(* Title: ZF/Induct/Multiset.thy
Author: Sidi O Ehmety, Cambridge University Computer Laboratory
A definitional theory of multisets,
including a wellfoundedness proof for the multiset order.
The theory features ordinal multisets and the usual ordering.
*)
theory Multiset
imports FoldSet Acc
begin
abbreviation (input)
🍋 ‹Short cut for multiset space›
Mult ::
"i==>i" where
"Mult(A) ≡ A -||> nat-{0}"
definition
(* This is the original "restrict" from ZF.thy.
Restricts the function f to the domain A
FIXME: adapt Multiset to the new "restrict". *)
funrestrict ::
"[i,i] ==> i" where
"funrestrict(f,A) ≡ λx ∈ A. f`x"
definition
(* M is a multiset *)
multiset ::
"i ==> o" where
"multiset(M) ≡ ∃A. M ∈ A -> nat-{0} ∧ Finite(A)"
definition
mset_of ::
"i==>i" where
"mset_of(M) ≡ domain(M)"
definition
munion ::
"[i, i] ==> i" (
infixl ‹+#› 65)
where
"M +# N ≡ λx ∈ mset_of(M) ∪ mset_of(N).
if x ∈ mset_of(M) ∩ mset_of(N) then (M`x) #+ (N`x)
else (if x ∈ mset_of(M) then M`x else N`x)"
definition
(*convert a function to a multiset by eliminating 0*)
normalize ::
"i ==> i" where
"normalize(f) ≡
if (∃A. f ∈ A -> nat ∧ Finite(A)) then
funrestrict(f, {x ∈ mset_of(f). 0 < f`x})
else 0"
definition
mdiff ::
"[i, i] ==> i" (
infixl ‹-#› 65)
where
"M -# N ≡ normalize(λx ∈ mset_of(M).
if x ∈ mset_of(N) then M`x #- N`x else M`x)"
definition
(* set of elements of a multiset *)
msingle ::
"i ==> i" (
‹(‹open_block notation=‹mixfix multiset›\›) where
"{#a#} ≡ {⟨a, 1⟩}"
definition
MCollect :: "[i, i==>o] ==> i" (*comprehension*) where
"MCollect(M, P) ≡ funrestrict(M, {x ∈ mset_of(M). P(x)})"
definition
(* Counts the number of occurrences of an element in a multiset *)
mcount :: "[i, i] ==> i" where
"mcount(M, a) ≡ if a ∈ mset_of(M) then M`a else 0"
definition
msize :: "i ==> i" where
"msize(M) ≡ setsum(λa. $# mcount(M,a), mset_of(M))"
abbreviation
melem :: "[i,i] ==> o" (‹(‹notation=‹infix :#›\› [50, 51] 50) where
"a :# M ≡ a ∈ mset_of(M)"
syntax
"_MColl" :: "[pttrn, i, o] ==> i" (‹(‹indent=1 notation=‹mixfix multiset comprehension›\∈ _./ _#})›)
syntax_consts
"_MColl" ⇌ MCollect
translations
"{#x ∈ M. P#}" == "CONST MCollect(M, λx. P)"
(* multiset orderings *)
definition
(* multirel1 has to be a set (not a predicate) so that we can form
its transitive closure and reason about wf(.) and acc(.) *)
multirel1 :: "[i,i]==>i" where
"multirel1(A, r) ≡
{⟨M, N⟩ ∈ Mult(A)*Mult(A).
∃a ∈ A. ∃M0 ∈ Mult(A). ∃K ∈ Mult(A).
N=M0 +# {#a#} ∧ M=M0 +# K ∧ (∀b ∈ mset_of(K). ⟨b,a⟩ ∈ r)}"
definition
multirel :: "[i, i] ==> i" where
"multirel(A, r) ≡ multirel1(A, r)^+"
(* ordinal multiset orderings *)
definition
omultiset :: "i ==> o" where
"omultiset(M) ≡ ∃i. Ord(i) ∧ M ∈ Mult(field(Memrel(i)))"
definition
mless :: "[i, i] ==> o" (infixl ‹🚫› 50) where
"M <# N ≡ ∃i. Ord(i) ∧ ⟨M, N⟩ ∈ multirel(field(Memrel(i)), Memrel(i))"
definition
mle :: "[i, i] ==> o" (infixl ‹🚫› 50) where
"M <#= N ≡ (omultiset(M) ∧ M = N) | M <# N"
subsection‹Properties of the original "restrict" from ZF.thy›
lemma funrestrict_subset: "[f ∈ Pi(C,B); A⊆C] ==> funrestrict(f,A) ⊆ f"
by (auto simp add: funrestrict_def lam_def intro: apply_Pair)
lemma funrestrict_type:
"[∧x. x ∈ A ==> f`x ∈ B(x)] ==> funrestrict(f,A) ∈ Pi(A,B)"
by (simp add: funrestrict_def lam_type)
lemma funrestrict_type2: "[f ∈ Pi(C,B); A⊆C] ==> funrestrict(f,A) ∈ Pi(A,B)"
by (blast intro: apply_type funrestrict_type)
lemma funrestrict [simp]: "a ∈ A ==> funrestrict(f,A) ` a = f`a"
by (simp add: funrestrict_def)
lemma funrestrict_empty [simp]: "funrestrict(f,0) = 0"
by (simp add: funrestrict_def)
lemma domain_funrestrict [simp]: "domain(funrestrict(f,C)) = C"
by (auto simp add: funrestrict_def lam_def)
lemma fun_cons_funrestrict_eq:
"f ∈ cons(a, b) -> B ==> f = cons(, funrestrict(f, b))"
apply (rule equalityI)
prefer 2 apply (blast intro: apply_Pair funrestrict_subset [THEN subsetD])
apply (auto dest!: Pi_memberD simp add: funrestrict_def lam_def)
done
declare domain_of_fun [simp]
declare domainE [rule del]
text‹A useful simplification rule›
lemma multiset_fun_iff:
"(f ∈ A -> nat-{0}) ⟷ f ∈ A->nat∧(∀a ∈ A. f`a ∈ nat ∧ 0 < f`a)"
apply safe
apply (rule_tac [4] B1 = "range (f) " in Pi_mono [THEN subsetD])
apply (auto intro!: Ord_0_lt
dest: apply_type Diff_subset [THEN Pi_mono, THEN subsetD]
simp add: range_of_fun apply_iff)
done
(** The multiset space **)
lemma multiset_into_Mult: "[multiset(M); mset_of(M)⊆A] ==> M ∈ Mult(A)"
apply (simp add: multiset_def)
apply (auto simp add: multiset_fun_iff mset_of_def)
apply (rule_tac B1 = "nat-{0}" in FiniteFun_mono [THEN subsetD], simp_all)
apply (rule Finite_into_Fin [THEN [2] Fin_mono [THEN subsetD], THEN fun_FiniteFunI])
apply (simp_all (no_asm_simp) add: multiset_fun_iff)
done
lemma Mult_into_multiset: "M ∈ Mult(A) ==> multiset(M) ∧ mset_of(M)⊆A"
apply (simp add: multiset_def mset_of_def)
apply (frule FiniteFun_is_fun)
apply (drule FiniteFun_domain_Fin)
apply (frule FinD, clarify)
apply (rule_tac x = "domain (M) " in exI)
apply (blast intro: Fin_into_Finite)
done
lemma Mult_iff_multiset: "M ∈ Mult(A) ⟷ multiset(M) ∧ mset_of(M)⊆A"
by (blast dest: Mult_into_multiset intro: multiset_into_Mult)
lemma multiset_iff_Mult_mset_of: "multiset(M) ⟷ M ∈ Mult(mset_of(M))"
