section‹Least and Greatest Fixed Points; the Knaster-Tarski Theorem›
theory Fixedpt imports equalities begin
definition
bnd_mono :: "[i,i=>i]=>o" where
"bnd_mono(D,h) == h(D)<=D & (∀W X. W<=X ⟶ X<=D ⟶ h(W) ⊆ h(X))"
definition
lfp :: "[i,i=>i]=>i" where
"lfp(D,h) == ⋂({X: Pow(D). h(X) ⊆ X})"
definition
gfp :: "[i,i=>i]=>i" where
"gfp(D,h) == ⋃({X: Pow(D). X ⊆ h(X)})"
text‹The theorem is proved in the lattice of subsets of \<^term>‹D›,
namely \<^term>‹Pow(D)›, with Inter as the greatest lower bound.›
subsection‹Monotone Operators›
lemma bnd_monoI:
"[| h(D)<=D;
!!W X. [| W<=D; X<=D; W<=X |] ==> h(W) ⊆ h(X)
|] ==> bnd_mono(D,h)"
by (unfold bnd_mono_def, clarify, blast)
lemma bnd_monoD1: "bnd_mono(D,h) ==> h(D) ⊆ D"
apply (unfold bnd_mono_def)
apply (erule conjunct1)
done
lemma bnd_monoD2: "[| bnd_mono(D,h); W<=X; X<=D |] ==> h(W) ⊆ h(X)"
by (unfold bnd_mono_def, blast)
lemma bnd_mono_subset:
"[| bnd_mono(D,h); X<=D |] ==> h(X) ⊆ D"
by (unfold bnd_mono_def, clarify, blast)
lemma bnd_mono_Un:
"[| bnd_mono(D,h); A ⊆ D; B ⊆ D |] ==> h(A) ∪ h(B) ⊆ h(A ∪ B)"
apply (unfold bnd_mono_def)
apply (rule Un_least, blast+)
done
lemma bnd_mono_UN:
"[| bnd_mono(D,h); ∀i∈I. A(i) ⊆ D |]
==> (⋃i∈I. h(A(i))) ⊆ h((⋃i∈I. A(i)))"
apply (unfold bnd_mono_def)
apply (rule UN_least)
apply (elim conjE)
apply (drule_tac x="A(i)" in spec)
apply (drule_tac x="(⋃i∈I. A(i))" in spec)
apply blast
done
lemma bnd_mono_Int:
"[| bnd_mono(D,h); A ⊆ D; B ⊆ D |] ==> h(A ∩ B) ⊆ h(A) ∩ h(B)"
apply (rule Int_greatest)
apply (erule bnd_monoD2, rule Int_lower1, assumption)
apply (erule bnd_monoD2, rule Int_lower2, assumption)
done
subsection‹Proof of Knaster-Tarski Theorem using \<^term>‹lfp››
lemma lfp_lowerbound:
"[| h(A) ⊆ A; A<=D |] ==> lfp(D,h) ⊆ A"
by (unfold lfp_def, blast)
lemma lfp_subset: "lfp(D,h) ⊆ D"
by (unfold lfp_def Inter_def, blast)
lemma def_lfp_subset: "A == lfp(D,h) ==> A ⊆ D"
apply simp
apply (rule lfp_subset)
done
lemma lfp_greatest:
"[| h(D) ⊆ D; !!X. [| h(X) ⊆ X; X<=D |] ==> A<=X |] ==> A ⊆ lfp(D,h)"
by (unfold lfp_def, blast)
lemma lfp_lemma1:
"[| bnd_mono(D,h); h(A)<=A; A<=D |] ==> h(lfp(D,h)) ⊆ A"
apply (erule bnd_monoD2 [THEN subset_trans])
apply (rule lfp_lowerbound, assumption+)
done
lemma lfp_lemma2: "bnd_mono(D,h) ==> h(lfp(D,h)) ⊆ lfp(D,h)"
apply (rule bnd_monoD1 [THEN lfp_greatest])
apply (rule_tac [2] lfp_lemma1)
apply (assumption+)
done
lemma lfp_lemma3:
"bnd_mono(D,h) ==> lfp(D,h) ⊆ h(lfp(D,h))"
apply (rule lfp_lowerbound)
apply (rule bnd_monoD2, assumption)
apply (rule lfp_lemma2, assumption)
apply (erule_tac [2] bnd_mono_subset)
apply (rule lfp_subset)+
done
lemma lfp_unfold: "bnd_mono(D,h) ==> lfp(D,h) = h(lfp(D,h))"
apply (rule equalityI)
apply (erule lfp_lemma3)
apply (erule lfp_lemma2)
done
lemma def_lfp_unfold:
"[| A==lfp(D,h); bnd_mono(D,h) |] ==> A = h(A)"
apply simp
apply (erule lfp_unfold)
done
subsection‹General Induction Rule for Least Fixedpoints›
lemma Collect_is_pre_fixedpt:
"[| bnd_mono(D,h); !!x. x ∈ h(Collect(lfp(D,h),P)) ==> P(x) |]
==> h(Collect(lfp(D,h),P)) ⊆ Collect(lfp(D,h),P)"
by (blast intro: lfp_lemma2 [THEN subsetD] bnd_monoD2 [THEN subsetD]
lfp_subset [THEN subsetD])
lemma induct:
"[| bnd_mono(D,h); a ∈ lfp(D,h);
!!x. x ∈ h(Collect(lfp(D,h),P)) ==> P(x)
|] ==> P(a)"
apply (rule Collect_is_pre_fixedpt
[THEN lfp_lowerbound, THEN subsetD, THEN CollectD2])
apply (rule_tac [3] lfp_subset [THEN Collect_subset [THEN subset_trans]],
blast+)
done
lemma def_induct:
"[| A == lfp(D,h); bnd_mono(D,h); a:A;
!!x. x ∈ h(Collect(A,P)) ==> P(x)
|] ==> P(a)"
by (rule induct, blast+)
lemma lfp_Int_lowerbound:
"[| h(D ∩ A) ⊆ A; bnd_mono(D,h) |] ==> lfp(D,h) ⊆ A"
apply (rule lfp_lowerbound [THEN subset_trans])
apply (erule bnd_mono_subset [THEN Int_greatest], blast+)
done
lemma lfp_mono:
assumes hmono: "bnd_mono(D,h)"
and imono: "bnd_mono(E,i)"
and subhi: "!!X. X<=D ==> h(X) ⊆ i(X)"
shows "lfp(D,h) ⊆ lfp(E,i)"
apply (rule bnd_monoD1 [THEN lfp_greatest])
apply (rule imono)
apply (rule hmono [THEN [2] lfp_Int_lowerbound])
apply (rule Int_lower1 [THEN subhi, THEN subset_trans])
apply (rule imono [THEN bnd_monoD2, THEN subset_trans], auto)
done
lemma lfp_mono2:
"[| i(D) ⊆ D; !!X. X<=D ==> h(X) ⊆ i(X) |] ==> lfp(D,h) ⊆ lfp(D,i)"
apply (rule lfp_greatest, assumption)
apply (rule lfp_lowerbound, blast, assumption)
done
lemma lfp_cong:
"[|D=D'; !!X. X ⊆ D' ==> h(X) = h'(X)|] ==> lfp(D,h) = lfp(D',h')"
apply (simp add: lfp_def)
apply (rule_tac t=Inter in subst_context)
apply (rule Collect_cong, simp_all)
done
subsection‹Proof of Knaster-Tarski Theorem using \<^term>‹gfp››
lemma gfp_upperbound: "[| A ⊆ h(A); A<=D |] ==> A ⊆ gfp(D,h)"
apply (unfold gfp_def)
apply (rule PowI [THEN CollectI, THEN Union_upper])
apply (assumption+)
done
lemma gfp_subset: "gfp(D,h) ⊆ D"
by (unfold gfp_def, blast)
