isabelle: src/ZF/Induct/Tree_Forest.thy@3dda49e08b9d (annotated)

12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	1	(* Title: ZF/Induct/Tree_Forest.thy
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	2	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	3	Copyright 1994 University of Cambridge
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	4	*)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	5
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	6	section \<open>Trees and forests, a mutually recursive type definition\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	7
65449 c82e63b11b8b clarified main ZF.thy / ZFC.thy, and avoid name clash with global HOL/Main.thy; wenzelm parents: 61798 diff changeset	8	theory Tree_Forest imports ZF begin
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	9
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	10	subsection \<open>Datatype definition\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	11
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	12	consts
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	13	tree :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	14	forest :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	15	tree_forest :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	16
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	17	datatype "tree(A)" = Tcons ("a \<in> A", "f \<in> forest(A)")
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	18	and "forest(A)" = Fnil \| Fcons ("t \<in> tree(A)", "f \<in> forest(A)")
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	19
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	20	(* FIXME *)
9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	21	lemmas tree'induct =
45602 2a858377c3d2 eliminated obsolete "standard"; wenzelm parents: 41526 diff changeset	22	tree_forest.mutual_induct [THEN conjunct1, THEN spec, THEN [2] rev_mp, of concl: _ t, consumes 1]
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	23	and forest'induct =
45602 2a858377c3d2 eliminated obsolete "standard"; wenzelm parents: 41526 diff changeset	24	tree_forest.mutual_induct [THEN conjunct2, THEN spec, THEN [2] rev_mp, of concl: _ f, consumes 1]
68233 5e0e9376b2b0 avoid undeclared frees; wenzelm parents: 65449 diff changeset	25	for t f
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	26
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	27	declare tree_forest.intros [simp, TC]
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	28
12216 dda8c04a8fb4 isatool unsymbolize; wenzelm parents: 12205 diff changeset	29	lemma tree_def: "tree(A) == Part(tree_forest(A), Inl)"
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	30	by (simp only: tree_forest.defs)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	31
12216 dda8c04a8fb4 isatool unsymbolize; wenzelm parents: 12205 diff changeset	32	lemma forest_def: "forest(A) == Part(tree_forest(A), Inr)"
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	33	by (simp only: tree_forest.defs)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	34
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	35
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	36	text \<open>
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 68490 diff changeset	37	\medskip \<^term>\<open>tree_forest(A)\<close> as the union of \<^term>\<open>tree(A)\<close>
3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 68490 diff changeset	38	and \<^term>\<open>forest(A)\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	39	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	40
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	41	lemma tree_subset_TF: "tree(A) \<subseteq> tree_forest(A)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	42	apply (unfold tree_forest.defs)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	43	apply (rule Part_subset)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	44	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	45
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	46	lemma treeI [TC]: "x \<in> tree(A) ==> x \<in> tree_forest(A)"
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	47	by (rule tree_subset_TF [THEN subsetD])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	48
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	49	lemma forest_subset_TF: "forest(A) \<subseteq> tree_forest(A)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	50	apply (unfold tree_forest.defs)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	51	apply (rule Part_subset)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	52	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	53
13535 007559e981c7 * empty log message * wenzelm parents: 12937 diff changeset	54	lemma treeI' [TC]: "x \<in> forest(A) ==> x \<in> tree_forest(A)"
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	55	by (rule forest_subset_TF [THEN subsetD])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	56
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	57	lemma TF_equals_Un: "tree(A) \<union> forest(A) = tree_forest(A)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	58	apply (insert tree_subset_TF forest_subset_TF)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	59	apply (auto intro!: equalityI tree_forest.intros elim: tree_forest.cases)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	60	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	61
60375 b35b08a143b2 tuned; wenzelm parents: 58871 diff changeset	62	lemma tree_forest_unfold:
b35b08a143b2 tuned; wenzelm parents: 58871 diff changeset	63	"tree_forest(A) = (A \<times> forest(A)) + ({0} + tree(A) \<times> forest(A))"
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	64	\<comment> \<open>NOT useful, but interesting \dots\<close>
60375 b35b08a143b2 tuned; wenzelm parents: 58871 diff changeset	65	supply rews = tree_forest.con_defs tree_def forest_def
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	66	apply (unfold tree_def forest_def)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	67	apply (fast intro!: tree_forest.intros [unfolded rews, THEN PartD1]
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	68	elim: tree_forest.cases [unfolded rews])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	69	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	70
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	71	lemma tree_forest_unfold':
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	72	"tree_forest(A) =
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	73	A \<times> Part(tree_forest(A), \<lambda>w. Inr(w)) +
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	74	{0} + Part(tree_forest(A), \<lambda>w. Inl(w)) * Part(tree_forest(A), \<lambda>w. Inr(w))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	75	by (rule tree_forest_unfold [unfolded tree_def forest_def])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	76
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	77	lemma tree_unfold: "tree(A) = {Inl(x). x \<in> A \<times> forest(A)}"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	78	apply (unfold tree_def forest_def)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	79	apply (rule Part_Inl [THEN subst])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	80	apply (rule tree_forest_unfold' [THEN subst_context])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	81	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	82
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	83	lemma forest_unfold: "forest(A) = {Inr(x). x \<in> {0} + tree(A)*forest(A)}"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	84	apply (unfold tree_def forest_def)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	85	apply (rule Part_Inr [THEN subst])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	86	apply (rule tree_forest_unfold' [THEN subst_context])
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	87	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	88
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	89	text \<open>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	90	\medskip Type checking for recursor: Not needed; possibly interesting?