by (auto simp add: Mult_iff_multiset)
text‹The 🍋‹multiset› operator›
(* the empty multiset is 0 *)
lemma multiset_0 [simp]: "multiset(0)"
by (auto intro: FiniteFun.intros simp add: multiset_iff_Mult_mset_of)
text‹The 🍋‹mset_of› operator›
lemma multiset_set_of_Finite [simp]: "multiset(M) ==> Finite(mset_of(M))"
by (simp add: multiset_def mset_of_def, auto)
lemma mset_of_0 [iff]: "mset_of(0) = 0"
by (simp add: mset_of_def)
lemma mset_is_0_iff: "multiset(M) ==> mset_of(M)=0 ⟷ M=0"
by (auto simp add: multiset_def mset_of_def)
lemma mset_of_single [iff]: "mset_of({#a#}) = {a}"
by (simp add: msingle_def mset_of_def)
lemma mset_of_union [iff]: "mset_of(M +# N) = mset_of(M) ∪ mset_of(N)"
by (simp add: mset_of_def munion_def)
lemma mset_of_diff [simp]: "mset_of(M)⊆A ==> mset_of(M -# N) ⊆ A"
by (auto simp add: mdiff_def multiset_def normalize_def mset_of_def)
(* msingle *)
lemma msingle_not_0 [iff]: "{#a#} ≠ 0 ∧ 0 ≠ {#a#}"
by (simp add: msingle_def)
lemma msingle_eq_iff [iff]: "({#a#} = {#b#}) ⟷ (a = b)"
by (simp add: msingle_def)
lemma msingle_multiset [iff,TC]: "multiset({#a#})"
apply (simp add: multiset_def msingle_def)
apply (rule_tac x = "{a}" in exI)
apply (auto intro: Finite_cons Finite_0 fun_extend3)
done
(** normalize **)
lemmas Collect_Finite = Collect_subset [THEN subset_Finite]
lemma normalize_idem [simp]: "normalize(normalize(f)) = normalize(f)"
apply (simp add: normalize_def funrestrict_def mset_of_def)
apply (case_tac "∃A. f ∈ A -> nat ∧ Finite (A) ")
apply clarify
apply (drule_tac x = "{x ∈ domain (f) . 0 < f ` x}" in spec)
apply auto
apply (auto intro!: lam_type simp add: Collect_Finite)
done
lemma normalize_multiset [simp]: "multiset(M) ==> normalize(M) = M"
by (auto simp add: multiset_def normalize_def mset_of_def funrestrict_def multiset_fun_iff)
lemma multiset_normalize [simp]: "multiset(normalize(f))"
apply (simp add: normalize_def)
apply (simp add: normalize_def mset_of_def multiset_def, auto)
apply (rule_tac x = "{x ∈ A . 0 in exI)
apply (auto intro: Collect_subset [THEN subset_Finite] funrestrict_type)
done
(** Typechecking rules for union and difference of multisets **)
(* union *)
lemma munion_multiset [simp]: "[multiset(M); multiset(N)] ==> multiset(M +# N)"
apply (unfold multiset_def munion_def mset_of_def, auto)
apply (rule_tac x = "A ∪ Aa" in exI)
apply (auto intro!: lam_type intro: Finite_Un simp add: multiset_fun_iff zero_less_add)
done
(* difference *)
lemma mdiff_multiset [simp]: "multiset(M -# N)"
by (simp add: mdiff_def)
(** Algebraic properties of multisets **)
(* Union *)
lemma munion_0 [simp]: "multiset(M) ==> M +# 0 = M ∧ 0 +# M = M"
apply (simp add: multiset_def)
apply (auto simp add: munion_def mset_of_def)
done
lemma munion_commute: "M +# N = N +# M"
by (auto intro!: lam_cong simp add: munion_def)
lemma munion_assoc: "(M +# N) +# K = M +# (N +# K)"
unfolding munion_def mset_of_def
apply (rule lam_cong, auto)
done
lemma munion_lcommute: "M +# (N +# K) = N +# (M +# K)"
unfolding munion_def mset_of_def
apply (rule lam_cong, auto)
done
lemmas munion_ac = munion_commute munion_assoc munion_lcommute
(* Difference *)
lemma mdiff_self_eq_0 [simp]: "M -# M = 0"
by (simp add: mdiff_def normalize_def mset_of_def)
lemma mdiff_0 [simp]: "0 -# M = 0"
by (simp add: mdiff_def normalize_def)
lemma mdiff_0_right [simp]: "multiset(M) ==> M -# 0 = M"
by (auto simp add: multiset_def mdiff_def normalize_def multiset_fun_iff mset_of_def funrestrict_def)
lemma mdiff_union_inverse2 [simp]: "multiset(M) ==> M +# {#a#} -# {#a#} = M"
unfolding multiset_def munion_def mdiff_def msingle_def normalize_def mset_of_def
apply (auto cong add: if_cong simp add: ltD multiset_fun_iff funrestrict_def subset_Un_iff2 [THEN iffD1])
prefer 2 apply (force intro!: lam_type)
apply (subgoal_tac [2] "{x ∈ A ∪ {a} . x ≠ a ∧ x ∈ A} = A")
apply (rule fun_extension, auto)
apply (drule_tac x = "A ∪ {a}" in spec)
apply (simp add: Finite_Un)
apply (force intro!: lam_type)
done
(** Count of elements **)
lemma mcount_type [simp,TC]: "multiset(M) ==> mcount(M, a) ∈ nat"
by (auto simp add: multiset_def mcount_def mset_of_def multiset_fun_iff)
lemma mcount_0 [simp]: "mcount(0, a) = 0"
by (simp add: mcount_def)
lemma mcount_single [simp]: "mcount({#b#}, a) = (if a=b then 1 else 0)"
by (simp add: mcount_def mset_of_def msingle_def)
lemma mcount_union [simp]: "[multiset(M); multiset(N)]
==> mcount(M +# N, a) = mcount(M, a) #+ mcount (N, a)"
apply (auto simp add: multiset_def multiset_fun_iff mcount_def munion_def mset_of_def)
done
lemma mcount_diff [simp]:
"multiset(M) ==> mcount(M -# N, a) = mcount(M, a) #- mcount(N, a)"
apply (simp add: multiset_def)
apply (auto dest!: not_lt_imp_le
simp add: mdiff_def multiset_fun_iff mcount_def normalize_def mset_of_def)
apply (force intro!: lam_type)
apply (force intro!: lam_type)
done
lemma mcount_elem: "[multiset(M); a ∈ mset_of(M)] ==> 0 < mcount(M, a)"
apply (simp add: multiset_def, clarify)
apply (simp add: mcount_def mset_of_def)
apply (simp add: multiset_fun_iff)
done
(** msize **)
lemma msize_0 [simp]: "msize(0) = #0"
by (simp add: msize_def)
lemma msize_single [simp]: "msize({#a#}) = #1"
by (simp add: msize_def)
