rule LeadsTo_weaken)
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apply (rule PSP_Stable)
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apply (erule_tac x = "f s" in spec)
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apply (erule Stable_Int, assumption, blast)
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apply (blast intro: add_mono order_trans)
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done
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(*The !! is there to influence to effect of permutative rewriting at the end*)
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lemma Follows_union: 
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     "!!g g' ::'b => ('a::order) multiset.  
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        [| F \<in> f' Fols f;  F \<in> g' Fols g |]  
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        ==> F \<in> (%s. (f' s) + (g' s)) Fols (%s. (f s) + (g s))"
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apply (simp add: Follows_def)
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apply (simp add: Increasing_union Always_union, auto)
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apply (rule LeadsTo_Trans)
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apply (blast intro: Follows_union_lemma)
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(*now exchange union's arguments*)
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apply (simp add: union_commute)
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apply (blast intro: Follows_union_lemma)
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done
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lemma Follows_setsum:
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     "!!f ::['c,'b] => ('a::order) multiset.  
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        [| \<forall>i \<in> I. F \<in> f' i Fols f i;  finite I |]  
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        ==> F \<in> (%s. \<Sum>i \<in> I. f' i s) Fols (%s. \<Sum>i \<in> I. f i s)"
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apply (erule rev_mp)
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apply (erule finite_induct, simp) 
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apply (simp add: Follows_union)
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done
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(*Currently UNUSED, but possibly of interest*)
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lemma Increasing_imp_Stable_pfixGe:
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     "F \<in> Increasing func ==> F \<in> Stable {s. h pfixGe (func s)}"
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apply (simp add: Increasing_def Stable_def Constrains_def constrains_def)
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apply (blast intro: trans_Ge [THEN trans_genPrefix, THEN transD] 
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                    prefix_imp_pfixGe)
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done
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(*Currently UNUSED, but possibly of interest*)
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lemma LeadsTo_le_imp_pfixGe:
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     "\<forall>z. F \<in> {s. z \<le> f s} LeadsTo {s. z \<le> g s}  
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      ==> F \<in> {s. z pfixGe f s} LeadsTo {s. z pfixGe g s}"
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apply (rule single_LeadsTo_I)
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apply (drule_tac x = "f s" in spec)
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apply (erule LeadsTo_weaken)
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 prefer 2
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 apply (blast intro: trans_Ge [THEN trans_genPrefix, THEN transD] 
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                     prefix_imp_pfixGe, blast)
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done
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end