lemma def_gfp_subset: "A==gfp(D,h) ==> A ⊆ D"
apply simp
apply (rule gfp_subset)
done
lemma gfp_least:
"[| bnd_mono(D,h); !!X. [| X ⊆ h(X); X<=D |] ==> X<=A |] ==>
gfp(D,h) ⊆ A"
apply (unfold gfp_def)
apply (blast dest: bnd_monoD1)
done
lemma gfp_lemma1:
"[| bnd_mono(D,h); A<=h(A); A<=D |] ==> A ⊆ h(gfp(D,h))"
apply (rule subset_trans, assumption)
apply (erule bnd_monoD2)
apply (rule_tac [2] gfp_subset)
apply (simp add: gfp_upperbound)
done
lemma gfp_lemma2: "bnd_mono(D,h) ==> gfp(D,h) ⊆ h(gfp(D,h))"
apply (rule gfp_least)
apply (rule_tac [2] gfp_lemma1)
apply (assumption+)
done
lemma gfp_lemma3:
"bnd_mono(D,h) ==> h(gfp(D,h)) ⊆ gfp(D,h)"
apply (rule gfp_upperbound)
apply (rule bnd_monoD2, assumption)
apply (rule gfp_lemma2, assumption)
apply (erule bnd_mono_subset, rule gfp_subset)+
done
lemma gfp_unfold: "bnd_mono(D,h) ==> gfp(D,h) = h(gfp(D,h))"
apply (rule equalityI)
apply (erule gfp_lemma2)
apply (erule gfp_lemma3)
done
lemma def_gfp_unfold:
"[| A==gfp(D,h); bnd_mono(D,h) |] ==> A = h(A)"
apply simp
apply (erule gfp_unfold)
done
subsection‹Coinduction Rules for Greatest Fixed Points›
lemma weak_coinduct: "[| a: X; X ⊆ h(X); X ⊆ D |] ==> a ∈ gfp(D,h)"
by (blast intro: gfp_upperbound [THEN subsetD])
lemma coinduct_lemma:
"[| X ⊆ h(X ∪ gfp(D,h)); X ⊆ D; bnd_mono(D,h) |] ==>
X ∪ gfp(D,h) ⊆ h(X ∪ gfp(D,h))"
apply (erule Un_least)
apply (rule gfp_lemma2 [THEN subset_trans], assumption)
apply (rule Un_upper2 [THEN subset_trans])
apply (rule bnd_mono_Un, assumption+)
apply (rule gfp_subset)
done
lemma coinduct:
"[| bnd_mono(D,h); a: X; X ⊆ h(X ∪ gfp(D,h)); X ⊆ D |]
==> a ∈ gfp(D,h)"
apply (rule weak_coinduct)
apply (erule_tac [2] coinduct_lemma)
apply (simp_all add: gfp_subset Un_subset_iff)
done
lemma def_coinduct:
"[| A == gfp(D,h); bnd_mono(D,h); a: X; X ⊆ h(X ∪ A); X ⊆ D |] ==>
a ∈ A"
apply simp
apply (rule coinduct, assumption+)
done
lemma def_Collect_coinduct:
"[| A == gfp(D, %w. Collect(D,P(w))); bnd_mono(D, %w. Collect(D,P(w)));
a: X; X ⊆ D; !!z. z: X ==> P(X ∪ A, z) |] ==>
a ∈ A"
apply (rule def_coinduct, assumption+, blast+)
done
lemma gfp_mono:
"[| bnd_mono(D,h); D ⊆ E;
!!X. X<=D ==> h(X) ⊆ i(X) |] ==> gfp(D,h) ⊆ gfp(E,i)"
apply (rule gfp_upperbound)
apply (rule gfp_lemma2 [THEN subset_trans], assumption)
apply (blast del: subsetI intro: gfp_subset)
apply (blast del: subsetI intro: subset_trans gfp_subset)
done
end