lemma msize_type [simp,TC]: "msize(M) ∈ int"
by (simp add: msize_def)
lemma msize_zpositive: "multiset(M)==> #0 $≤ msize(M)"
by (auto simp add: msize_def intro: g_zpos_imp_setsum_zpos)
lemma msize_int_of_nat: "multiset(M) ==> ∃n ∈ nat. msize(M)= $# n"
apply (rule not_zneg_int_of)
apply (simp_all (no_asm_simp) add: msize_type [THEN znegative_iff_zless_0] not_zless_iff_zle msize_zpositive)
done
lemma not_empty_multiset_imp_exist:
"[M≠0; multiset(M)] ==> ∃a ∈ mset_of(M). 0 < mcount(M, a)"
apply (simp add: multiset_def)
apply (erule not_emptyE)
apply (auto simp add: mset_of_def mcount_def multiset_fun_iff)
apply (blast dest!: fun_is_rel)
done
lemma msize_eq_0_iff: "multiset(M) ==> msize(M)=#0 ⟷ M=0"
apply (simp add: msize_def, auto)
apply (rule_tac P = "setsum (u,v) ≠ #0" for u v in swap)
apply blast
apply (drule not_empty_multiset_imp_exist, assumption, clarify)
apply (subgoal_tac "Finite (mset_of (M) - {a}) ")
prefer 2 apply (simp add: Finite_Diff)
apply (subgoal_tac "setsum (λx. $# mcount (M, x), cons (a, mset_of (M) -{a}))=#0")
prefer 2 apply (simp add: cons_Diff, simp)
apply (subgoal_tac "#0 $≤ setsum (λx. $# mcount (M, x), mset_of (M) - {a}) ")
apply (rule_tac [2] g_zpos_imp_setsum_zpos)
apply (auto simp add: Finite_Diff not_zless_iff_zle [THEN iff_sym] znegative_iff_zless_0 [THEN iff_sym])
apply (rule not_zneg_int_of [THEN bexE])
apply (auto simp del: int_of_0 simp add: int_of_add [symmetric] int_of_0 [symmetric])
done
lemma setsum_mcount_Int:
"Finite(A) ==> setsum(λa. $# mcount(N, a), A ∩ mset_of(N))
= setsum(λa. $# mcount(N, a), A)"
apply (induct rule: Finite_induct)
apply auto
apply (subgoal_tac
"Finite (B ∩ mset_of (N))")
prefer 2
apply (blast intro: subset_Finite)
apply (auto simp add: mcount_def Int_cons_left)
done
lemma msize_union [simp]:
"[multiset(M); multiset(N)] ==> msize(M +# N) = msize(M) $+ msize(N)"
apply (simp add: msize_def setsum_Un setsum_addf int_of_add setsum_mcount_Int)
apply (subst Int_commute)
apply (simp add: setsum_mcount_Int)
done
lemma msize_eq_succ_imp_elem:
"[msize(M)= $# succ(n); n ∈ nat] ==> ∃a. a ∈ mset_of(M)"
unfolding msize_def
apply (blast dest: setsum_succD)
done
(** Equality of multisets **)
lemma equality_lemma:
"[multiset(M); multiset(N); ∀a. mcount(M, a)=mcount(N, a)]
==> mset_of(M)=mset_of(N)"
apply (simp add: multiset_def)
apply (rule sym, rule equalityI)
apply (auto simp add: multiset_fun_iff mcount_def mset_of_def)
apply (drule_tac [!] x=x
in spec)
apply (case_tac [2]
"x ∈ Aa", case_tac
"x ∈ A", auto)
done
lemma multiset_equality:
"[multiset(M); multiset(N)]==> M=N⟷(∀a. mcount(M, a)=mcount(N, a))"
apply auto
apply (subgoal_tac
"mset_of (M) = mset_of (N) ")
prefer 2
apply (blast intro: equality_lemma)
apply (simp add: multiset_def mset_of_def)
apply (auto simp add: multiset_fun_iff)
apply (rule fun_extension)
apply (blast, blast)
apply (drule_tac x = x
in spec)
apply (auto simp add: mcount_def mset_of_def)
done
(** More algebraic properties of multisets **)
lemma munion_eq_0_iff [simp]:
"[multiset(M); multiset(N)]==>(M +# N =0) ⟷ (M=0 ∧ N=0)"
by (auto simp add: multiset_equality)
lemma empty_eq_munion_iff [simp]:
"[multiset(M); multiset(N)]==>(0=M +# N) ⟷ (M=0 ∧ N=0)"
apply (rule iffI, drule sym)
apply (simp_all add: multiset_equality)
done
lemma munion_right_cancel [simp]:
"[multiset(M); multiset(N); multiset(K)]==>(M +# K = N +# K)⟷(M=N)"
by (auto simp add: multiset_equality)
lemma munion_left_cancel [simp]:
"[multiset(K); multiset(M); multiset(N)] ==>(K +# M = K +# N) ⟷ (M = N)"
by (auto simp add: multiset_equality)
lemma nat_add_eq_1_cases:
"[m ∈ nat; n ∈ nat] ==> (m #+ n = 1) ⟷ (m=1 ∧ n=0) | (m=0 ∧ n=1)"
by (induct_tac n) auto
lemma munion_is_single:
"[multiset(M); multiset(N)]
==> (M +# N = {#a#}) ⟷ (M={#a#} ∧ N=0) | (M = 0 ∧ N = {#a#})"
apply (simp (no_asm_simp) add: multiset_equality)
apply safe
apply simp_all
apply (case_tac
"aa=a")
apply (drule_tac [2] x = aa
in spec)
apply (drule_tac x = a
in spec)
apply (simp add: nat_add_eq_1_cases, simp)
apply (case_tac
"aaa=aa", simp)
apply (drule_tac x = aa
in spec)
apply (simp add: nat_add_eq_1_cases)
apply (case_tac
"aaa=a")
apply (drule_tac [4] x = aa
in spec)
apply (drule_tac [3] x = a
in spec)
apply (drule_tac [2] x = aaa
in spec)
apply (drule_tac x = aa
in spec)
apply (simp_all add: nat_add_eq_1_cases)
done
lemma msingle_is_union:
"[multiset(M); multiset(N)]
==> ({#a#} = M +# N) ⟷ ({#a#} = M ∧ N=0 | M = 0 ∧ {#a#} = N)"
apply (subgoal_tac
" ({#a#} = M +# N) ⟷ (M +# N = {#a#}) ")
apply (simp (no_asm_simp) add: munion_is_single)
apply blast
apply (blast dest: sym)
done
(** Towards induction over multisets **)
lemma setsum_decr:
"Finite(A)
==> (∀M. multiset(M) ⟶
(∀a ∈ mset_of(M). setsum(λz. $# mcount(M(a:=M`a #- 1), z), A) =
(if a ∈ A then setsum(λz. $# mcount(M, z), A) $- #1
else setsum(λz. $# mcount(M, z), A))))"
unfolding multiset_def
apply (erule Finite_induct)
apply (auto simp add: multiset_fun_iff)
unfolding mset_of_def mcount_def
apply (case_tac
"x ∈ A", auto)
apply (subgoal_tac
"$# M ` x $+ #-1 = $# M ` x $- $# 1")
apply (erule ssubst)
apply (rule int_of_diff, auto)
done
lemma setsum_decr2:
"Finite(A)
==> ∀M. multiset(M) ⟶ (∀a ∈ mset_of(M).
