(* Title: HOL/Datatype_Examples/Derivation_Trees/Gram_Lang.thy
Author: Andrei Popescu, TU Muenchen
Copyright 2012
Language of a grammar.
*)
section {* Language of a Grammar *}
theory Gram_Lang
imports DTree "~~/src/HOL/Library/Infinite_Set"
begin
(* We assume that the sets of terminals, and the left-hand sides of
productions are finite and that the grammar has no unused nonterminals. *)
consts P :: "(N \<times> (T + N) set) set"
axiomatization where
finite_N: "finite (UNIV::N set)"
and finite_in_P: "\<And> n tns. (n,tns) \<in> P \<longrightarrow> finite tns"
and used: "\<And> n. \<exists> tns. (n,tns) \<in> P"
subsection{* Tree Basics: frontier, interior, etc. *}
(* Frontier *)
inductive inFr :: "N set \<Rightarrow> dtree \<Rightarrow> T \<Rightarrow> bool" where
Base: "\<lbrakk>root tr \<in> ns; Inl t \<in> cont tr\<rbrakk> \<Longrightarrow> inFr ns tr t"
|
Ind: "\<lbrakk>root tr \<in> ns; Inr tr1 \<in> cont tr; inFr ns tr1 t\<rbrakk> \<Longrightarrow> inFr ns tr t"
definition "Fr ns tr \<equiv> {t. inFr ns tr t}"
lemma inFr_root_in: "inFr ns tr t \<Longrightarrow> root tr \<in> ns"
by (metis inFr.simps)
lemma inFr_mono:
assumes "inFr ns tr t" and "ns \<subseteq> ns'"
shows "inFr ns' tr t"
using assms apply(induct arbitrary: ns' rule: inFr.induct)
using Base Ind by (metis inFr.simps set_mp)+
lemma inFr_Ind_minus:
assumes "inFr ns1 tr1 t" and "Inr tr1 \<in> cont tr"
shows "inFr (insert (root tr) ns1) tr t"
using assms apply(induct rule: inFr.induct)
apply (metis inFr.simps insert_iff)
by (metis inFr.simps inFr_mono insertI1 subset_insertI)
(* alternative definition *)
inductive inFr2 :: "N set \<Rightarrow> dtree \<Rightarrow> T \<Rightarrow> bool" where
Base: "\<lbrakk>root tr \<in> ns; Inl t \<in> cont tr\<rbrakk> \<Longrightarrow> inFr2 ns tr t"
|
Ind: "\<lbrakk>Inr tr1 \<in> cont tr; inFr2 ns1 tr1 t\<rbrakk>
\<Longrightarrow> inFr2 (insert (root tr) ns1) tr t"
lemma inFr2_root_in: "inFr2 ns tr t \<Longrightarrow> root tr \<in> ns"
apply(induct rule: inFr2.induct) by auto
lemma inFr2_mono:
assumes "inFr2 ns tr t" and "ns \<subseteq> ns'"
shows "inFr2 ns' tr t"
using assms apply(induct arbitrary: ns' rule: inFr2.induct)
using Base Ind
apply (metis subsetD) by (metis inFr2.simps insert_absorb insert_subset)
lemma inFr2_Ind:
assumes "inFr2 ns tr1 t" and "root tr \<in> ns" and "Inr tr1 \<in> cont tr"
shows "inFr2 ns tr t"
using assms apply(induct rule: inFr2.induct)
apply (metis inFr2.simps insert_absorb)
by (metis inFr2.simps insert_absorb)
lemma inFr_inFr2:
"inFr = inFr2"
apply (rule ext)+ apply(safe)
apply(erule inFr.induct)
apply (metis (lifting) inFr2.Base)
apply (metis (lifting) inFr2_Ind)
apply(erule inFr2.induct)
apply (metis (lifting) inFr.Base)
apply (metis (lifting) inFr_Ind_minus)
done
lemma not_root_inFr:
assumes "root tr \<notin> ns"
shows "\<not> inFr ns tr t"
by (metis assms inFr_root_in)
lemma not_root_Fr:
assumes "root tr \<notin> ns"
shows "Fr ns tr = {}"
using not_root_inFr[OF assms] unfolding Fr_def by auto
(* Interior *)
inductive inItr :: "N set \<Rightarrow> dtree \<Rightarrow> N \<Rightarrow> bool" where
Base: "root tr \<in> ns \<Longrightarrow> inItr ns tr (root tr)"
|
Ind: "\<lbrakk>root tr \<in> ns; Inr tr1 \<in> cont tr; inItr ns tr1 n\<rbrakk> \<Longrightarrow> inItr ns tr n"
definition "Itr ns tr \<equiv> {n. inItr ns tr n}"
lemma inItr_root_in: "inItr ns tr n \<Longrightarrow> root tr \<in> ns"
by (metis inItr.simps)
lemma inItr_mono:
assumes "inItr ns tr n" and "ns \<subseteq> ns'"
shows "inItr ns' tr n"
using assms apply(induct arbitrary: ns' rule: inItr.induct)
using Base Ind by (metis inItr.simps set_mp)+
(* The subtree relation *)
inductive subtr where
Refl: "root tr \<in> ns \<Longrightarrow> subtr ns tr tr"
|
Step: "\<lbrakk>root tr3 \<in> ns; subtr ns tr1 tr2; Inr tr2 \<in> cont tr3\<rbrakk> \<Longrightarrow> subtr ns tr1 tr3"
lemma subtr_rootL_in:
assumes "subtr ns tr1 tr2"
shows "root tr1 \<in> ns"
using assms apply(induct rule: subtr.induct) by auto
lemma subtr_rootR_in:
assumes "subtr ns tr1 tr2"
shows "root tr2 \<in> ns"
using assms apply(induct rule: subtr.induct) by auto
lemmas subtr_roots_in = subtr_rootL_in subtr_rootR_in
lemma subtr_mono:
assumes "subtr ns tr1 tr2" and "ns \<subseteq> ns'"
shows "subtr ns' tr1 tr2"
using assms apply(induct arbitrary: ns' rule: subtr.induct)
using Refl Step by (metis subtr.simps set_mp)+
lemma subtr_trans_Un:
assumes "subtr ns12 tr1 tr2" and "subtr ns23 tr2 tr3"
shows "subtr (ns12 \<union> ns23) tr1 tr3"
proof-
have "subtr ns23 tr2 tr3 \<Longrightarrow>
(\<forall> ns12 tr1. subtr ns12 tr1 tr2 \<longrightarrow> subtr (ns12 \<union> ns23) tr1 tr3)"
apply(induct rule: subtr.induct, safe)
apply (metis subtr_mono sup_commute sup_ge2)
by (metis (lifting) Step UnI2)
thus ?thesis using assms by auto
qed
lemma subtr_trans:
assumes "subtr ns tr1 tr2" and "subtr ns tr2 tr3"
shows "subtr ns tr1 tr3"
using subtr_trans_Un[OF assms] by simp
lemma subtr_StepL:
assumes r: "root tr1 \<in> ns" and tr12: "Inr tr1 \<in> cont tr2" and s: "subtr ns tr2 tr3"
shows "subtr ns tr1 tr3"
apply(rule subtr_trans[OF _ s])
apply(rule Step[of tr2 ns tr1 tr1])
apply(rule subtr_rootL_in[OF s])
apply(rule Refl[OF r])
apply(rule tr12)
done
(* alternative definition: *)
inductive subtr2 where
Refl: "root tr \<in> ns \<Longrightarrow> subtr2 ns tr tr"
|
Step: "\<lbrakk>root tr1 \<in> ns; Inr tr1 \<in> cont tr2; subtr2 ns tr2 tr3\<rbrakk> \<Longrightarrow> subtr2 ns tr1 tr3"
lemma subtr2_rootL_in:
assumes "subtr2 ns tr1 tr2"
shows "root tr1 \<in> ns"
using assms apply(induct rule: subtr2.induct) by auto
lemma subtr2_rootR_in:
assumes "subtr2 ns tr1 tr2"
shows "root tr2 \<in> ns"
using assms apply(induct rule: subtr2.induct) by auto
lemmas subtr2_roots_in = subtr2_rootL_in subtr2_rootR_in
lemma subtr2_mono:
assumes "subtr2 ns tr1 tr2" and "ns \<subseteq> ns'"
shows "subtr2 ns' tr1 tr2"
using assms apply(induct arbitrary: ns' rule: subtr2.induct)
using Refl Step by (metis subtr2.simps set_mp)+
lemma subtr2_trans_Un:
assumes "subtr2 ns12 tr1 tr2" and "subtr2 ns23 tr2 tr3"
shows "subtr2 (ns12 \<union> ns23) tr1 tr3"
proof-
have "subtr2 ns12 tr1 tr2 \<Longrightarrow>
(\<forall> ns23 tr3. subtr2 ns23 tr2 tr3 \<longrightarrow> subtr2 (ns12 \<union> ns23) tr1 tr3)"
apply(induct rule: subtr2.induct, safe)
apply (metis subtr2_mono sup_commute sup_ge2)
by (metis Un_iff subtr2.simps)
thus ?thesis using assms by auto
qed
lemma subtr2_trans:
assumes "subtr2 ns tr1 tr2" and "subtr2 ns tr2 tr3"
shows "subtr2 ns tr1 tr3"
using subtr2_trans_Un[OF assms] by simp
lemma subtr2_StepR:
assumes r: "root tr3 \<in> ns" and tr23: "Inr tr2 \<in> cont tr3" and s: "subtr2 ns tr1 tr2"
shows "subtr2 ns tr1 tr3"
apply(rule subtr2_trans[OF s])
apply(rule Step[of _ _ tr3])
apply(rule subtr2_rootR_in[OF s])
apply(rule tr23)
apply(rule Refl[OF r])
done
lemma subtr_subtr2:
"subtr = subtr2"
apply (rule ext)+ apply(safe)
apply(erule subtr.induct)
apply (metis (lifting) subtr2.Refl)
apply (metis (lifting) subtr2_StepR)
apply(erule subtr2.induct)
apply (metis (lifting) subtr.Refl)
apply (metis (lifting) subtr_StepL)
done
lemma subtr_inductL[consumes 1, case_names Refl Step]:
assumes s: "subtr ns tr1 tr2" and Refl: "\<And>ns tr. \<phi> ns tr tr"
and Step:
"\<And>ns tr1 tr2 tr3.
