isabelle: src/HOL/Datatype.thy@7619080e49f0 (annotated)

5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	1	(* Title: HOL/Datatype.thy
4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	2	ID: $Id$
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	4	Author: Stefan Berghofer and Markus Wenzel, TU Muenchen
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	5
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	6	Could <*> be generalized to a general summation (Sigma)?
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	7	*)
4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	8
21669 c68717c16013 removed legacy ML bindings; wenzelm parents: 21454 diff changeset	9	header {* Analogues of the Cartesian Product and Disjoint Sum for Datatypes *}
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	10
15131 c69542757a4d New theory header syntax. nipkow parents: 14981 diff changeset	11	theory Datatype
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21126 diff changeset	12	imports Nat Sum_Type
15131 c69542757a4d New theory header syntax. nipkow parents: 14981 diff changeset	13	begin
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	14
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	15	typedef (Node)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	16	('a,'b) node = "{p. EX f x k. p = (f::nat=>'b+nat, x::'a+nat) & f k = Inr 0}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	17	--{it is a subtype of @{text "(nat=>'b+nat) ('a+nat)"}*}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	18	by auto
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	19
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	20	text{Datatypes will be represented by sets of type @{text node}}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	21
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	22	types 'a item = "('a, unit) node set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	23	('a, 'b) dtree = "('a, 'b) node set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	24
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	25	consts
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	26	apfst :: "['a=>'c, 'a'b] => 'c'b"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	27	Push :: "[('b + nat), nat => ('b + nat)] => (nat => ('b + nat))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	28
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	29	Push_Node :: "[('b + nat), ('a, 'b) node] => ('a, 'b) node"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	30	ndepth :: "('a, 'b) node => nat"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	31
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	32	Atom :: "('a + nat) => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	33	Leaf :: "'a => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	34	Numb :: "nat => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	35	Scons :: "[('a, 'b) dtree, ('a, 'b) dtree] => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	36	In0 :: "('a, 'b) dtree => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	37	In1 :: "('a, 'b) dtree => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	38	Lim :: "('b => ('a, 'b) dtree) => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	39
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	40	ntrunc :: "[nat, ('a, 'b) dtree] => ('a, 'b) dtree"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	41
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	42	uprod :: "[('a, 'b) dtree set, ('a, 'b) dtree set]=> ('a, 'b) dtree set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	43	usum :: "[('a, 'b) dtree set, ('a, 'b) dtree set]=> ('a, 'b) dtree set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	44
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	45	Split :: "[[('a, 'b) dtree, ('a, 'b) dtree]=>'c, ('a, 'b) dtree] => 'c"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	46	Case :: "[[('a, 'b) dtree]=>'c, [('a, 'b) dtree]=>'c, ('a, 'b) dtree] => 'c"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	47
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	48	dprod :: "[(('a, 'b) dtree * ('a, 'b) dtree)set, (('a, 'b) dtree * ('a, 'b) dtree)set]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	49	=> (('a, 'b) dtree * ('a, 'b) dtree)set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	50	dsum :: "[(('a, 'b) dtree * ('a, 'b) dtree)set, (('a, 'b) dtree * ('a, 'b) dtree)set]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	51	=> (('a, 'b) dtree * ('a, 'b) dtree)set"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	52
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	53
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	54	defs
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	55
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	56	Push_Node_def: "Push_Node == (%n x. Abs_Node (apfst (Push n) (Rep_Node x)))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	57
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	58	(crude "lists" of nats -- needed for the constructions)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	59	apfst_def: "apfst == (%f (x,y). (f(x),y))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	60	Push_def: "Push == (%b h. nat_case b h)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	61
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	62	( operations on S-expressions -- sets of nodes )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	63
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	64	(S-expression constructors)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	65	Atom_def: "Atom == (%x. {Abs_Node((%k. Inr 0, x))})"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	66	Scons_def: "Scons M N == (Push_Node (Inr 1) ` M) Un (Push_Node (Inr (Suc 1)) ` N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	67
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	68	(Leaf nodes, with arbitrary or nat labels)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	69	Leaf_def: "Leaf == Atom o Inl"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	70	Numb_def: "Numb == Atom o Inr"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	71
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	72	(Injections of the "disjoint sum")
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	73	In0_def: "In0(M) == Scons (Numb 0) M"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	74	In1_def: "In1(M) == Scons (Numb 1) M"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	75
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	76	(Function spaces)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	77	Lim_def: "Lim f == Union {z. ? x. z = Push_Node (Inl x) ` (f x)}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	78
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	79	(the set of nodes with depth less than k)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	80	ndepth_def: "ndepth(n) == (%(f,x). LEAST k. f k = Inr 0) (Rep_Node n)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	81	ntrunc_def: "ntrunc k N == {n. n:N & ndepth(n)<k}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	82
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	83	(products and sums for the "universe")
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	84	uprod_def: "uprod A B == UN x:A. UN y:B. { Scons x y }"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	85	usum_def: "usum A B == In0`A Un In1`B"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	86
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	87	(the corresponding eliminators)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	88	Split_def: "Split c M == THE u. EX x y. M = Scons x y & u = c x y"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	89
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	90	Case_def: "Case c d M == THE u. (EX x . M = In0(x) & u = c(x))
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	91	\| (EX y . M = In1(y) & u = d(y))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	92
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	93
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	94	( equality for the "universe" )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	95
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	96	dprod_def: "dprod r s == UN (x,x'):r. UN (y,y'):s. {(Scons x y, Scons x' y')}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	97
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	98	dsum_def: "dsum r s == (UN (x,x'):r. {(In0(x),In0(x'))}) Un
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	99	(UN (y,y'):s. {(In1(y),In1(y'))})"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	100
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	101
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	102
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	103	( apfst -- can be used in similar type definitions )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	104
22886 cdff6ef76009 moved recfun_codegen.ML to Code_Generator.thy haftmann parents: 22782 diff changeset	105	lemma apfst_conv [simp, code]: "apfst f (a, b) = (f a, b)"
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	106	by (simp add: apfst_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	107