setsum(λx. $# mcount(funrestrict(M, mset_of(M)-{a}), x), A) =
(if a ∈ A then setsum(λx. $# mcount(M, x), A) $- $# M`a
else setsum(λx. $# mcount(M, x), A)))"
apply (simp add: multiset_def)
apply (erule Finite_induct)
apply (auto simp add: multiset_fun_iff mcount_def mset_of_def)
done
lemma setsum_decr3:
"[Finite(A); multiset(M); a ∈ mset_of(M)]
==> setsum(λx. $# mcount(funrestrict(M, mset_of(M)-{a}), x), A - {a}) =
(if a ∈ A then setsum(λx. $# mcount(M, x), A) $- $# M`a
else setsum(λx. $# mcount(M, x), A))"
apply (subgoal_tac
"setsum (λx. $# mcount (funrestrict (M, mset_of (M) -{a}),x),A-{a}) = setsum (λx. $# mcount (funrestrict (M, mset_of (M) -{a}),x),A) ")
apply (rule_tac [2] setsum_Diff [symmetric])
apply (rule sym, rule ssubst, blast)
apply (rule sym, drule setsum_decr2, auto)
apply (simp add: mcount_def mset_of_def)
done
lemma nat_le_1_cases:
"n ∈ nat ==> n ≤ 1 ⟷ (n=0 | n=1)"
by (auto elim: natE)
lemma succ_pred_eq_self:
"[0∈ nat
] ==> succ(n #- 1) = n"
apply (subgoal_tac
"1 ≤ n")
apply (drule add_diff_inverse2, auto)
done
text‹Specialized for use in the proof below.›
lemma multiset_funrestict:
"[∀a∈A. M ` a ∈ nat ∧ 0 < M ` a; Finite(A)]
==> multiset(funrestrict(M, A - {a}))"
apply (simp add: multiset_def multiset_fun_iff)
apply (rule_tac x=
"A-{a}" in exI)
apply (auto intro: Finite_Diff funrestrict_type)
done
lemma multiset_induct_aux:
assumes prem1:
"∧M a. [multiset(M); a∉mset_of(M); P(M)] ==> P(cons(⟨a, 1⟩, M))"
and prem2:
"∧M b. [multiset(M); b ∈ mset_of(M); P(M)] ==> P(M(b:= M`b #+ 1))"
shows
"[n ∈ nat; P(0)]
==> (∀M. multiset(M)⟶
(setsum(λx. $# mcount(M, x), {x ∈ mset_of(M). 0 < M`x}) = $# n) ⟶ P(M))"
apply (erule nat_induct, clarify)
apply (frule msize_eq_0_iff)
apply (auto simp add: mset_of_def multiset_def multiset_fun_iff msize_def)
apply (subgoal_tac
"setsum (λx. $# mcount (M, x), A) =$# succ (x) ")
apply (drule setsum_succD, auto)
apply (case_tac
"1 )
apply (drule_tac [2] not_lt_imp_le)
apply (simp_all add: nat_le_1_cases)
apply (subgoal_tac "M= (M (a:=M`a #- 1)) (a:= (M (a:=M`a #- 1))`a #+ 1) ")
apply (rule_tac [2] A = A and B = "λx. nat" and D = "λx. nat" in fun_extension)
apply (rule_tac [3] update_type)+
apply (simp_all (no_asm_simp))
apply (rule_tac [2] impI)
apply (rule_tac [2] succ_pred_eq_self [symmetric])
apply (simp_all (no_asm_simp))
apply (rule subst, rule sym, blast, rule prem2)
apply (simp (no_asm) add: multiset_def multiset_fun_iff)
apply (rule_tac x = A in exI)
apply (force intro: update_type)
apply (simp (no_asm_simp) add: mset_of_def mcount_def)
apply (drule_tac x = "M (a := M ` a #- 1) " in spec)
apply (drule mp, drule_tac [2] mp, simp_all)
apply (rule_tac x = A in exI)
apply (auto intro: update_type)
apply (subgoal_tac "Finite ({x ∈ cons (a, A) . x≠a⟶0)
prefer 2 apply (blast intro: Collect_subset [THEN subset_Finite] Finite_cons)
apply (drule_tac A = "{x ∈ cons (a, A) . x≠a⟶0 in setsum_decr)
apply (drule_tac x = M in spec)
apply (subgoal_tac "multiset (M) ")
prefer 2
apply (simp add: multiset_def multiset_fun_iff)
apply (rule_tac x = A in exI, force)
apply (simp_all add: mset_of_def)
apply (drule_tac psi = "∀x ∈ A. u(x)" for u in asm_rl)
apply (drule_tac x = a in bspec)
apply (simp (no_asm_simp))
apply (subgoal_tac "cons (a, A) = A")
prefer 2 apply blast
apply simp
apply (subgoal_tac "M=cons (, funrestrict (M, A-{a}))")
prefer 2
apply (rule fun_cons_funrestrict_eq)
apply (subgoal_tac "cons (a, A-{a}) = A")
apply force
apply force
apply (rule_tac a = "cons (⟨a, 1⟩, funrestrict (M, A - {a}))" in ssubst)
apply simp
apply (frule multiset_funrestict, assumption)
apply (rule prem1, assumption)
apply (simp add: mset_of_def)
apply (drule_tac x = "funrestrict (M, A-{a}) " in spec)
apply (drule mp)
apply (rule_tac x = "A-{a}" in exI)
apply (auto intro: Finite_Diff funrestrict_type simp add: funrestrict)
apply (frule_tac A = A and M = M and a = a in setsum_decr3)
apply (simp (no_asm_simp) add: multiset_def multiset_fun_iff)
apply blast
apply (simp (no_asm_simp) add: mset_of_def)
apply (drule_tac b = "if u then v else w" for u v w in sym, simp_all)
apply (subgoal_tac "{x ∈ A - {a} . 0 < funrestrict (M, A - {x}) ` x} = A - {a}")
apply (auto intro!: setsum_cong simp add: zdiff_eq_iff zadd_commute multiset_def multiset_fun_iff mset_of_def)
done
lemma multiset_induct2:
"[multiset(M); P(0);
(∧M a. [multiset(M); a∉mset_of(M); P(M)] ==> P(cons(⟨a, 1⟩, M)));
(∧M b. [multiset(M); b ∈ mset_of(M); P(M)] ==> P(M(b:= M`b #+ 1)))]
==> P(M)"
apply (subgoal_tac
"∃n ∈ nat. setsum (λx. $# mcount (M, x), {x ∈ mset_of (M) . 0 < M ` x}) = $# n")
apply (rule_tac [2] not_zneg_int_of)
apply (simp_all (no_asm_simp) add: znegative_iff_zless_0 not_zless_iff_zle)
apply (rule_tac [2] g_zpos_imp_setsum_zpos)
prefer 2
apply (blast intro: multiset_set_of_Finite Collect_subset [
THEN subset_Finite])
prefer 2
apply (simp add: multiset_def multiset_fun_iff, clarify)
apply (rule multiset_induct_aux [rule_format], auto)
done
lemma munion_single_case1:
"[multiset(M); a ∉mset_of(M)] ==> M +# {#a#} = cons(⟨a, 1⟩, M)"
apply (simp add: multiset_def msingle_def)
apply (auto simp add: munion_def)
apply (unfold mset_of_def, simp)
apply (rule fun_extension, rule lam_type, simp_all)
apply (auto simp add: multiset_fun_iff fun_extend_apply)
apply (drule_tac c = a
and b = 1
in fun_extend3)
apply (auto simp add: cons_eq Un_commute [of _
"{a}"])
done
lemma munion_single_case2:
"[multiset(M); a ∈ mset_of(M)] ==> M +# {#a#} = M(a:=M`a #+ 1)"
apply (simp add: multiset_def)
apply (auto simp add: munion_def multiset_fun_iff msingle_def)
apply (unfold mset_of_def, simp)
apply (subgoal_tac
"A ∪ {a} = A")
apply (rule fun_extension)
apply (auto dest: domain_type intro: lam_type update_type)
done
(* Induction principle for multisets *)
lemma multiset_induct:
assumes M:
"multiset(M)"
and P0:
"P(0)"
and step:
"∧M a. [multiset(M); P(M)] ==> P(M +# {#a#})"
shows "P(M)"
apply (rule multiset_induct2 [OF M])
apply (simp_all add: P0)
apply (frule_tac [2] a = b
in munion_single_case2 [symmetric])
apply (frule_tac a = a
in munion_single_case1 [symmetric])
apply (auto intro: step)
done
(** MCollect **)
lemma MCollect_multiset [simp]:
"multiset(M) ==> multiset({# x ∈ M. P(x)#})"
apply (simp add: MCollect_def multiset_def mset_of_def, clarify)
apply (rule_tac x =
"{x ∈ A. P (x) }" in exI)
apply (auto dest: CollectD1 [
THEN [2] apply_type]
intro: Collect_subset [
THEN subset_Finite] funrestrict_type)
done
lemma mset_of_MCollect [simp]:
"multiset(M) ==> mset_of({# x ∈ M. P(x) #}) ⊆ mset_of(M)"
by (auto simp add: mset_of_def MCollect_def multiset_def funrestrict_def)
lemma MCollect_mem_iff [iff]:
"x ∈ mset_of({#x ∈ M. P(x)#}) ⟷ x ∈ mset_of(M) ∧ P(x)"
by (simp add: MCollect_def mset_of_def)
lemma mcount_MCollect [simp]:
"mcount({# x ∈ M. P(x) #}, a) = (if P(a) then mcount(M,a) else 0)"
by (simp add: mcount_def MCollect_def mset_of_def)
lemma multiset_partition:
"multiset(M) ==> M = {# x ∈ M. P(x) #} +# {# x ∈ M. ¬ P(x) #}"
by (simp add: multiset_equality)
lemma natify_elem_is_self [simp]:
"[multiset(M); a ∈ mset_of(M)] ==> natify(M`a) = M`a"
by (auto simp add: multiset_def mset_of_def multiset_fun_iff)
(* and more algebraic laws on multisets *)
lemma munion_eq_conv_diff:
"[multiset(M); multiset(N)]
==> (M +# {#a#} = N +# {#b#}) ⟷ (M = N ∧ a = b |
M = N -# {#a#} +# {#b#} ∧ N = M -# {#b#} +# {#a#})"
apply (simp del: mcount_single add: multiset_equality)
apply (rule iffI, erule_tac [2] disjE, erule_tac [3] conjE)
apply (case_tac
"a=b", auto)
apply (drule_tac x = a
in spec)
apply (drule_tac [2] x = b
in spec)
apply (drule_tac [3] x = aa
in spec)
apply (drule_tac [4] x = a
in spec, auto)
apply (subgoal_tac [!]