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	91	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	92
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	93	lemma TF_rec_type:
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	94	"[\| z \<in> tree_forest(A);
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	95	!!x f r. [\| x \<in> A; f \<in> forest(A); r \<in> C(f)
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	96	\|] ==> b(x,f,r) \<in> C(Tcons(x,f));
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	97	c \<in> C(Fnil);
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	98	!!t f r1 r2. [\| t \<in> tree(A); f \<in> forest(A); r1 \<in> C(t); r2 \<in> C(f)
a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	99	\|] ==> d(t,f,r1,r2) \<in> C(Fcons(t,f))
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	100	\|] ==> tree_forest_rec(b,c,d,z) \<in> C(z)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	101	by (induct_tac z) simp_all
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	102
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	103	lemma tree_forest_rec_type:
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	104	"[\| !!x f r. [\| x \<in> A; f \<in> forest(A); r \<in> D(f)
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	105	\|] ==> b(x,f,r) \<in> C(Tcons(x,f));
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	106	c \<in> D(Fnil);
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	107	!!t f r1 r2. [\| t \<in> tree(A); f \<in> forest(A); r1 \<in> C(t); r2 \<in> D(f)
a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	108	\|] ==> d(t,f,r1,r2) \<in> D(Fcons(t,f))
a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	109	\|] ==> (\<forall>t \<in> tree(A). tree_forest_rec(b,c,d,t) \<in> C(t)) \<and>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	110	(\<forall>f \<in> forest(A). tree_forest_rec(b,c,d,f) \<in> D(f))"
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	111	\<comment> \<open>Mutually recursive version.\<close>
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	112	apply (unfold Ball_def)
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	113	apply (rule tree_forest.mutual_induct)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	114	apply simp_all
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	115	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	116
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	117
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	118	subsection \<open>Operations\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	119
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	120	consts
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	121	map :: "[i => i, i] => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	122	size :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	123	preorder :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	124	list_of_TF :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	125	of_list :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	126	reflect :: "i => i"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	127
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	128	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	129	"list_of_TF (Tcons(x,f)) = [Tcons(x,f)]"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	130	"list_of_TF (Fnil) = []"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	131	"list_of_TF (Fcons(t,tf)) = Cons (t, list_of_TF(tf))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	132
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	133	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	134	"of_list([]) = Fnil"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	135	"of_list(Cons(t,l)) = Fcons(t, of_list(l))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	136
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	137	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	138	"map (h, Tcons(x,f)) = Tcons(h(x), map(h,f))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	139	"map (h, Fnil) = Fnil"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	140	"map (h, Fcons(t,tf)) = Fcons (map(h, t), map(h, tf))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	141
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	142	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	143	"size (Tcons(x,f)) = succ(size(f))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	144	"size (Fnil) = 0"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	145	"size (Fcons(t,tf)) = size(t) #+ size(tf)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	146
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	147	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	148	"preorder (Tcons(x,f)) = Cons(x, preorder(f))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	149	"preorder (Fnil) = Nil"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	150	"preorder (Fcons(t,tf)) = preorder(t) @ preorder(tf)"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	151
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	152	primrec
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	153	"reflect (Tcons(x,f)) = Tcons(x, reflect(f))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	154	"reflect (Fnil) = Fnil"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	155	"reflect (Fcons(t,tf)) =
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	156	of_list (list_of_TF (reflect(tf)) @ Cons(reflect(t), Nil))"
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	157
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	158
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	159	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	160	\medskip \<open>list_of_TF\<close> and \<open>of_list\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	161	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	162
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	163	lemma list_of_TF_type [TC]:
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	164	"z \<in> tree_forest(A) ==> list_of_TF(z) \<in> list(tree(A))"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	165	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	166
12243 a2c0aaf94460 tuned; wenzelm parents: 12216 diff changeset	167	lemma of_list_type [TC]: "l \<in> list(tree(A)) ==> of_list(l) \<in> forest(A)"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	168	by (induct set: list) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	169
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	170	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	171	\medskip \<open>map\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	172	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	173
12937 0c4fd7529467 clarified syntax of ``long'' statements: fixes/assumes/shows; wenzelm parents: 12610 diff changeset	174	lemma
