(* Title: HOL/Hoare/Heap.thy
ID: $Id: SepLogHeap.thy,v 1.3 2005/08/01 17:20:25 wenzelm Exp $
Author: Tobias Nipkow
Copyright 2002 TUM
Heap abstractions (at the moment only Path and List)
for Separation Logic.
*)
theory SepLogHeap imports Main begin
types heap = "(nat => nat option)"
text{* @{text "Some"} means allocated, @{text "None"} means
free. Address @{text "0"} serves as the null reference. *}
subsection "Paths in the heap"
consts
Path :: "heap => nat => nat list => nat => bool"
primrec
"Path h x [] y = (x = y)"
"Path h x (a#as) y = (x≠0 ∧ a=x ∧ (∃b. h x = Some b ∧ Path h b as y))"
lemma [iff]: "Path h 0 xs y = (xs = [] ∧ y = 0)"
by (cases xs) simp_all
lemma [simp]: "x≠0 ==> Path h x as z =
(as = [] ∧ z = x ∨ (∃y bs. as = x#bs ∧ h x = Some y & Path h y bs z))"
by (cases as) auto
lemma [simp]: "!!x. Path f x (as@bs) z = (∃y. Path f x as y ∧ Path f y bs z)"
by (induct as) auto
lemma Path_upd[simp]:
"!!x. u ∉ set as ==> Path (f(u := v)) x as y = Path f x as y"
by (induct as) simp_all
subsection "Lists on the heap"
constdefs
List :: "heap => nat => nat list => bool"
"List h x as == Path h x as 0"
lemma [simp]: "List h x [] = (x = 0)"
by (simp add: List_def)
lemma [simp]:
"List h x (a#as) = (x≠0 ∧ a=x ∧ (∃y. h x = Some y ∧ List h y as))"
by (simp add: List_def)
lemma [simp]: "List h 0 as = (as = [])"
by (cases as) simp_all
lemma List_non_null: "a≠0 ==>
List h a as = (∃b bs. as = a#bs ∧ h a = Some b ∧ List h b bs)"
by (cases as) simp_all
theorem notin_List_update[simp]:
"!!x. a ∉ set as ==> List (h(a := y)) x as = List h x as"
by (induct as) simp_all
lemma List_unique: "!!x bs. List h x as ==> List h x bs ==> as = bs"
by (induct as) (auto simp add:List_non_null)
lemma List_unique1: "List h p as ==> ∃!as. List h p as"
by (blast intro: List_unique)
lemma List_app: "!!x. List h x (as@bs) = (∃y. Path h x as y ∧ List h y bs)"
by (induct as) auto
lemma List_hd_not_in_tl[simp]: "List h b as ==> h a = Some b ==> a ∉ set as"
apply (clarsimp simp add:in_set_conv_decomp)
apply(frule List_app[THEN iffD1])
apply(fastsimp dest: List_unique)
done
lemma List_distinct[simp]: "!!x. List h x as ==> distinct as"
by (induct as) (auto dest:List_hd_not_in_tl)
lemma list_in_heap: "!!p. List h p ps ==> set ps ⊆ dom h"
by (induct ps) auto
lemma list_ortho_sum1[simp]:
"!!p. [| List h1 p ps; dom h1 ∩ dom h2 = {}|] ==> List (h1++h2) p ps"
by (induct ps) (auto simp add:map_add_def split:option.split)
lemma list_ortho_sum2[simp]:
"!!p. [| List h2 p ps; dom h1 ∩ dom h2 = {}|] ==> List (h1++h2) p ps"
by (induct ps) (auto simp add:map_add_def split:option.split)
end
lemma
Path h 0 xs y = (xs = [] ∧ y = 0)
lemma
x ≠ 0 ==> Path h x as z = (as = [] ∧ z = x ∨ (∃y bs. as = x # bs ∧ h x = Some y ∧ Path h y bs z))
lemma
Path f x (as @ bs) z = (∃y. Path f x as y ∧ Path f y bs z)
lemma Path_upd:
u ∉ set as ==> Path (f(u := v)) x as y = Path f x as y
lemma
List h x [] = (x = 0)
lemma
List h x (a # as) = (x ≠ 0 ∧ a = x ∧ (∃y. h x = Some y ∧ List h y as))
lemma
List h 0 as = (as = [])
lemma List_non_null:
a ≠ 0 ==> List h a as = (∃b bs. as = a # bs ∧ h a = Some b ∧ List h b bs)
theorem notin_List_update:
a ∉ set as ==> List (h(a := y)) x as = List h x as
lemma List_unique:
[| List h x as; List h x bs |] ==> as = bs
lemma List_unique1:
List h p as ==> ∃!as. List h p as
lemma List_app:
List h x (as @ bs) = (∃y. Path h x as y ∧ List h y bs)
lemma List_hd_not_in_tl:
[| List h b as; h a = Some b |] ==> a ∉ set as
lemma List_distinct:
List h x as ==> distinct as
lemma list_in_heap:
List h p ps ==> set ps ⊆ dom h
lemma list_ortho_sum1:
[| List h1.0 p ps; dom h1.0 ∩ dom h2.0 = {} |] ==> List (h1.0 ++ h2.0) p ps
lemma list_ortho_sum2:
[| List h2.0 p ps; dom h1.0 ∩ dom h2.0 = {} |] ==> List (h1.0 ++ h2.0) p ps