"mcount (N,a) :nat")
apply (erule_tac [3] natE, erule natE, auto)
done
lemma melem_diff_single:
"multiset(M) ==>
k ∈ mset_of(M -# {#a#}) ⟷ (k=a ∧ 1 < mcount(M,a)) | (k≠ a ∧ k ∈ mset_of(M))"
apply (simp add: multiset_def)
apply (simp add: normalize_def mset_of_def msingle_def mdiff_def mcount_def)
apply (auto dest: domain_type intro: zero_less_diff [
THEN iffD1]
simp add: multiset_fun_iff apply_iff)
apply (force intro!: lam_type)
apply (force intro!: lam_type)
apply (force intro!: lam_type)
done
lemma munion_eq_conv_exist:
"[M ∈ Mult(A); N ∈ Mult(A)]
==> (M +# {#a#} = N +# {#b#}) ⟷
(M=N ∧ a=b | (∃K ∈ Mult(A). M= K +# {#b#} ∧ N=K +# {#a#}))"
by (auto simp add: Mult_iff_multiset melem_diff_single munion_eq_conv_diff)
subsection‹Multiset Orderings›
(* multiset on a domain A are finite functions from A to nat-{0} *)
(* multirel1 type *)
lemma multirel1_type:
"multirel1(A, r) ⊆ Mult(A)*Mult(A)"
by (auto simp add: multirel1_def)
lemma multirel1_0 [simp]:
"multirel1(0, r) =0"
by (auto simp add: multirel1_def)
lemma multirel1_iff:
" ⟨N, M⟩ ∈ multirel1(A, r) ⟷
(∃a. a ∈ A ∧
(∃M0. M0 ∈ Mult(A) ∧ (∃K. K ∈ Mult(A) ∧
M=M0 +# {#a#} ∧ N=M0 +# K ∧ (∀b ∈ mset_of(K). ⟨b,a⟩ ∈ r))))"
by (auto simp add: multirel1_def Mult_iff_multiset Bex_def)
text‹Monotonicity of 🍋‹multirel1›\
lemma multirel1_mono1: "A⊆B ==> multirel1(A, r)⊆multirel1(B, r)"
apply (auto simp add: multirel1_def)
apply (auto simp add: Un_subset_iff Mult_iff_multiset)
apply (rule_tac x = a in bexI)
apply (rule_tac x = M0 in bexI, simp)
apply (rule_tac x = K in bexI)
apply (auto simp add: Mult_iff_multiset)
done
lemma multirel1_mono2: "r⊆s ==> multirel1(A,r)⊆multirel1(A, s)"
apply (simp add: multirel1_def, auto)
apply (rule_tac x = a in bexI)
apply (rule_tac x = M0 in bexI)
apply (simp_all add: Mult_iff_multiset)
apply (rule_tac x = K in bexI)
apply (simp_all add: Mult_iff_multiset, auto)
done
lemma multirel1_mono:
"[A⊆B; r⊆s] ==> multirel1(A, r) ⊆ multirel1(B, s)"
apply (rule subset_trans)
apply (rule multirel1_mono1)
apply (rule_tac [2] multirel1_mono2, auto)
done
subsection‹Toward the proof of well-foundedness of multirel1›
lemma not_less_0 [iff]: "⟨M,0⟩ ∉ multirel1(A, r)"
by (auto simp add: multirel1_def Mult_iff_multiset)
lemma less_munion: "[ ∈ multirel1(A, r); M0 ∈ Mult(A)] ==>
(∃M. ⟨M, M0⟩ ∈ multirel1(A, r) ∧ N = M +# {#a#}) |
(∃K. K ∈ Mult(A) ∧ (∀b ∈ mset_of(K). ⟨b, a⟩ ∈ r) ∧ N = M0 +# K)"
apply (frule multirel1_type [
THEN subsetD])
apply (simp add: multirel1_iff)
apply (auto simp add: munion_eq_conv_exist)
apply (rule_tac x=
"Ka +# K" in exI, auto, simp add: Mult_iff_multiset)
apply (simp (no_asm_simp) add: munion_left_cancel munion_assoc)
apply (auto simp add: munion_commute)
done
lemma multirel1_base:
"[M ∈ Mult(A); a ∈ A] ==> ∈ multirel1(A, r)"
apply (auto simp add: multirel1_iff)
apply (simp add: Mult_iff_multiset)
apply (rule_tac x = a
in exI, clarify)
apply (rule_tac x = M
in exI, simp)
apply (rule_tac x = 0
in exI, auto)
done
lemma acc_0:
"acc(0)=0"
by (auto intro!: equalityI dest: acc.dom_subset [
THEN subsetD])
lemma lemma1:
"[∀b ∈ A. ⟨b,a⟩ ∈ r ⟶
(∀M ∈ acc(multirel1(A, r)). M +# {#b#}:acc(multirel1(A, r)));
M0 ∈ acc(multirel1(A, r)); a ∈ A;
∀M. ⟨M,M0⟩ ∈ multirel1(A, r) ⟶ M +# {#a#} ∈ acc(multirel1(A, r))]
==> M0 +# {#a#} ∈ acc(multirel1(A, r))"
apply (subgoal_tac
"M0 ∈ Mult(A) ")
prefer 2
apply (erule acc.cases)
apply (erule fieldE)
apply (auto dest: multirel1_type [
THEN subsetD])
apply (rule accI)
apply (rename_tac
"N")
apply (drule less_munion, blast)
apply (auto simp add: Mult_iff_multiset)
apply (erule_tac P =
"∀x ∈ mset_of (K) . ⟨x, a⟩ ∈ r" in rev_mp)
apply (erule_tac P =
"mset_of (K) ⊆A" in rev_mp)
apply (erule_tac M = K
in multiset_induct)
(* three subgoals *)
(* subgoal 1 \<in> the induction base case *)
apply (simp (no_asm_simp))
(* subgoal 2 \<in> the induction general case *)
apply (simp add: Ball_def Un_subset_iff, clarify)
apply (drule_tac x = aa
in spec, simp)
apply (subgoal_tac
"aa ∈ A")
prefer 2
apply blast
apply (drule_tac x =
"M0 +# M" and P =
"λx. x ∈ acc(multirel1(A, r)) ⟶ Q(x)" for Q
in spec)
apply (simp add: munion_assoc [symmetric])
(* subgoal 3 \<in> additional conditions *)
apply (auto intro!: multirel1_base [
THEN fieldI2] simp add: Mult_iff_multiset)
done
lemma lemma2:
"[∀b ∈ A. ⟨b,a⟩ ∈ r
⟶ (∀M ∈ acc(multirel1(A, r)). M +# {#b#} :acc(multirel1(A, r)));
M ∈ acc(multirel1(A, r)); a ∈ A] ==> M +# {#a#} ∈ acc(multirel1(A, r))"
apply (erule acc_induct)
apply (blast intro: lemma1)
done
lemma lemma3:
"[wf[A](r); a ∈ A]
==> ∀M ∈ acc(multirel1(A, r)). M +# {#a#} ∈ acc(multirel1(A, r))"
apply (erule_tac a = a
in wf_on_induct, blast)
apply (blast intro: lemma2)
done
lemma lemma4:
"multiset(M) ==> mset_of(M)⊆A ⟶
wf[A](r) ⟶ M ∈ field(multirel1(A, r)) ⟶ M ∈ acc(multirel1(A, r))"
apply (erule multiset_induct)
(* proving the base case *)
apply clarify