\<lbrakk>root tr1 \<in> ns; Inr tr1 \<in> cont tr2; subtr ns tr2 tr3; \<phi> ns tr2 tr3\<rbrakk> \<Longrightarrow> \<phi> ns tr1 tr3"
shows "\<phi> ns tr1 tr2"
using s unfolding subtr_subtr2 apply(rule subtr2.induct)
using Refl Step unfolding subtr_subtr2 by auto
lemma subtr_UNIV_inductL[consumes 1, case_names Refl Step]:
assumes s: "subtr UNIV tr1 tr2" and Refl: "\<And>tr. \<phi> tr tr"
and Step:
"\<And>tr1 tr2 tr3.
\<lbrakk>Inr tr1 \<in> cont tr2; subtr UNIV tr2 tr3; \<phi> tr2 tr3\<rbrakk> \<Longrightarrow> \<phi> tr1 tr3"
shows "\<phi> tr1 tr2"
using s apply(induct rule: subtr_inductL)
apply(rule Refl) using Step subtr_mono by (metis subset_UNIV)
(* Subtree versus frontier: *)
lemma subtr_inFr:
assumes "inFr ns tr t" and "subtr ns tr tr1"
shows "inFr ns tr1 t"
proof-
have "subtr ns tr tr1 \<Longrightarrow> (\<forall> t. inFr ns tr t \<longrightarrow> inFr ns tr1 t)"
apply(induct rule: subtr.induct, safe) by (metis inFr.Ind)
thus ?thesis using assms by auto
qed
corollary Fr_subtr:
"Fr ns tr = \<Union>{Fr ns tr' | tr'. subtr ns tr' tr}"
unfolding Fr_def proof safe
fix t assume t: "inFr ns tr t" hence "root tr \<in> ns" by (rule inFr_root_in)
thus "t \<in> \<Union>{{t. inFr ns tr' t} |tr'. subtr ns tr' tr}"
apply(intro UnionI[of "{t. inFr ns tr t}" _ t]) using t subtr.Refl by auto
qed(metis subtr_inFr)
lemma inFr_subtr:
assumes "inFr ns tr t"
shows "\<exists> tr'. subtr ns tr' tr \<and> Inl t \<in> cont tr'"
using assms apply(induct rule: inFr.induct) apply safe
apply (metis subtr.Refl)
by (metis (lifting) subtr.Step)
corollary Fr_subtr_cont:
"Fr ns tr = \<Union>{Inl -` cont tr' | tr'. subtr ns tr' tr}"
unfolding Fr_def
apply safe
apply (frule inFr_subtr)
apply auto
by (metis inFr.Base subtr_inFr subtr_rootL_in)
(* Subtree versus interior: *)
lemma subtr_inItr:
assumes "inItr ns tr n" and "subtr ns tr tr1"
shows "inItr ns tr1 n"
proof-
have "subtr ns tr tr1 \<Longrightarrow> (\<forall> t. inItr ns tr n \<longrightarrow> inItr ns tr1 n)"
apply(induct rule: subtr.induct, safe) by (metis inItr.Ind)
thus ?thesis using assms by auto
qed
corollary Itr_subtr:
"Itr ns tr = \<Union>{Itr ns tr' | tr'. subtr ns tr' tr}"
unfolding Itr_def apply safe
apply (metis (lifting, mono_tags) UnionI inItr_root_in mem_Collect_eq subtr.Refl)
by (metis subtr_inItr)
lemma inItr_subtr:
assumes "inItr ns tr n"
shows "\<exists> tr'. subtr ns tr' tr \<and> root tr' = n"
using assms apply(induct rule: inItr.induct) apply safe
apply (metis subtr.Refl)
by (metis (lifting) subtr.Step)
corollary Itr_subtr_cont:
"Itr ns tr = {root tr' | tr'. subtr ns tr' tr}"
unfolding Itr_def apply safe
apply (metis (lifting, mono_tags) inItr_subtr)
by (metis inItr.Base subtr_inItr subtr_rootL_in)
subsection{* The Immediate Subtree Function *}
(* production of: *)
abbreviation "prodOf tr \<equiv> (id \<oplus> root) ` (cont tr)"
(* subtree of: *)
definition "subtrOf tr n \<equiv> SOME tr'. Inr tr' \<in> cont tr \<and> root tr' = n"
lemma subtrOf:
assumes n: "Inr n \<in> prodOf tr"
shows "Inr (subtrOf tr n) \<in> cont tr \<and> root (subtrOf tr n) = n"
proof-
obtain tr' where "Inr tr' \<in> cont tr \<and> root tr' = n"
using n unfolding image_def by (metis (lifting) Inr_oplus_elim assms)
thus ?thesis unfolding subtrOf_def by(rule someI)
qed
lemmas Inr_subtrOf = subtrOf[THEN conjunct1]
lemmas root_subtrOf[simp] = subtrOf[THEN conjunct2]
lemma Inl_prodOf: "Inl -` (prodOf tr) = Inl -` (cont tr)"
proof safe
fix t ttr assume "Inl t = (id \<oplus> root) ttr" and "ttr \<in> cont tr"
thus "t \<in> Inl -` cont tr" by(cases ttr, auto)
next
fix t assume "Inl t \<in> cont tr" thus "t \<in> Inl -` prodOf tr"
by (metis (lifting) id_def image_iff map_sum.simps(1) vimageI2)
qed
lemma root_prodOf:
assumes "Inr tr' \<in> cont tr"
shows "Inr (root tr') \<in> prodOf tr"
by (metis (lifting) assms image_iff map_sum.simps(2))
subsection{* Well-Formed Derivation Trees *}
hide_const wf
coinductive wf where
dtree: "\<lbrakk>(root tr, (id \<oplus> root) ` (cont tr)) \<in> P; inj_on root (Inr -` cont tr);
\<And> tr'. tr' \<in> Inr -` (cont tr) \<Longrightarrow> wf tr'\<rbrakk> \<Longrightarrow> wf tr"
(* destruction rules: *)
lemma wf_P:
assumes "wf tr"
shows "(root tr, (id \<oplus> root) ` (cont tr)) \<in> P"
using assms wf.simps[of tr] by auto
lemma wf_inj_on:
assumes "wf tr"
shows "inj_on root (Inr -` cont tr)"
using assms wf.simps[of tr] by auto
lemma wf_inj[simp]:
assumes "wf tr" and "Inr tr1 \<in> cont tr" and "Inr tr2 \<in> cont tr"
shows "root tr1 = root tr2 \<longleftrightarrow> tr1 = tr2"
using assms wf_inj_on unfolding inj_on_def by auto
lemma wf_cont:
assumes "wf tr" and "Inr tr' \<in> cont tr"
shows "wf tr'"
using assms wf.simps[of tr] by auto
(* coinduction:*)
lemma wf_coind[elim, consumes 1, case_names Hyp]:
assumes phi: "\<phi> tr"
and Hyp:
"\<And> tr. \<phi> tr \<Longrightarrow>
(root tr, image (id \<oplus> root) (cont tr)) \<in> P \<and>
inj_on root (Inr -` cont tr) \<and>
(\<forall> tr' \<in> Inr -` (cont tr). \<phi> tr' \<or> wf tr')"
shows "wf tr"
apply(rule wf.coinduct[of \<phi> tr, OF phi])
using Hyp by blast
lemma wf_raw_coind[elim, consumes 1, case_names Hyp]:
assumes phi: "\<phi> tr"
and Hyp:
"\<And> tr. \<phi> tr \<Longrightarrow>
(root tr, image (id \<oplus> root) (cont tr)) \<in> P \<and>
inj_on root (Inr -` cont tr) \<and>
(\<forall> tr' \<in> Inr -` (cont tr). \<phi> tr')"
shows "wf tr"
using phi apply(induct rule: wf_coind)
using Hyp by (metis (mono_tags))
lemma wf_subtr_inj_on:
assumes d: "wf tr1" and s: "subtr ns tr tr1"
shows "inj_on root (Inr -` cont tr)"
using s d apply(induct rule: subtr.induct)
apply (metis (lifting) wf_inj_on) by (metis wf_cont)
lemma wf_subtr_P:
assumes d: "wf tr1" and s: "subtr ns tr tr1"
shows "(root tr, (id \<oplus> root) ` cont tr) \<in> P"
using s d apply(induct rule: subtr.induct)
apply (metis (lifting) wf_P) by (metis wf_cont)
lemma subtrOf_root[simp]:
assumes tr: "wf tr" and cont: "Inr tr' \<in> cont tr"
shows "subtrOf tr (root tr') = tr'"
proof-
have 0: "Inr (subtrOf tr (root tr')) \<in> cont tr" using Inr_subtrOf
by (metis (lifting) cont root_prodOf)
have "root (subtrOf tr (root tr')) = root tr'"
using root_subtrOf by (metis (lifting) cont root_prodOf)
thus ?thesis unfolding wf_inj[OF tr 0 cont] .
