isabelle: src/HOL/Isar_Examples/Nested_Datatype.thy@a02ea93e88c6 (annotated)

10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	1	header {* Nested datatypes *}
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	2
31758 3edd5f813f01 observe standard theory naming conventions; wenzelm parents: 23373 diff changeset	3	theory Nested_Datatype
3edd5f813f01 observe standard theory naming conventions; wenzelm parents: 23373 diff changeset	4	imports Main
3edd5f813f01 observe standard theory naming conventions; wenzelm parents: 23373 diff changeset	5	begin
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	6
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	7	subsection {* Terms and substitution *}
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	8
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	9	datatype ('a, 'b) "term" =
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	10	Var 'a
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	11	\| App 'b "('a, 'b) term list"
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	12
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	13	primrec subst_term :: "('a => ('a, 'b) term) => ('a, 'b) term => ('a, 'b) term" and
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	14	subst_term_list :: "('a => ('a, 'b) term) => ('a, 'b) term list => ('a, 'b) term list" where
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	15	"subst_term f (Var a) = f a"
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	16	\| "subst_term f (App b ts) = App b (subst_term_list f ts)"
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	17	\| "subst_term_list f [] = []"
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	18	\| "subst_term_list f (t # ts) = subst_term f t # subst_term_list f ts"
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	19
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	20	lemmas subst_simps = subst_term_subst_term_list.simps
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	21
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	22	text {*
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	23	\medskip A simple lemma about composition of substitutions.
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	24	*}
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	25
18460 9a1458cb2956 tuned induct proofs; wenzelm parents: 18153 diff changeset	26	lemma "subst_term (subst_term f1 o f2) t =
9a1458cb2956 tuned induct proofs; wenzelm parents: 18153 diff changeset	27	subst_term f1 (subst_term f2 t)"
9a1458cb2956 tuned induct proofs; wenzelm parents: 18153 diff changeset	28	and "subst_term_list (subst_term f1 o f2) ts =
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	29	subst_term_list f1 (subst_term_list f2 ts)"
11809 c9ffdd63dd93 tuned induction proofs; wenzelm parents: 10458 diff changeset	30	by (induct t and ts) simp_all
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	31
9659 b9cf6801f3da tuned; wenzelm parents: 8717 diff changeset	32	lemma "subst_term (subst_term f1 o f2) t =
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	33	subst_term f1 (subst_term f2 t)"
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	34	proof -
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	35	let "?P t" = ?thesis
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	36	let ?Q = "\<lambda>ts. subst_term_list (subst_term f1 o f2) ts =
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	37	subst_term_list f1 (subst_term_list f2 ts)"
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	38	show ?thesis
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	39	proof (induct t)
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	40	fix a show "?P (Var a)" by simp
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	41	next
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	42	fix b ts assume "?Q ts"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 18460 diff changeset	43	then show "?P (App b ts)"
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	44	by (simp only: subst_simps)
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	45	next
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	46	show "?Q []" by simp
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	47	next
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	48	fix t ts
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 18460 diff changeset	49	assume "?P t" "?Q ts" then show "?Q (t # ts)"
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	50	by (simp only: subst_simps)
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	51	qed
64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	52	qed
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	53
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	54
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	55	subsection {* Alternative induction *}
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	56
4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	57	theorem term_induct' [case_names Var App]:
18153 a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	58	assumes var: "!!a. P (Var a)"
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	59	and app: "!!b ts. (\<forall>t \<in> set ts. P t) ==> P (App b ts)"
18153 a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	60	shows "P t"
a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	61	proof (induct t)
a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	62	fix a show "P (Var a)" by (rule var)
a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	63	next
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	64	fix b t ts assume "\<forall>t \<in> set ts. P t"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 18460 diff changeset	65	then show "P (App b ts)" by (rule app)
18153 a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	66	next
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	67	show "\<forall>t \<in> set []. P t" by simp
18153 a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	68	next
37597 a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	69	fix t ts assume "P t" "\<forall>t' \<in> set ts. P t'"
a02ea93e88c6 modernized specifications haftmann parents: 33026 diff changeset	70	then show "\<forall>t' \<in> set (t # ts). P t'" by simp
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	71	qed
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	72
8717 20c42415c07d plain ASCII; wenzelm parents: 8676 diff changeset	73	lemma
20c42415c07d plain ASCII; wenzelm parents: 8676 diff changeset	74	"subst_term (subst_term f1 o f2) t = subst_term f1 (subst_term f2 t)"
11809 c9ffdd63dd93 tuned induction proofs; wenzelm parents: 10458 diff changeset	75	proof (induct t rule: term_induct')
c9ffdd63dd93 tuned induction proofs; wenzelm parents: 10458 diff changeset	76	case (Var a)
18153 a084aa91f701 tuned proofs; wenzelm parents: 16417 diff changeset	77	show ?case by (simp add: o_def)
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	78	next
11809 c9ffdd63dd93 tuned induction proofs; wenzelm parents: 10458 diff changeset	79	case (App b ts)
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 18460 diff changeset	80	then show ?case by (induct ts) simp_all
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	81	qed
8676 4bf18b611a75 added NestedDatatype.thy; wenzelm parents: diff changeset	82
10007 64bf7da1994a isar-strip-terminators; wenzelm parents: 9659 diff changeset	83	end

author	haftmann
	Mon, 28 Jun 2010 15:32:13 +0200
changeset 37597	a02ea93e88c6
parent 33026	8f35633c4922
child 37671	fa53d267dab3
permissions	-rw-r--r--