apply (rule accI, force)
apply (simp add: multirel1_def)
(* Proving the general case *)
apply clarify
apply simp
apply (subgoal_tac
"mset_of (M) ⊆A")
prefer 2
apply blast
apply clarify
apply (drule_tac a = a
in lemma3, blast)
apply (subgoal_tac
"M ∈ field (multirel1 (A,r))")
apply blast
apply (rule multirel1_base [
THEN fieldI1])
apply (auto simp add: Mult_iff_multiset)
done
lemma all_accessible:
"[wf[A](r); M ∈ Mult(A); A ≠ 0] ==> M ∈ acc(multirel1(A, r))"
apply (erule not_emptyE)
apply (rule lemma4 [
THEN mp,
THEN mp,
THEN mp])
apply (rule_tac [4] multirel1_base [
THEN fieldI1])
apply (auto simp add: Mult_iff_multiset)
done
lemma wf_on_multirel1:
"wf[A](r) ==> wf[A-||>nat-{0}](multirel1(A, r))"
apply (case_tac
"A=0")
apply (simp (no_asm_simp))
apply (rule wf_imp_wf_on)
apply (rule wf_on_field_imp_wf)
apply (simp (no_asm_simp) add: wf_on_0)
apply (rule_tac A =
"acc (multirel1 (A,r))" in wf_on_subset_A)
apply (rule wf_on_acc)
apply (blast intro: all_accessible)
done
lemma wf_multirel1:
"wf(r) ==>wf(multirel1(field(r), r))"
apply (simp (no_asm_use) add: wf_iff_wf_on_field)
apply (drule wf_on_multirel1)
apply (rule_tac A =
"field (r) -||> nat - {0}" in wf_on_subset_A)
apply (simp (no_asm_simp))
apply (rule field_rel_subset)
apply (rule multirel1_type)
done
(** multirel **)
lemma multirel_type:
"multirel(A, r) ⊆ Mult(A)*Mult(A)"
apply (simp add: multirel_def)
apply (rule trancl_type [
THEN subset_trans])
apply (auto dest: multirel1_type [
THEN subsetD])
done
(* Monotonicity of multirel *)
lemma multirel_mono:
"[A⊆B; r⊆s] ==> multirel(A, r)⊆multirel(B,s)"
apply (simp add: multirel_def)
apply (rule trancl_mono)
apply (rule multirel1_mono, auto)
done
(* Equivalence of multirel with the usual (closure-free) definition *)
lemma add_diff_eq:
"k ∈ nat ==> 0 < k ⟶ n #+ k #- 1 = n #+ (k #- 1)"
by (erule nat_induct, auto)
lemma mdiff_union_single_conv:
"[a ∈ mset_of(J); multiset(I); multiset(J)]
==> I +# J -# {#a#} = I +# (J-# {#a#})"
apply (simp (no_asm_simp) add: multiset_equality)
apply (case_tac
"a ∉ mset_of (I) ")
apply (auto simp add: mcount_def mset_of_def multiset_def multiset_fun_iff)
apply (auto dest: domain_type simp add: add_diff_eq)
done
lemma diff_add_commute:
"[n ≤ m; m ∈ nat; n ∈ nat; k ∈ nat] ==> m #- n #+ k = m #+ k #- n"
by (auto simp add: le_iff less_iff_succ_add)
(* One direction *)
lemma multirel_implies_one_step:
"⟨M,N⟩ ∈ multirel(A, r) ==>
trans[A](r) ⟶
(∃I J K.
I ∈ Mult(A) ∧ J ∈ Mult(A) ∧ K ∈ Mult(A) ∧
N = I +# J ∧ M = I +# K ∧ J ≠ 0 ∧
(∀k ∈ mset_of(K). ∃j ∈ mset_of(J). ⟨k,j⟩ ∈ r))"
apply (simp add: multirel_def Ball_def Bex_def)
apply (erule converse_trancl_induct)
apply (simp_all add: multirel1_iff Mult_iff_multiset)
(* Two subgoals remain *)
(* Subgoal 1 *)
apply clarify
apply (rule_tac x = M0
in exI, force)
(* Subgoal 2 *)
apply clarify
apply hypsubst_thin
apply (case_tac
"a ∈ mset_of (Ka) ")
apply (rule_tac x = I
in exI, simp (no_asm_simp))
apply (rule_tac x = J
in exI, simp (no_asm_simp))
apply (rule_tac x =
" (Ka -# {#a#}) +# K" in exI, simp (no_asm_simp))
apply (simp_all add: Un_subset_iff)
apply (simp (no_asm_simp) add: munion_assoc [symmetric])
apply (drule_tac t =
"λM. M-#{#a#}" in subst_context)
apply (simp add: mdiff_union_single_conv melem_diff_single, clarify)
apply (erule disjE, simp)
apply (erule disjE, simp)
apply (drule_tac x = a
and P =
"λx. x :# Ka ⟶ Q(x)" for Q
in spec)
apply clarify
apply (rule_tac x = xa
in exI)
apply (simp (no_asm_simp))
apply (blast dest: trans_onD)
(* new we know that a\<notin>mset_of(Ka) *)
apply (subgoal_tac
"a :# I")
apply (rule_tac x =
"I-#{#a#}" in exI, simp (no_asm_simp))
apply (rule_tac x =
"J+#{#a#}" in exI)
apply (simp (no_asm_simp) add: Un_subset_iff)
apply (rule_tac x =
"Ka +# K" in exI)
apply (simp (no_asm_simp) add: Un_subset_iff)
apply (rule conjI)
apply (simp (no_asm_simp) add: multiset_equality mcount_elem [
THEN succ_pred_eq_self])
apply (rule conjI)
apply (drule_tac t =
"λM. M-#{#a#}" in subst_context)
apply (simp add: mdiff_union_inverse2)
apply (simp_all (no_asm_simp) add: multiset_equality)
apply (rule diff_add_commute [symmetric])
apply (auto intro: mcount_elem)
apply (subgoal_tac
"a ∈ mset_of (I +# Ka) ")
apply (drule_tac [2] sym, auto)
done
lemma melem_imp_eq_diff_union [simp]:
"[a ∈ mset_of(M); multiset(M)] ==> M -# {#a#} +# {#a#} = M"
by (simp add: multiset_equality mcount_elem [
THEN succ_pred_eq_self])
lemma msize_eq_succ_imp_eq_union:
"[msize(M)=$# succ(n); M ∈ Mult(A); n ∈ nat]
==> ∃a N. M = N +# {#a#} ∧ N ∈ Mult(A) ∧ a ∈ A"
apply (drule msize_eq_succ_imp_elem, auto)
apply (rule_tac x = a
in exI)
apply (rule_tac x =
"M -# {#a#}" in exI)
apply (frule Mult_into_multiset)
apply (simp (no_asm_simp))
apply (auto simp add: Mult_iff_multiset)
done
(* The second direction *)
lemma one_step_implies_multirel_lemma [rule_format (no_asm)]:
"n ∈ nat ==>
(∀I J K.