qed
lemma surj_subtrOf:
assumes "wf tr" and 0: "Inr tr' \<in> cont tr"
shows "\<exists> n. Inr n \<in> prodOf tr \<and> subtrOf tr n = tr'"
apply(rule exI[of _ "root tr'"])
using root_prodOf[OF 0] subtrOf_root[OF assms] by simp
lemma wf_subtr:
assumes "wf tr1" and "subtr ns tr tr1"
shows "wf tr"
proof-
have "(\<exists> ns tr1. wf tr1 \<and> subtr ns tr tr1) \<Longrightarrow> wf tr"
proof (induct rule: wf_raw_coind)
case (Hyp tr)
then obtain ns tr1 where tr1: "wf tr1" and tr_tr1: "subtr ns tr tr1" by auto
show ?case proof safe
show "(root tr, (id \<oplus> root) ` cont tr) \<in> P" using wf_subtr_P[OF tr1 tr_tr1] .
next
show "inj_on root (Inr -` cont tr)" using wf_subtr_inj_on[OF tr1 tr_tr1] .
next
fix tr' assume tr': "Inr tr' \<in> cont tr"
have tr_tr1: "subtr (ns \<union> {root tr'}) tr tr1" using subtr_mono[OF tr_tr1] by auto
have "subtr (ns \<union> {root tr'}) tr' tr1" using subtr_StepL[OF _ tr' tr_tr1] by auto
thus "\<exists>ns' tr1. wf tr1 \<and> subtr ns' tr' tr1" using tr1 by blast
qed
qed
thus ?thesis using assms by auto
qed
subsection{* Default Trees *}
(* Pick a left-hand side of a production for each nonterminal *)
definition S where "S n \<equiv> SOME tns. (n,tns) \<in> P"
lemma S_P: "(n, S n) \<in> P"
using used unfolding S_def by(rule someI_ex)
lemma finite_S: "finite (S n)"
using S_P finite_in_P by auto
(* The default tree of a nonterminal *)
definition deftr :: "N \<Rightarrow> dtree" where
"deftr \<equiv> unfold id S"
lemma deftr_simps[simp]:
"root (deftr n) = n"
"cont (deftr n) = image (id \<oplus> deftr) (S n)"
using unfold(1)[of id S n] unfold(2)[of S n id, OF finite_S]
unfolding deftr_def by simp_all
lemmas root_deftr = deftr_simps(1)
lemmas cont_deftr = deftr_simps(2)
lemma root_o_deftr[simp]: "root o deftr = id"
by (rule ext, auto)
lemma wf_deftr: "wf (deftr n)"
proof-
{fix tr assume "\<exists> n. tr = deftr n" hence "wf tr"
apply(induct rule: wf_raw_coind) apply safe
unfolding deftr_simps image_comp map_sum.comp id_comp
root_o_deftr map_sum.id image_id id_apply apply(rule S_P)
unfolding inj_on_def by auto
}
thus ?thesis by auto
qed
subsection{* Hereditary Substitution *}
(* Auxiliary concept: The root-ommiting frontier: *)
definition "inFrr ns tr t \<equiv> \<exists> tr'. Inr tr' \<in> cont tr \<and> inFr ns tr' t"
definition "Frr ns tr \<equiv> {t. \<exists> tr'. Inr tr' \<in> cont tr \<and> t \<in> Fr ns tr'}"
context
fixes tr0 :: dtree
begin
definition "hsubst_r tr \<equiv> root tr"
definition "hsubst_c tr \<equiv> if root tr = root tr0 then cont tr0 else cont tr"
(* Hereditary substitution: *)
definition hsubst :: "dtree \<Rightarrow> dtree" where
"hsubst \<equiv> unfold hsubst_r hsubst_c"
lemma finite_hsubst_c: "finite (hsubst_c n)"
unfolding hsubst_c_def by (metis (full_types) finite_cont)
lemma root_hsubst[simp]: "root (hsubst tr) = root tr"
using unfold(1)[of hsubst_r hsubst_c tr] unfolding hsubst_def hsubst_r_def by simp
lemma root_o_subst[simp]: "root o hsubst = root"
unfolding comp_def root_hsubst ..