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	175	assumes "!!x. x \<in> A ==> h(x): B"
12937 0c4fd7529467 clarified syntax of ``long'' statements: fixes/assumes/shows; wenzelm parents: 12610 diff changeset	176	shows map_tree_type: "t \<in> tree(A) ==> map(h,t) \<in> tree(B)"
0c4fd7529467 clarified syntax of ``long'' statements: fixes/assumes/shows; wenzelm parents: 12610 diff changeset	177	and map_forest_type: "f \<in> forest(A) ==> map(h,f) \<in> forest(B)"
41526 54b4686704af eliminated global prems; wenzelm parents: 35762 diff changeset	178	using assms
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	179	by (induct rule: tree'induct forest'induct) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	180
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	181	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	182	\medskip \<open>size\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	183	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	184
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	185	lemma size_type [TC]: "z \<in> tree_forest(A) ==> size(z) \<in> nat"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	186	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	187
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	188
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	189	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	190	\medskip \<open>preorder\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	191	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	192
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	193	lemma preorder_type [TC]: "z \<in> tree_forest(A) ==> preorder(z) \<in> list(A)"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	194	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	195
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	196
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	197	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	198	\medskip Theorems about \<open>list_of_TF\<close> and \<open>of_list\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	199	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	200
18415 eb68dc98bda2 improved proofs; wenzelm parents: 16417 diff changeset	201	lemma forest_induct [consumes 1, case_names Fnil Fcons]:
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	202	"[\| f \<in> forest(A);
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	203	R(Fnil);
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	204	!!t f. [\| t \<in> tree(A); f \<in> forest(A); R(f) \|] ==> R(Fcons(t,f))
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	205	\|] ==> R(f)"
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	206	\<comment> \<open>Essentially the same as list induction.\<close>
12610 8b9845807f77 tuned document sources; wenzelm parents: 12243 diff changeset	207	apply (erule tree_forest.mutual_induct
8b9845807f77 tuned document sources; wenzelm parents: 12243 diff changeset	208	[THEN conjunct2, THEN spec, THEN [2] rev_mp])
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	209	apply (rule TrueI)
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	210	apply simp
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	211	apply simp
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	212	done
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	213
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	214	lemma forest_iso: "f \<in> forest(A) ==> of_list(list_of_TF(f)) = f"
18415 eb68dc98bda2 improved proofs; wenzelm parents: 16417 diff changeset	215	by (induct rule: forest_induct) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	216
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	217	lemma tree_list_iso: "ts: list(tree(A)) ==> list_of_TF(of_list(ts)) = ts"
18415 eb68dc98bda2 improved proofs; wenzelm parents: 16417 diff changeset	218	by (induct set: list) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	219
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	220
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	221	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	222	\medskip Theorems about \<open>map\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	223	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	224
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	225	lemma map_ident: "z \<in> tree_forest(A) ==> map(\<lambda>u. u, z) = z"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	226	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	227
12216 dda8c04a8fb4 isatool unsymbolize; wenzelm parents: 12205 diff changeset	228	lemma map_compose:
dda8c04a8fb4 isatool unsymbolize; wenzelm parents: 12205 diff changeset	229	"z \<in> tree_forest(A) ==> map(h, map(j,z)) = map(\<lambda>u. h(j(u)), z)"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	230	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	231
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	232
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	233	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	234	\medskip Theorems about \<open>size\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	235	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	236
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	237	lemma size_map: "z \<in> tree_forest(A) ==> size(map(h,z)) = size(z)"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	238	by (induct set: tree_forest) simp_all
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	239
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	240	lemma size_length: "z \<in> tree_forest(A) ==> size(z) = length(preorder(z))"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	241	by (induct set: tree_forest) (simp_all add: length_app)
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	242
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	243	text \<open>
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	244	\medskip Theorems about \<open>preorder\<close>.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 60375 diff changeset	245	\<close>
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	246
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	247	lemma preorder_map:
68490 eb53f944c8cd simplified ZF theory names (in contrast to 6a0801279f4c): session-qualification already achieves disjointness; wenzelm parents: 68233 diff changeset	248	"z \<in> tree_forest(A) ==> preorder(map(h,z)) = List.map(h, preorder(z))"
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18415 diff changeset	249	by (induct set: tree_forest) (simp_all add: map_app_distrib)
12201 7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	250
7198f403a2f9 added Term and Tree_Forest (from converted ZF/ex); wenzelm parents: diff changeset	251	end

author	wenzelm
	Fri, 04 Jan 2019 23:22:53 +0100
changeset 69593	3dda49e08b9d
parent 68490	eb53f944c8cd
child 76213	e44d86131648
permissions	-rw-r--r--