I ∈ Mult(A) ∧ J ∈ Mult(A) ∧ K ∈ Mult(A) ∧
(msize(J) = $# n ∧ J ≠0 ∧ (∀k ∈ mset_of(K). ∃j ∈ mset_of(J). ⟨k, j⟩ ∈ r))
⟶ ∈ multirel(A, r))"
apply (simp add: Mult_iff_multiset)
apply (erule nat_induct, clarify)
apply (drule_tac M = J
in msize_eq_0_iff, auto)
(* one subgoal remains *)
apply (subgoal_tac
"msize (J) =$# succ (x) ")
prefer 2
apply simp
apply (frule_tac A = A
in msize_eq_succ_imp_eq_union)
apply (simp_all add: Mult_iff_multiset, clarify)
apply (rename_tac
"J'", simp)
apply (case_tac
"J' = 0")
apply (simp add: multirel_def)
apply (rule r_into_trancl, clarify)
apply (simp add: multirel1_iff Mult_iff_multiset, force)
(*Now we know J' \<noteq> 0*)
apply (drule sym, rotate_tac -1, simp)
apply (erule_tac V =
"$# x = msize (J') " in thin_rl)
apply (frule_tac M = K
and P =
"λx. ⟨x,a⟩ ∈ r" in multiset_partition)
apply (erule_tac P =
"∀k ∈ mset_of (K) . P(k)" for P
in rev_mp)
apply (erule ssubst)
apply (simp add: Ball_def, auto)
apply (subgoal_tac
"< (I +# {# x ∈ K. ⟨x, a⟩ ∈ r#}) +# {# x ∈ K. ⟨x, a⟩ ∉ r#}, (I +# {# x ∈ K. ⟨x, a⟩ ∈ r#}) +# J'> ∈ multirel(A, r) ")
prefer 2
apply (drule_tac x =
"I +# {# x ∈ K. ⟨x, a⟩ ∈ r#}" in spec)
apply (rotate_tac -1)
apply (drule_tac x =
"J'" in spec)
apply (rotate_tac -1)
apply (drule_tac x =
"{# x ∈ K. ⟨x, a⟩ ∉ r#}" in spec, simp)
apply blast
apply (simp add: munion_assoc [symmetric] multirel_def)
apply (rule_tac b =
"I +# {# x ∈ K. ⟨x, a⟩ ∈ r#} +# J'" in trancl_trans, blast)
apply (rule r_into_trancl)
apply (simp add: multirel1_iff Mult_iff_multiset)
apply (rule_tac x = a
in exI)
apply (simp (no_asm_simp))
apply (rule_tac x =
"I +# J'" in exI)
apply (auto simp add: munion_ac Un_subset_iff)
done
lemma one_step_implies_multirel:
"[J ≠ 0; ∀k ∈ mset_of(K). ∃j ∈ mset_of(J). ⟨k,j⟩ ∈ r;
I ∈ Mult(A); J ∈ Mult(A); K ∈ Mult(A)]
==> ∈ multirel(A, r)"
apply (subgoal_tac
"multiset (J) ")
prefer 2
apply (simp add: Mult_iff_multiset)
apply (frule_tac M = J
in msize_int_of_nat)
apply (auto intro: one_step_implies_multirel_lemma)
done
(** Proving that multisets are partially ordered **)
(*irreflexivity*)
lemma multirel_irrefl_lemma:
"Finite(A) ==> part_ord(A, r) ⟶ (∀x ∈ A. ∃y ∈ A. ⟨x,y⟩ ∈ r) ⟶A=0"
apply (erule Finite_induct)
apply (auto dest: subset_consI [
THEN [2] part_ord_subset])
apply (auto simp add: part_ord_def irrefl_def)
apply (drule_tac x = xa
in bspec)
apply (drule_tac [2] a = xa
and b = x
in trans_onD, auto)
done
lemma irrefl_on_multirel:
"part_ord(A, r) ==> irrefl(Mult(A), multirel(A, r))"
apply (simp add: irrefl_def)
apply (subgoal_tac
"trans[A](r) ")
prefer 2
apply (simp add: part_ord_def, clarify)
apply (drule multirel_implies_one_step, clarify)
apply (simp add: Mult_iff_multiset, clarify)
apply (subgoal_tac
"Finite (mset_of (K))")
apply (frule_tac r = r
in multirel_irrefl_lemma)
apply (frule_tac B =
"mset_of (K) " in part_ord_subset)
apply simp_all
apply (auto simp add: multiset_def mset_of_def)
done
lemma trans_on_multirel:
"trans[Mult(A)](multirel(A, r))"
apply (simp add: multirel_def trans_on_def)
apply (blast intro: trancl_trans)
done
lemma multirel_trans:
"[⟨M, N⟩ ∈ multirel(A, r); ⟨N, K⟩ ∈ multirel(A, r)] ==> ⟨M, K⟩ ∈ multirel(A,r)"
apply (simp add: multirel_def)
apply (blast intro: trancl_trans)
done
lemma trans_multirel:
"trans(multirel(A,r))"
apply (simp add: multirel_def)
apply (rule trans_trancl)
done
lemma part_ord_multirel:
"part_ord(A,r) ==> part_ord(Mult(A), multirel(A, r))"
apply (simp (no_asm) add: part_ord_def)
apply (blast intro: irrefl_on_multirel trans_on_multirel)
done
(** Monotonicity of multiset union **)
lemma munion_multirel1_mono:
"[⟨M,N⟩ ∈ multirel1(A, r); K ∈ Mult(A)] ==> ∈ multirel1(A, r)"
apply (frule multirel1_type [
THEN subsetD])
apply (auto simp add: multirel1_iff Mult_iff_multiset)
apply (rule_tac x = a
in exI)
apply (simp (no_asm_simp))
apply (rule_tac x =
"K+#M0" in exI)
apply (simp (no_asm_simp) add: Un_subset_iff)
apply (rule_tac x = Ka
in exI)
apply (simp (no_asm_simp) add: munion_assoc)
done
lemma munion_multirel_mono2:
"[⟨M, N⟩ ∈ multirel(A, r); K ∈ Mult(A)]==> ∈ multirel(A, r)"
apply (frule multirel_type [
THEN subsetD])
apply (simp (no_asm_use) add: multirel_def)
apply clarify
apply (drule_tac psi =
"⟨M,N⟩ ∈ multirel1 (A, r) ^+" in asm_rl)
apply (erule rev_mp)
apply (erule rev_mp)
apply (erule rev_mp)
apply (erule trancl_induct, clarify)
apply (blast intro: munion_multirel1_mono r_into_trancl, clarify)
apply (subgoal_tac
"y ∈ Mult(A) ")
prefer 2
apply (blast dest: multirel_type [unfolded multirel_def,
THEN subsetD])
apply (subgoal_tac
" ∈ multirel1 (A, r) ")
prefer 2
apply (blast intro: munion_multirel1_mono)
apply (blast intro: r_into_trancl trancl_trans)
done
lemma munion_multirel_mono1:
"[⟨M, N⟩ ∈ multirel(A, r); K ∈ Mult(A)] ==> ∈ multirel(A, r)"
apply (frule multirel_type [
THEN subsetD])
apply (rule_tac P =
"λx. ⟨x,u⟩ ∈ multirel(A, r)" for u
in munion_commute [
THEN subst])
apply (subst munion_commute [of N])
apply (rule munion_multirel_mono2)
apply (auto simp add: Mult_iff_multiset)
done
lemma munion_multirel_mono:
"[⟨M,K⟩ ∈ multirel(A, r); ⟨N,L⟩ ∈ multirel(A, r)]
==> ∈ multirel(A, r)"
apply (subgoal_tac
"M ∈ Mult(A) ∧ N ∈ Mult(A) ∧ K ∈ Mult(A) ∧ L ∈ Mult(A) ")