lemma cont_hsubst_eq[simp]:
assumes "root tr = root tr0"
shows "cont (hsubst tr) = (id \<oplus> hsubst) ` (cont tr0)"
apply(subst id_comp[symmetric, of id]) unfolding id_comp
using unfold(2)[of hsubst_c tr hsubst_r, OF finite_hsubst_c]
unfolding hsubst_def hsubst_c_def using assms by simp
lemma hsubst_eq:
assumes "root tr = root tr0"
shows "hsubst tr = hsubst tr0"
apply(rule dtree_cong) using assms cont_hsubst_eq by auto
lemma cont_hsubst_neq[simp]:
assumes "root tr \<noteq> root tr0"
shows "cont (hsubst tr) = (id \<oplus> hsubst) ` (cont tr)"
apply(subst id_comp[symmetric, of id]) unfolding id_comp
using unfold(2)[of hsubst_c tr hsubst_r, OF finite_hsubst_c]
unfolding hsubst_def hsubst_c_def using assms by simp
lemma Inl_cont_hsubst_eq[simp]:
assumes "root tr = root tr0"
shows "Inl -` cont (hsubst tr) = Inl -` (cont tr0)"
unfolding cont_hsubst_eq[OF assms] by simp
lemma Inr_cont_hsubst_eq[simp]:
assumes "root tr = root tr0"
shows "Inr -` cont (hsubst tr) = hsubst ` Inr -` cont tr0"
unfolding cont_hsubst_eq[OF assms] by simp
lemma Inl_cont_hsubst_neq[simp]:
assumes "root tr \<noteq> root tr0"
shows "Inl -` cont (hsubst tr) = Inl -` (cont tr)"
unfolding cont_hsubst_neq[OF assms] by simp
lemma Inr_cont_hsubst_neq[simp]:
assumes "root tr \<noteq> root tr0"
shows "Inr -` cont (hsubst tr) = hsubst ` Inr -` cont tr"
unfolding cont_hsubst_neq[OF assms] by simp
lemma wf_hsubst:
assumes tr0: "wf tr0" and tr: "wf tr"
shows "wf (hsubst tr)"
proof-
{fix tr1 have "(\<exists> tr. wf tr \<and> tr1 = hsubst tr) \<Longrightarrow> wf tr1"
proof (induct rule: wf_raw_coind)
case (Hyp tr1) then obtain tr
where dtr: "wf tr" and tr1: "tr1 = hsubst tr" by auto
show ?case unfolding tr1 proof safe
show "(root (hsubst tr), prodOf (hsubst tr)) \<in> P"
unfolding tr1 apply(cases "root tr = root tr0")
using wf_P[OF dtr] wf_P[OF tr0]
by (auto simp add: image_comp map_sum.comp)
show "inj_on root (Inr -` cont (hsubst tr))"
apply(cases "root tr = root tr0") using wf_inj_on[OF dtr] wf_inj_on[OF tr0]
unfolding inj_on_def by (auto, blast)
fix tr' assume "Inr tr' \<in> cont (hsubst tr)"
thus "\<exists>tra. wf tra \<and> tr' = hsubst tra"
apply(cases "root tr = root tr0", simp_all)
apply (metis wf_cont tr0)
by (metis dtr wf_cont)
qed
qed
}
thus ?thesis using assms by blast
qed
lemma Frr: "Frr ns tr = {t. inFrr ns tr t}"
unfolding inFrr_def Frr_def Fr_def by auto
lemma inFr_hsubst_imp:
assumes "inFr ns (hsubst tr) t"
shows "t \<in> Inl -` (cont tr0) \<or> inFrr (ns - {root tr0}) tr0 t \<or>
inFr (ns - {root tr0}) tr t"
proof-
{fix tr1
have "inFr ns tr1 t \<Longrightarrow>
(\<And> tr. tr1 = hsubst tr \<Longrightarrow> (t \<in> Inl -` (cont tr0) \<or> inFrr (ns - {root tr0}) tr0 t \<or>
inFr (ns - {root tr0}) tr t))"
proof(induct rule: inFr.induct)
case (Base tr1 ns t tr)
hence rtr: "root tr1 \<in> ns" and t_tr1: "Inl t \<in> cont tr1" and tr1: "tr1 = hsubst tr"
by auto
show ?case
proof(cases "root tr1 = root tr0")
case True
hence "t \<in> Inl -` (cont tr0)" using t_tr1 unfolding tr1 by auto
thus ?thesis by simp
next
case False
hence "inFr (ns - {root tr0}) tr t" using t_tr1 unfolding tr1 apply simp
by (metis Base.prems Diff_iff root_hsubst inFr.Base rtr singletonE)
thus ?thesis by simp
qed
next
case (Ind tr1 ns tr1' t) note IH = Ind(4)
have rtr1: "root tr1 \<in> ns" and tr1'_tr1: "Inr tr1' \<in> cont tr1"
and t_tr1': "inFr ns tr1' t" and tr1: "tr1 = hsubst tr" using Ind by auto
have rtr1: "root tr1 = root tr" unfolding tr1 by simp
show ?case
proof(cases "root tr1 = root tr0")
case True
then obtain tr' where tr'_tr0: "Inr tr' \<in> cont tr0" and tr1': "tr1' = hsubst tr'"
using tr1'_tr1 unfolding tr1 by auto
show ?thesis using IH[OF tr1'] proof (elim disjE)
assume "inFr (ns - {root tr0}) tr' t"
thus ?thesis using tr'_tr0 unfolding inFrr_def by auto
qed auto
next
case False
then obtain tr' where tr'_tr: "Inr tr' \<in> cont tr" and tr1': "tr1' = hsubst tr'"
using tr1'_tr1 unfolding tr1 by auto
show ?thesis using IH[OF tr1'] proof (elim disjE)
assume "inFr (ns - {root tr0}) tr' t"
thus ?thesis using tr'_tr unfolding inFrr_def
by (metis Diff_iff False Ind(1) empty_iff inFr2_Ind inFr_inFr2 insert_iff rtr1)
qed auto
qed
qed
}
thus ?thesis using assms by auto
qed
lemma inFr_hsubst_notin:
assumes "inFr ns tr t" and "root tr0 \<notin> ns"
shows "inFr ns (hsubst tr) t"
using assms apply(induct rule: inFr.induct)
apply (metis Inl_cont_hsubst_neq inFr2.Base inFr_inFr2 root_hsubst vimageD vimageI2)
by (metis (lifting) Inr_cont_hsubst_neq inFr.Ind rev_image_eqI root_hsubst vimageD vimageI2)
lemma inFr_hsubst_minus:
assumes "inFr (ns - {root tr0}) tr t"
shows "inFr ns (hsubst tr) t"
proof-
have 1: "inFr (ns - {root tr0}) (hsubst tr) t"
using inFr_hsubst_notin[OF assms] by simp
show ?thesis using inFr_mono[OF 1] by auto
qed
lemma inFr_self_hsubst:
assumes "root tr0 \<in> ns"
shows
"inFr ns (hsubst tr0) t \<longleftrightarrow>
t \<in> Inl -` (cont tr0) \<or> inFrr (ns - {root tr0}) tr0 t"
(is "?A \<longleftrightarrow> ?B \<or> ?C")
apply(intro iffI)
apply (metis inFr_hsubst_imp Diff_iff inFr_root_in insertI1) proof(elim disjE)
assume ?B thus ?A apply(intro inFr.Base) using assms by auto
next
assume ?C then obtain tr where
tr_tr0: "Inr tr \<in> cont tr0" and t_tr: "inFr (ns - {root tr0}) tr t"
unfolding inFrr_def by auto
def tr1 \<equiv> "hsubst tr"
have 1: "inFr ns tr1 t" using t_tr unfolding tr1_def using inFr_hsubst_minus by auto
have "Inr tr1 \<in> cont (hsubst tr0)" unfolding tr1_def using tr_tr0 by auto
thus ?A using 1 inFr.Ind assms by (metis root_hsubst)
qed
lemma Fr_self_hsubst:
assumes "root tr0 \<in> ns"
shows "Fr ns (hsubst tr0) = Inl -` (cont tr0) \<union> Frr (ns - {root tr0}) tr0"
using inFr_self_hsubst[OF assms] unfolding Frr Fr_def by auto
end (* context *)
subsection{* Regular Trees *}
definition "reg f tr \<equiv> \<forall> tr'. subtr UNIV tr' tr \<longrightarrow> tr' = f (root tr')"
definition "regular tr \<equiv> \<exists> f. reg f tr"
lemma reg_def2: "reg f tr \<longleftrightarrow> (\<forall> ns tr'. subtr ns tr' tr \<longrightarrow> tr' = f (root tr'))"
unfolding reg_def using subtr_mono by (metis subset_UNIV)
lemma regular_def2: "regular tr \<longleftrightarrow> (\<exists> f. reg f tr \<and> (\<forall> n. root (f n) = n))"
unfolding regular_def proof safe
fix f assume f: "reg f tr"
def g \<equiv> "\<lambda> n. if inItr UNIV tr n then f n else deftr n"
show "\<exists>g. reg g tr \<and> (\<forall>n. root (g n) = n)"
apply(rule exI[of _ g])
using f deftr_simps(1) unfolding g_def reg_def apply safe
apply (metis (lifting) inItr.Base subtr_inItr subtr_rootL_in)
by (metis (full_types) inItr_subtr)
qed auto
lemma reg_root:
assumes "reg f tr"
shows "f (root tr) = tr"
using assms unfolding reg_def
by (metis (lifting) iso_tuple_UNIV_I subtr.Refl)
lemma reg_Inr_cont:
assumes "reg f tr" and "Inr tr' \<in> cont tr"
shows "reg f tr'"
by (metis (lifting) assms iso_tuple_UNIV_I reg_def subtr.Step)
lemma reg_subtr:
assumes "reg f tr" and "subtr ns tr' tr"
shows "reg f tr'"
using assms unfolding reg_def using subtr_trans[of UNIV tr] UNIV_I
by (metis UNIV_eq_I UnCI Un_upper1 iso_tuple_UNIV_I subtr_mono subtr_trans)
lemma regular_subtr:
assumes r: "regular tr" and s: "subtr ns tr' tr"
shows "regular tr'"
using r reg_subtr[OF _ s] unfolding regular_def by auto
lemma subtr_deftr:
assumes "subtr ns tr' (deftr n)"
shows "tr' = deftr (root tr')"
proof-
{fix tr have "subtr ns tr' tr \<Longrightarrow> (\<forall> n. tr = deftr n \<longrightarrow> tr' = deftr (root tr'))"
apply (induct rule: subtr.induct)
proof(metis (lifting) deftr_simps(1), safe)
fix tr3 ns tr1 tr2 n
assume 1: "root (deftr n) \<in> ns" and 2: "subtr ns tr1 tr2"
and IH: "\<forall>n. tr2 = deftr n \<longrightarrow> tr1 = deftr (root tr1)"
and 3: "Inr tr2 \<in> cont (deftr n)"
have "tr2 \<in> deftr ` UNIV"
using 3 unfolding deftr_simps image_def
by (metis (lifting, full_types) 3 CollectI Inr_oplus_iff cont_deftr
iso_tuple_UNIV_I)
then obtain n where "tr2 = deftr n" by auto
thus "tr1 = deftr (root tr1)" using IH by auto
qed
}
thus ?thesis using assms by auto
qed
lemma reg_deftr: "reg deftr (deftr n)"
unfolding reg_def using subtr_deftr by auto
lemma wf_subtrOf_Union:
assumes "wf tr"
shows "\<Union>{K tr' |tr'. Inr tr' \<in> cont tr} =
\<Union>{K (subtrOf tr n) |n. Inr n \<in> prodOf tr}"
unfolding Union_eq Bex_def mem_Collect_eq proof safe
fix x xa tr'
assume x: "x \<in> K tr'" and tr'_tr: "Inr tr' \<in> cont tr"
show "\<exists>X. (\<exists>n. X = K (subtrOf tr n) \<and> Inr n \<in> prodOf tr) \<and> x \<in> X"
apply(rule exI[of _ "K (subtrOf tr (root tr'))"]) apply(intro conjI)
apply(rule exI[of _ "root tr'"]) apply (metis (lifting) root_prodOf tr'_tr)
by (metis (lifting) assms subtrOf_root tr'_tr x)
next
fix x X n ttr
assume x: "x \<in> K (subtrOf tr n)" and n: "Inr n = (id \<oplus> root) ttr" and ttr: "ttr \<in> cont tr"
show "\<exists>X. (\<exists>tr'. X = K tr' \<and> Inr tr' \<in> cont tr) \<and> x \<in> X"
apply(rule exI[of _ "K (subtrOf tr n)"]) apply(intro conjI)
apply(rule exI[of _ "subtrOf tr n"]) apply (metis imageI n subtrOf ttr)
using x .
qed
subsection {* Paths in a Regular Tree *}
inductive path :: "(N \<Rightarrow> dtree) \<Rightarrow> N list \<Rightarrow> bool" for f where
Base: "path f [n]"
|
Ind: "\<lbrakk>path f (n1 # nl); Inr (f n1) \<in> cont (f n)\<rbrakk>
\<Longrightarrow> path f (n # n1 # nl)"
lemma path_NE:
assumes "path f nl"
shows "nl \<noteq> Nil"
using assms apply(induct rule: path.induct) by auto
lemma path_post:
assumes f: "path f (n # nl)" and nl: "nl \<noteq> []"
shows "path f nl"
proof-
obtain n1 nl1 where nl: "nl = n1 # nl1" using nl by (cases nl, auto)
show ?thesis using assms unfolding nl using path.simps by (metis (lifting) list.inject)
qed
lemma path_post_concat:
assumes "path f (nl1 @ nl2)" and "nl2 \<noteq> Nil"
shows "path f nl2"
using assms apply (induct nl1)
apply (metis append_Nil) by (metis Nil_is_append_conv append_Cons path_post)
lemma path_concat:
assumes "path f nl1" and "path f ((last nl1) # nl2)"
shows "path f (nl1 @ nl2)"
using assms apply(induct rule: path.induct) apply simp
by (metis append_Cons last.simps list.simps(3) path.Ind)
lemma path_distinct:
assumes "path f nl"
shows "\<exists> nl'. path f nl' \<and> hd nl' = hd nl \<and> last nl' = last nl \<and>
set nl' \<subseteq> set nl \<and> distinct nl'"
using assms proof(induct rule: length_induct)
case (1 nl) hence p_nl: "path f nl" by simp
then obtain n nl1 where nl: "nl = n # nl1" by (metis list.exhaust path_NE)
show ?case
proof(cases nl1)
case Nil
show ?thesis apply(rule exI[of _ nl]) using path.Base unfolding nl Nil by simp
next
case (Cons n1 nl2)
hence p1: "path f nl1" by (metis list.simps(3) nl p_nl path_post)
show ?thesis
proof(cases "n \<in> set nl1")
case False
obtain nl1' where p1': "path f nl1'" and hd_nl1': "hd nl1' = hd nl1" and
l_nl1': "last nl1' = last nl1" and d_nl1': "distinct nl1'"
and s_nl1': "set nl1' \<subseteq> set nl1"
using 1(1)[THEN allE[of _ nl1]] p1 unfolding nl by auto
obtain nl2' where nl1': "nl1' = n1 # nl2'" using path_NE[OF p1'] hd_nl1'
unfolding Cons by(cases nl1', auto)
show ?thesis apply(intro exI[of _ "n # nl1'"]) unfolding nl proof safe
show "path f (n # nl1')" unfolding nl1'
apply(rule path.Ind, metis nl1' p1')
by (metis (lifting) Cons list.inject nl p1 p_nl path.simps path_NE)
qed(insert l_nl1' Cons nl1' s_nl1' d_nl1' False, auto)
next
case True
then obtain nl11 nl12 where nl1: "nl1 = nl11 @ n # nl12"
by (metis split_list)
have p12: "path f (n # nl12)"
apply(rule path_post_concat[of _ "n # nl11"]) using p_nl[unfolded nl nl1] by auto
obtain nl12' where p1': "path f nl12'" and hd_nl12': "hd nl12' = n" and
l_nl12': "last nl12' = last (n # nl12)" and d_nl12': "distinct nl12'"
and s_nl12': "set nl12' \<subseteq> {n} \<union> set nl12"
using 1(1)[THEN allE[of _ "n # nl12"]] p12 unfolding nl nl1 by auto
thus ?thesis apply(intro exI[of _ nl12']) unfolding nl nl1 by auto
qed
qed
qed
lemma path_subtr:
assumes f: "\<And> n. root (f n) = n"
and p: "path f nl"
shows "subtr (set nl) (f (last nl)) (f (hd nl))"
using p proof (induct rule: path.induct)
case (Ind n1 nl n) let ?ns1 = "insert n1 (set nl)"
have "path f (n1 # nl)"
and "subtr ?ns1 (f (last (n1 # nl))) (f n1)"
and fn1: "Inr (f n1) \<in> cont (f n)" using Ind by simp_all
hence fn1_flast: "subtr (insert n ?ns1) (f (last (n1 # nl))) (f n1)"
by (metis subset_insertI subtr_mono)
have 1: "last (n # n1 # nl) = last (n1 # nl)" by auto
have "subtr (insert n ?ns1) (f (last (n1 # nl))) (f n)"
using f subtr.Step[OF _ fn1_flast fn1] by auto
thus ?case unfolding 1 by simp
qed (metis f list.sel(1) last_ConsL last_in_set not_Cons_self2 subtr.Refl)
lemma reg_subtr_path_aux:
assumes f: "reg f tr" and n: "subtr ns tr1 tr"
shows "\<exists> nl. path f nl \<and> f (hd nl) = tr \<and> f (last nl) = tr1 \<and> set nl \<subseteq> ns"
using n f proof(induct rule: subtr.induct)
case (Refl tr ns)
thus ?case
apply(intro exI[of _ "[root tr]"]) apply simp by (metis (lifting) path.Base reg_root)
next
case (Step tr ns tr2 tr1)
hence rtr: "root tr \<in> ns" and tr1_tr: "Inr tr1 \<in> cont tr"
and tr2_tr1: "subtr ns tr2 tr1" and tr: "reg f tr" by auto
have tr1: "reg f tr1" using reg_subtr[OF tr] rtr tr1_tr
by (metis (lifting) Step.prems iso_tuple_UNIV_I reg_def subtr.Step)
obtain nl where nl: "path f nl" and f_nl: "f (hd nl) = tr1"