prefer 2
apply (blast dest: multirel_type [
THEN subsetD])
apply (blast intro: munion_multirel_mono1 multirel_trans munion_multirel_mono2)
done
subsection‹Ordinal Multisets›
(* A \<subseteq> B \<Longrightarrow> field(Memrel(A)) \<subseteq> field(Memrel(B)) *)
lemmas field_Memrel_mono = Memrel_mono [
THEN field_mono]
(*
[Aa ⊆ Ba; A ⊆ B] ==>
multirel(field(Memrel(Aa)), Memrel(A))⊆ multirel(field(Memrel(Ba)), Memrel(B))
*)
lemmas multirel_Memrel_mono = multirel_mono [OF field_Memrel_mono Memrel_mono]
lemma omultiset_is_multiset [simp]:
"omultiset(M) ==> multiset(M)"
apply (simp add: omultiset_def)
apply (auto simp add: Mult_iff_multiset)
done
lemma munion_omultiset [simp]:
"[omultiset(M); omultiset(N)] ==> omultiset(M +# N)"
apply (simp add: omultiset_def, clarify)
apply (rule_tac x =
"i ∪ ia" in exI)
apply (simp add: Mult_iff_multiset Ord_Un Un_subset_iff)
apply (blast intro: field_Memrel_mono)
done
lemma mdiff_omultiset [simp]:
"omultiset(M) ==> omultiset(M -# N)"
apply (simp add: omultiset_def, clarify)
apply (simp add: Mult_iff_multiset)
apply (rule_tac x = i
in exI)
apply (simp (no_asm_simp))
done
(** Proving that Memrel is a partial order **)
lemma irrefl_Memrel:
"Ord(i) ==> irrefl(field(Memrel(i)), Memrel(i))"
apply (rule irreflI, clarify)
apply (subgoal_tac
"Ord (x) ")
prefer 2
apply (blast intro: Ord_in_Ord)
apply (drule_tac i = x
in ltI [
THEN lt_irrefl], auto)
done
lemma trans_iff_trans_on:
"trans(r) ⟷ trans[field(r)](r)"
by (simp add: trans_on_def trans_def, auto)
lemma part_ord_Memrel:
"Ord(i) ==>part_ord(field(Memrel(i)), Memrel(i))"
apply (simp add: part_ord_def)
apply (simp (no_asm) add: trans_iff_trans_on [
THEN iff_sym])
apply (blast intro: trans_Memrel irrefl_Memrel)
done
(*
Ord(i) ==>
part_ord(field(Memrel(i))-||>nat-{0}, multirel(field(Memrel(i)), Memrel(i)))
*)
lemmas part_ord_mless = part_ord_Memrel [
THEN part_ord_multirel]
(*irreflexivity*)
lemma mless_not_refl:
"¬(M <# M)"
apply (simp add: mless_def, clarify)
apply (frule multirel_type [
THEN subsetD])
apply (drule part_ord_mless)
apply (simp add: part_ord_def irrefl_def)
done
(* N<N \<Longrightarrow> R *)
lemmas mless_irrefl = mless_not_refl [
THEN notE, elim!]
(*transitivity*)
lemma mless_trans:
"[K <# M; M <# N] ==> K <# N"
apply (simp add: mless_def, clarify)
apply (rule_tac x =
"i ∪ ia" in exI)
apply (blast dest: multirel_Memrel_mono [OF Un_upper1 Un_upper1,
THEN subsetD]
multirel_Memrel_mono [OF Un_upper2 Un_upper2,
THEN subsetD]
intro: multirel_trans Ord_Un)
done
(*asymmetry*)
lemma mless_not_sym:
"M <# N ==> ¬ N <# M"
apply clarify
apply (rule mless_not_refl [
THEN notE])
apply (erule mless_trans, assumption)
done
lemma mless_asym:
"[M <# N; ¬P ==> N <# M] ==> P"
by (blast dest: mless_not_sym)
lemma mle_refl [simp]:
"omultiset(M) ==> M <#= M"
by (simp add: mle_def)
(*anti-symmetry*)
lemma mle_antisym:
"[M <#= N; N <#= M] ==> M = N"
apply (simp add: mle_def)
apply (blast dest: mless_not_sym)
done
(*transitivity*)
lemma mle_trans:
"[K <#= M; M <#= N] ==> K <#= N"
apply (simp add: mle_def)
apply (blast intro: mless_trans)
done
lemma mless_le_iff:
"M <# N ⟷ (M <#= N ∧ M ≠ N)"
by (simp add: mle_def, auto)
(** Monotonicity of mless **)
lemma munion_less_mono2:
"[M <# N; omultiset(K)] ==> K +# M <# K +# N"
apply (simp add: mless_def omultiset_def, clarify)
apply (rule_tac x =
"i ∪ ia" in exI)
apply (simp add: Mult_iff_multiset Ord_Un Un_subset_iff)
apply (rule munion_multirel_mono2)
apply (blast intro: multirel_Memrel_mono [
THEN subsetD])
apply (simp add: Mult_iff_multiset)
apply (blast intro: field_Memrel_mono [
THEN subsetD])
done
lemma munion_less_mono1:
"[M <# N; omultiset(K)] ==> M +# K <# N +# K"
by (force dest: munion_less_mono2 simp add: munion_commute)
lemma mless_imp_omultiset:
"M <# N ==> omultiset(M) ∧ omultiset(N)"
by (auto simp add: mless_def omultiset_def dest: multirel_type [
THEN subsetD])
lemma munion_less_mono:
"[M <# K; N <# L] ==> M +# N <# K +# L"
apply (frule_tac M = M
in mless_imp_omultiset)
apply (frule_tac M = N
in mless_imp_omultiset)
apply (blast intro: munion_less_mono1 munion_less_mono2 mless_trans)
done
(* <#= *)
lemma mle_imp_omultiset:
"M <#= N ==> omultiset(M) ∧ omultiset(N)"
by (auto simp add: mle_def mless_imp_omultiset)
lemma mle_mono:
"[M <#= K; N <#= L] ==> M +# N <#= K +# L"
apply (frule_tac M = M
in mle_imp_omultiset)
apply (frule_tac M = N
in mle_imp_omultiset)
apply (auto simp add: mle_def intro: munion_less_mono1 munion_less_mono2 munion_less_mon
o)
done
lemma omultiset_0 [iff]: "omultiset(0)"
by (auto simp add: omultiset_def Mult_iff_multiset)
lemma empty_leI [simp]: "omultiset(M) ==> 0 <#= M"
apply (simp add: mle_def mless_def)
apply (subgoal_tac "∃i. Ord (i) ∧ M ∈ Mult(field(Memrel(i))) ")
prefer 2 apply (simp add: omultiset_def)
apply (case_tac "M=0", simp_all, clarify)
apply (subgoal_tac "<0 +# 0, 0 +# M> ∈ multirel(field (Memrel(i)), Memrel(i))")
apply (rule_tac [2] one_step_implies_multirel)
apply (auto simp add: Mult_iff_multiset)
done
lemma munion_upper1: "[omultiset(M); omultiset(N)] ==> M <#= M +# N"
apply (subgoal_tac "M +# 0 <#= M +# N")
apply (rule_tac [2] mle_mono, auto)
done
end