and last_nl: "f (last nl) = tr2" and set: "set nl \<subseteq> ns" using Step(3)[OF tr1] by auto
have 0: "path f (root tr # nl)" apply (subst path.simps)
using f_nl nl reg_root tr tr1_tr by (metis list.sel(1) neq_Nil_conv)
show ?case apply(rule exI[of _ "(root tr) # nl"])
using 0 reg_root tr last_nl nl path_NE rtr set by auto
qed
lemma reg_subtr_path:
assumes f: "reg f tr" and n: "subtr ns tr1 tr"
shows "\<exists> nl. distinct nl \<and> path f nl \<and> f (hd nl) = tr \<and> f (last nl) = tr1 \<and> set nl \<subseteq> ns"
using reg_subtr_path_aux[OF assms] path_distinct[of f]
by (metis (lifting) order_trans)
lemma subtr_iff_path:
assumes r: "reg f tr" and f: "\<And> n. root (f n) = n"
shows "subtr ns tr1 tr \<longleftrightarrow>
(\<exists> nl. distinct nl \<and> path f nl \<and> f (hd nl) = tr \<and> f (last nl) = tr1 \<and> set nl \<subseteq> ns)"
proof safe
fix nl assume p: "path f nl" and nl: "set nl \<subseteq> ns"
have "subtr (set nl) (f (last nl)) (f (hd nl))"
apply(rule path_subtr) using p f by simp_all
thus "subtr ns (f (last nl)) (f (hd nl))"
using subtr_mono nl by auto
qed(insert reg_subtr_path[OF r], auto)
lemma inFr_iff_path:
assumes r: "reg f tr" and f: "\<And> n. root (f n) = n"
shows
"inFr ns tr t \<longleftrightarrow>
(\<exists> nl tr1. distinct nl \<and> path f nl \<and> f (hd nl) = tr \<and> f (last nl) = tr1 \<and>
set nl \<subseteq> ns \<and> Inl t \<in> cont tr1)"
apply safe
apply (metis (no_types) inFr_subtr r reg_subtr_path)
by (metis f inFr.Base path_subtr subtr_inFr subtr_mono subtr_rootL_in)
subsection{* The Regular Cut of a Tree *}
context fixes tr0 :: dtree
begin
(* Picking a subtree of a certain root: *)
definition "pick n \<equiv> SOME tr. subtr UNIV tr tr0 \<and> root tr = n"
lemma pick:
assumes "inItr UNIV tr0 n"
shows "subtr UNIV (pick n) tr0 \<and> root (pick n) = n"
proof-
have "\<exists> tr. subtr UNIV tr tr0 \<and> root tr = n"
using assms by (metis (lifting) inItr_subtr)
thus ?thesis unfolding pick_def by(rule someI_ex)
qed
lemmas subtr_pick = pick[THEN conjunct1]
lemmas root_pick = pick[THEN conjunct2]
lemma wf_pick:
assumes tr0: "wf tr0" and n: "inItr UNIV tr0 n"
shows "wf (pick n)"
using wf_subtr[OF tr0 subtr_pick[OF n]] .
definition "H_r n \<equiv> root (pick n)"
definition "H_c n \<equiv> (id \<oplus> root) ` cont (pick n)"
(* The regular tree of a function: *)
definition H :: "N \<Rightarrow> dtree" where
"H \<equiv> unfold H_r H_c"
lemma finite_H_c: "finite (H_c n)"
unfolding H_c_def by (metis finite_cont finite_imageI)
lemma root_H_pick: "root (H n) = root (pick n)"
using unfold(1)[of H_r H_c n] unfolding H_def H_r_def by simp
lemma root_H[simp]:
assumes "inItr UNIV tr0 n"
shows "root (H n) = n"
unfolding root_H_pick root_pick[OF assms] ..
lemma cont_H[simp]:
"cont (H n) = (id \<oplus> (H o root)) ` cont (pick n)"
apply(subst id_comp[symmetric, of id]) unfolding map_sum.comp[symmetric]
unfolding image_comp [symmetric] H_c_def [symmetric]
using unfold(2) [of H_c n H_r, OF finite_H_c]
unfolding H_def ..
lemma Inl_cont_H[simp]:
"Inl -` (cont (H n)) = Inl -` (cont (pick n))"
unfolding cont_H by simp
lemma Inr_cont_H:
"Inr -` (cont (H n)) = (H \<circ> root) ` (Inr -` cont (pick n))"
unfolding cont_H by simp
lemma subtr_H:
assumes n: "inItr UNIV tr0 n" and "subtr UNIV tr1 (H n)"
shows "\<exists> n1. inItr UNIV tr0 n1 \<and> tr1 = H n1"
proof-
{fix tr ns assume "subtr UNIV tr1 tr"
hence "tr = H n \<longrightarrow> (\<exists> n1. inItr UNIV tr0 n1 \<and> tr1 = H n1)"
proof (induct rule: subtr_UNIV_inductL)
case (Step tr2 tr1 tr)
show ?case proof
assume "tr = H n"
then obtain n1 where tr2: "Inr tr2 \<in> cont tr1"
and tr1_tr: "subtr UNIV tr1 tr" and n1: "inItr UNIV tr0 n1" and tr1: "tr1 = H n1"
using Step by auto
obtain tr2' where tr2: "tr2 = H (root tr2')"
and tr2': "Inr tr2' \<in> cont (pick n1)"
using tr2 Inr_cont_H[of n1]
unfolding tr1 image_def comp_def using vimage_eq by auto
have "inItr UNIV tr0 (root tr2')"
using inItr.Base inItr.Ind n1 pick subtr_inItr tr2' by (metis iso_tuple_UNIV_I)
thus "\<exists>n2. inItr UNIV tr0 n2 \<and> tr2 = H n2" using tr2 by blast
qed
qed(insert n, auto)
}
thus ?thesis using assms by auto
qed
lemma root_H_root:
assumes n: "inItr UNIV tr0 n" and t_tr: "t_tr \<in> cont (pick n)"
shows "(id \<oplus> (root \<circ> H \<circ> root)) t_tr = (id \<oplus> root) t_tr"
using assms apply(cases t_tr)
apply (metis (lifting) map_sum.simps(1))
using pick H_def H_r_def unfold(1)
inItr.Base comp_apply subtr_StepL subtr_inItr map_sum.simps(2)
by (metis UNIV_I)
lemma H_P:
assumes tr0: "wf tr0" and n: "inItr UNIV tr0 n"
shows "(n, (id \<oplus> root) ` cont (H n)) \<in> P" (is "?L \<in> P")
proof-
have "?L = (n, (id \<oplus> root) ` cont (pick n))"
unfolding cont_H image_comp map_sum.comp id_comp comp_assoc[symmetric]
unfolding Pair_eq apply(rule conjI[OF refl]) apply(rule image_cong[OF refl])
by (rule root_H_root[OF n])
moreover have "... \<in> P" by (metis (lifting) wf_pick root_pick wf_P n tr0)
ultimately show ?thesis by simp
qed
lemma wf_H:
assumes tr0: "wf tr0" and "inItr UNIV tr0 n"
shows "wf (H n)"
proof-
{fix tr have "\<exists> n. inItr UNIV tr0 n \<and> tr = H n \<Longrightarrow> wf tr"
proof (induct rule: wf_raw_coind)
case (Hyp tr)
then obtain n where n: "inItr UNIV tr0 n" and tr: "tr = H n" by auto
show ?case apply safe
apply (metis (lifting) H_P root_H n tr tr0)
unfolding tr Inr_cont_H unfolding inj_on_def apply clarsimp using root_H
apply (metis UNIV_I inItr.Base n pick subtr2.simps subtr_inItr subtr_subtr2)
by (metis n subtr.Refl subtr_StepL subtr_H tr UNIV_I)
qed
}
thus ?thesis using assms by blast
qed
(* The regular cut of a tree: *)
definition "rcut \<equiv> H (root tr0)"
lemma reg_rcut: "reg H rcut"
unfolding reg_def rcut_def
by (metis inItr.Base root_H subtr_H UNIV_I)
lemma rcut_reg:
assumes "reg H tr0"
shows "rcut = tr0"
using assms unfolding rcut_def reg_def by (metis subtr.Refl UNIV_I)
lemma rcut_eq: "rcut = tr0 \<longleftrightarrow> reg H tr0"
using reg_rcut rcut_reg by metis
lemma regular_rcut: "regular rcut"
using reg_rcut unfolding regular_def by blast
lemma Fr_rcut: "Fr UNIV rcut \<subseteq> Fr UNIV tr0"
proof safe
fix t assume "t \<in> Fr UNIV rcut"
then obtain tr where t: "Inl t \<in> cont tr" and tr: "subtr UNIV tr (H (root tr0))"
using Fr_subtr[of UNIV "H (root tr0)"] unfolding rcut_def
by (metis (full_types) Fr_def inFr_subtr mem_Collect_eq)
obtain n where n: "inItr UNIV tr0 n" and tr: "tr = H n" using tr
by (metis (lifting) inItr.Base subtr_H UNIV_I)
have "Inl t \<in> cont (pick n)" using t using Inl_cont_H[of n] unfolding tr
by (metis (lifting) vimageD vimageI2)
moreover have "subtr UNIV (pick n) tr0" using subtr_pick[OF n] ..
ultimately show "t \<in> Fr UNIV tr0" unfolding Fr_subtr_cont by auto
qed
lemma wf_rcut:
assumes "wf tr0"
shows "wf rcut"
unfolding rcut_def using wf_H[OF assms inItr.Base] by simp
lemma root_rcut[simp]: "root rcut = root tr0"
unfolding rcut_def
by (metis (lifting) root_H inItr.Base reg_def reg_root subtr_rootR_in)
end (* context *)
subsection{* Recursive Description of the Regular Tree Frontiers *}
lemma regular_inFr:
assumes r: "regular tr" and In: "root tr \<in> ns"
and t: "inFr ns tr t"
shows "t \<in> Inl -` (cont tr) \<or>
(\<exists> tr'. Inr tr' \<in> cont tr \<and> inFr (ns - {root tr}) tr' t)"
(is "?L \<or> ?R")
proof-
obtain f where r: "reg f tr" and f: "\<And>n. root (f n) = n"
using r unfolding regular_def2 by auto
obtain nl tr1 where d_nl: "distinct nl" and p: "path f nl" and hd_nl: "f (hd nl) = tr"
and l_nl: "f (last nl) = tr1" and s_nl: "set nl \<subseteq> ns" and t_tr1: "Inl t \<in> cont tr1"
using t unfolding inFr_iff_path[OF r f] by auto
obtain n nl1 where nl: "nl = n # nl1" by (metis (lifting) p path.simps)
hence f_n: "f n = tr" using hd_nl by simp
have n_nl1: "n \<notin> set nl1" using d_nl unfolding nl by auto
show ?thesis
proof(cases nl1)
case Nil hence "tr = tr1" using f_n l_nl unfolding nl by simp
hence ?L using t_tr1 by simp thus ?thesis by simp
next
case (Cons n1 nl2) note nl1 = Cons
have 1: "last nl1 = last nl" "hd nl1 = n1" unfolding nl nl1 by simp_all
have p1: "path f nl1" and n1_tr: "Inr (f n1) \<in> cont tr"
using path.simps[of f nl] p f_n unfolding nl nl1 by auto
have r1: "reg f (f n1)" using reg_Inr_cont[OF r n1_tr] .
have 0: "inFr (set nl1) (f n1) t" unfolding inFr_iff_path[OF r1 f]
apply(intro exI[of _ nl1], intro exI[of _ tr1])
using d_nl unfolding 1 l_nl unfolding nl using p1 t_tr1 by auto
have root_tr: "root tr = n" by (metis f f_n)
have "inFr (ns - {root tr}) (f n1) t" apply(rule inFr_mono[OF 0])
using s_nl unfolding root_tr unfolding nl using n_nl1 by auto
thus ?thesis using n1_tr by auto
qed
qed
lemma regular_Fr:
assumes r: "regular tr" and In: "root tr \<in> ns"
shows "Fr ns tr =
Inl -` (cont tr) \<union>
\<Union>{Fr (ns - {root tr}) tr' | tr'. Inr tr' \<in> cont tr}"
unfolding Fr_def
using In inFr.Base regular_inFr[OF assms] apply safe
apply (simp, metis (full_types) mem_Collect_eq)
apply simp
by (simp, metis (lifting) inFr_Ind_minus insert_Diff)
subsection{* The Generated Languages *}
(* The (possibly inifinite tree) generated language *)
definition "L ns n \<equiv> {Fr ns tr | tr. wf tr \<and> root tr = n}"
(* The regular-tree generated language *)
definition "Lr ns n \<equiv> {Fr ns tr | tr. wf tr \<and> root tr = n \<and> regular tr}"
lemma L_rec_notin:
assumes "n \<notin> ns"
shows "L ns n = {{}}"
using assms unfolding L_def apply safe
using not_root_Fr apply force
apply(rule exI[of _ "deftr n"])
by (metis (no_types) wf_deftr not_root_Fr root_deftr)
lemma Lr_rec_notin:
assumes "n \<notin> ns"
shows "Lr ns n = {{}}"
using assms unfolding Lr_def apply safe
using not_root_Fr apply force
apply(rule exI[of _ "deftr n"])
by (metis (no_types) regular_def wf_deftr not_root_Fr reg_deftr root_deftr)
lemma wf_subtrOf:
assumes "wf tr" and "Inr n \<in> prodOf tr"
shows "wf (subtrOf tr n)"
by (metis assms wf_cont subtrOf)
lemma Lr_rec_in:
assumes n: "n \<in> ns"
shows "Lr ns n \<subseteq>
{Inl -` tns \<union> (\<Union>{K n' | n'. Inr n' \<in> tns}) | tns K.
(n,tns) \<in> P \<and>
(\<forall> n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> Lr (ns - {n}) n')}"
(is "Lr ns n \<subseteq> {?F tns K | tns K. (n,tns) \<in> P \<and> ?\<phi> tns K}")
proof safe
fix ts assume "ts \<in> Lr ns n"
then obtain tr where dtr: "wf tr" and r: "root tr = n" and tr: "regular tr"
and ts: "ts = Fr ns tr" unfolding Lr_def by auto
def tns \<equiv> "(id \<oplus> root) ` (cont tr)"
def K \<equiv> "\<lambda> n'. Fr (ns - {n}) (subtrOf tr n')"
show "\<exists>tns K. ts = ?F tns K \<and> (n, tns) \<in> P \<and> ?\<phi> tns K"
apply(rule exI[of _ tns], rule exI[of _ K]) proof(intro conjI allI impI)
show "ts = Inl -` tns \<union> \<Union>{K n' |n'. Inr n' \<in> tns}"
unfolding ts regular_Fr[OF tr n[unfolded r[symmetric]]]
unfolding tns_def K_def r[symmetric]
unfolding Inl_prodOf wf_subtrOf_Union[OF dtr] ..
show "(n, tns) \<in> P" unfolding tns_def r[symmetric] using wf_P[OF dtr] .
fix n' assume "Inr n' \<in> tns" thus "K n' \<in> Lr (ns - {n}) n'"
unfolding K_def Lr_def mem_Collect_eq apply(intro exI[of _ "subtrOf tr n'"])
using dtr tr apply(intro conjI refl) unfolding tns_def
apply(erule wf_subtrOf[OF dtr])
apply (metis subtrOf)
by (metis Inr_subtrOf UNIV_I regular_subtr subtr.simps)
qed
qed
lemma hsubst_aux:
fixes n ftr tns
assumes n: "n \<in> ns" and tns: "finite tns" and
1: "\<And> n'. Inr n' \<in> tns \<Longrightarrow> wf (ftr n')"
defines "tr \<equiv> Node n ((id \<oplus> ftr) ` tns)" defines "tr' \<equiv> hsubst tr tr"
shows "Fr ns tr' = Inl -` tns \<union> \<Union>{Fr (ns - {n}) (ftr n') |n'. Inr n' \<in> tns}"
(is "_ = ?B") proof-
have rtr: "root tr = n" and ctr: "cont tr = (id \<oplus> ftr) ` tns"
unfolding tr_def using tns by auto
have Frr: "Frr (ns - {n}) tr = \<Union>{Fr (ns - {n}) (ftr n') |n'. Inr n' \<in> tns}"
unfolding Frr_def ctr by auto
have "Fr ns tr' = Inl -` (cont tr) \<union> Frr (ns - {n}) tr"
using Fr_self_hsubst[OF n[unfolded rtr[symmetric]]] unfolding tr'_def rtr ..
also have "... = ?B" unfolding ctr Frr by simp
finally show ?thesis .
qed
lemma L_rec_in:
assumes n: "n \<in> ns"
shows "
{Inl -` tns \<union> (\<Union>{K n' | n'. Inr n' \<in> tns}) | tns K.
(n,tns) \<in> P \<and>
(\<forall> n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> L (ns - {n}) n')}
\<subseteq> L ns n"
proof safe
fix tns K
assume P: "(n, tns) \<in> P" and 0: "\<forall>n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> L (ns - {n}) n'"
{fix n' assume "Inr n' \<in> tns"
hence "K n' \<in> L (ns - {n}) n'" using 0 by auto
hence "\<exists> tr'. K n' = Fr (ns - {n}) tr' \<and> wf tr' \<and> root tr' = n'"
unfolding L_def mem_Collect_eq by auto
}
then obtain ftr where 0: "\<And> n'. Inr n' \<in> tns \<Longrightarrow>
K n' = Fr (ns - {n}) (ftr n') \<and> wf (ftr n') \<and> root (ftr n') = n'"
by metis
def tr \<equiv> "Node n ((id \<oplus> ftr) ` tns)" def tr' \<equiv> "hsubst tr tr"
have rtr: "root tr = n" and ctr: "cont tr = (id \<oplus> ftr) ` tns"
unfolding tr_def by (simp, metis P cont_Node finite_imageI finite_in_P)
have prtr: "prodOf tr = tns" apply(rule Inl_Inr_image_cong)
unfolding ctr apply simp apply simp apply safe
using 0 unfolding image_def apply force apply simp by (metis 0 vimageI2)
have 1: "{K n' |n'. Inr n' \<in> tns} = {Fr (ns - {n}) (ftr n') |n'. Inr n' \<in> tns}"
using 0 by auto
have dtr: "wf tr" apply(rule wf.dtree)
apply (metis (lifting) P prtr rtr)
unfolding inj_on_def ctr using 0 by auto
hence dtr': "wf tr'" unfolding tr'_def by (metis wf_hsubst)
have tns: "finite tns" using finite_in_P P by simp
have "Inl -` tns \<union> \<Union>{Fr (ns - {n}) (ftr n') |n'. Inr n' \<in> tns} \<in> L ns n"
unfolding L_def mem_Collect_eq apply(intro exI[of _ tr'] conjI)
using dtr' 0 hsubst_aux[OF assms tns, of ftr] unfolding tr_def tr'_def by auto
thus "Inl -` tns \<union> \<Union>{K n' |n'. Inr n' \<in> tns} \<in> L ns n" unfolding 1 .
qed
lemma card_N: "(n::N) \<in> ns \<Longrightarrow> card (ns - {n}) < card ns"
by (metis finite_N Diff_UNIV Diff_infinite_finite card_Diff1_less finite.emptyI)
function LL where
"LL ns n =
(if n \<notin> ns then {{}} else
{Inl -` tns \<union> (\<Union>{K n' | n'. Inr n' \<in> tns}) | tns K.
(n,tns) \<in> P \<and>
(\<forall> n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> LL (ns - {n}) n')})"
by(pat_completeness, auto)
termination apply(relation "inv_image (measure card) fst")
using card_N by auto
declare LL.simps[code]
declare LL.simps[simp del]
lemma Lr_LL: "Lr ns n \<subseteq> LL ns n"
proof (induct ns arbitrary: n rule: measure_induct[of card])
case (1 ns n) show ?case proof(cases "n \<in> ns")
case False thus ?thesis unfolding Lr_rec_notin[OF False] by (simp add: LL.simps)
next
case True show ?thesis apply(rule subset_trans)
using Lr_rec_in[OF True] apply assumption
unfolding LL.simps[of ns n] using True 1 card_N proof clarsimp
fix tns K
assume "n \<in> ns" hence c: "card (ns - {n}) < card ns" using card_N by blast
assume "(n, tns) \<in> P"
and "\<forall>n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> Lr (ns - {n}) n'"
thus "\<exists>tnsa Ka.
Inl -` tns \<union> \<Union>{K n' |n'. Inr n' \<in> tns} =
Inl -` tnsa \<union> \<Union>{Ka n' |n'. Inr n' \<in> tnsa} \<and>
(n, tnsa) \<in> P \<and> (\<forall>n'. Inr n' \<in> tnsa \<longrightarrow> Ka n' \<in> LL (ns - {n}) n')"
apply(intro exI[of _ tns] exI[of _ K]) using c 1 by auto
qed
qed
qed
lemma LL_L: "LL ns n \<subseteq> L ns n"
proof (induct ns arbitrary: n rule: measure_induct[of card])
case (1 ns n) show ?case proof(cases "n \<in> ns")
case False thus ?thesis unfolding L_rec_notin[OF False] by (simp add: LL.simps)
next
case True show ?thesis apply(rule subset_trans)
prefer 2 using L_rec_in[OF True] apply assumption
unfolding LL.simps[of ns n] using True 1 card_N proof clarsimp
fix tns K
assume "n \<in> ns" hence c: "card (ns - {n}) < card ns" using card_N by blast
assume "(n, tns) \<in> P"
and "\<forall>n'. Inr n' \<in> tns \<longrightarrow> K n' \<in> LL (ns - {n}) n'"
thus "\<exists>tnsa Ka.
Inl -` tns \<union> \<Union>{K n' |n'. Inr n' \<in> tns} =
Inl -` tnsa \<union> \<Union>{Ka n' |n'. Inr n' \<in> tnsa} \<and>
(n, tnsa) \<in> P \<and> (\<forall>n'. Inr n' \<in> tnsa \<longrightarrow> Ka n' \<in> L (ns - {n}) n')"
apply(intro exI[of _ tns] exI[of _ K]) using c 1 by auto
qed
qed
qed
(* The subsumpsion relation between languages *)
definition "subs L1 L2 \<equiv> \<forall> ts2 \<in> L2. \<exists> ts1 \<in> L1. ts1 \<subseteq> ts2"
lemma incl_subs[simp]: "L2 \<subseteq> L1 \<Longrightarrow> subs L1 L2"
unfolding subs_def by auto
lemma subs_refl[simp]: "subs L1 L1" unfolding subs_def by auto
lemma subs_trans: "\<lbrakk>subs L1 L2; subs L2 L3\<rbrakk> \<Longrightarrow> subs L1 L3"
unfolding subs_def by (metis subset_trans)
(* Language equivalence *)
definition "leqv L1 L2 \<equiv> subs L1 L2 \<and> subs L2 L1"
lemma subs_leqv[simp]: "leqv L1 L2 \<Longrightarrow> subs L1 L2"
unfolding leqv_def by auto
lemma subs_leqv_sym[simp]: "leqv L1 L2 \<Longrightarrow> subs L2 L1"
unfolding leqv_def by auto
lemma leqv_refl[simp]: "leqv L1 L1" unfolding leqv_def by auto
lemma leqv_trans:
assumes 12: "leqv L1 L2" and 23: "leqv L2 L3"
shows "leqv L1 L3"
using assms unfolding leqv_def by (metis (lifting) subs_trans)
lemma leqv_sym: "leqv L1 L2 \<Longrightarrow> leqv L2 L1"
unfolding leqv_def by auto
lemma leqv_Sym: "leqv L1 L2 \<longleftrightarrow> leqv L2 L1"
unfolding leqv_def by auto
lemma Lr_incl_L: "Lr ns ts \<subseteq> L ns ts"
unfolding Lr_def L_def by auto
lemma Lr_subs_L: "subs (Lr UNIV ts) (L UNIV ts)"
unfolding subs_def proof safe
fix ts2 assume "ts2 \<in> L UNIV ts"
then obtain tr where ts2: "ts2 = Fr UNIV tr" and dtr: "wf tr" and rtr: "root tr = ts"
unfolding L_def by auto
thus "\<exists>ts1\<in>Lr UNIV ts. ts1 \<subseteq> ts2"
apply(intro bexI[of _ "Fr UNIV (rcut tr)"])
unfolding Lr_def L_def using Fr_rcut wf_rcut root_rcut regular_rcut by auto
qed
lemma Lr_leqv_L: "leqv (Lr UNIV ts) (L UNIV ts)"
using Lr_subs_L unfolding leqv_def by (metis (lifting) Lr_incl_L incl_subs)
lemma LL_leqv_L: "leqv (LL UNIV ts) (L UNIV ts)"
by (metis (lifting) LL_L Lr_LL Lr_subs_L incl_subs leqv_def subs_trans)
lemma LL_leqv_Lr: "leqv (LL UNIV ts) (Lr UNIV ts)"
using Lr_leqv_L LL_leqv_L by (metis leqv_Sym leqv_trans)
end