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	108
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	109	lemma apfst_convE:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	110	"[\| q = apfst f p; !!x y. [\| p = (x,y); q = (f(x),y) \|] ==> R
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	111	\|] ==> R"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	112	by (force simp add: apfst_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	113
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	114	( Push -- an injection, analogous to Cons on lists )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	115
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	116	lemma Push_inject1: "Push i f = Push j g ==> i=j"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	117	apply (simp add: Push_def expand_fun_eq)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	118	apply (drule_tac x=0 in spec, simp)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	119	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	120
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	121	lemma Push_inject2: "Push i f = Push j g ==> f=g"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	122	apply (auto simp add: Push_def expand_fun_eq)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	123	apply (drule_tac x="Suc x" in spec, simp)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	124	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	125
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	126	lemma Push_inject:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	127	"[\| Push i f =Push j g; [\| i=j; f=g \|] ==> P \|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	128	by (blast dest: Push_inject1 Push_inject2)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	129
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	130	lemma Push_neq_K0: "Push (Inr (Suc k)) f = (%z. Inr 0) ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	131	by (auto simp add: Push_def expand_fun_eq split: nat.split_asm)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	132
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	133	lemmas Abs_Node_inj = Abs_Node_inject [THEN [2] rev_iffD1, standard]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	134
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	135
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	136	(* Introduction rules for Node *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	137
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	138	lemma Node_K0_I: "(%k. Inr 0, a) : Node"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	139	by (simp add: Node_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	140
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	141	lemma Node_Push_I: "p: Node ==> apfst (Push i) p : Node"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	142	apply (simp add: Node_def Push_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	143	apply (fast intro!: apfst_conv nat_case_Suc [THEN trans])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	144	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	145
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	146
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	147	subsection{Freeness: Distinctness of Constructors}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	148
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	149	( Scons vs Atom )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	150
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	151	lemma Scons_not_Atom [iff]: "Scons M N \<noteq> Atom(a)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	152	apply (simp add: Atom_def Scons_def Push_Node_def One_nat_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	153	apply (blast intro: Node_K0_I Rep_Node [THEN Node_Push_I]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	154	dest!: Abs_Node_inj
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	155	elim!: apfst_convE sym [THEN Push_neq_K0])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	156	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	157
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	158	lemmas Atom_not_Scons [iff] = Scons_not_Atom [THEN not_sym, standard]
af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	159
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	160
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	161	(* Injectiveness *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	162
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	163	( Atomic nodes )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	164
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	165	lemma inj_Atom: "inj(Atom)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	166	apply (simp add: Atom_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	167	apply (blast intro!: inj_onI Node_K0_I dest!: Abs_Node_inj)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	168	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	169	lemmas Atom_inject = inj_Atom [THEN injD, standard]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	170
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	171	lemma Atom_Atom_eq [iff]: "(Atom(a)=Atom(b)) = (a=b)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	172	by (blast dest!: Atom_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	173
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	174	lemma inj_Leaf: "inj(Leaf)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	175	apply (simp add: Leaf_def o_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	176	apply (rule inj_onI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	177	apply (erule Atom_inject [THEN Inl_inject])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	178	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	179
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	180	lemmas Leaf_inject [dest!] = inj_Leaf [THEN injD, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	181
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	182	lemma inj_Numb: "inj(Numb)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	183	apply (simp add: Numb_def o_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	184	apply (rule inj_onI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	185	apply (erule Atom_inject [THEN Inr_inject])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	186	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	187
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	188	lemmas Numb_inject [dest!] = inj_Numb [THEN injD, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	189
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	190
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	191	( Injectiveness of Push_Node )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	192
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	193	lemma Push_Node_inject:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	194	"[\| Push_Node i m =Push_Node j n; [\| i=j; m=n \|] ==> P
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	195	\|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	196	apply (simp add: Push_Node_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	197	apply (erule Abs_Node_inj [THEN apfst_convE])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	198	apply (rule Rep_Node [THEN Node_Push_I])+
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	199	apply (erule sym [THEN apfst_convE])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	200	apply (blast intro: Rep_Node_inject [THEN iffD1] trans sym elim!: Push_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	201	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	202
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	203
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	204	( Injectiveness of Scons )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	205
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	206	lemma Scons_inject_lemma1: "Scons M N <= Scons M' N' ==> M<=M'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	207	apply (simp add: Scons_def One_nat_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	208	apply (blast dest!: Push_Node_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	209	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	210
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	211	lemma Scons_inject_lemma2: "Scons M N <= Scons M' N' ==> N<=N'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	212	apply (simp add: Scons_def One_nat_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	213	apply (blast dest!: Push_Node_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	214	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	215
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	216	lemma Scons_inject1: "Scons M N = Scons M' N' ==> M=M'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	217	apply (erule equalityE)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	218	apply (iprover intro: equalityI Scons_inject_lemma1)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	219	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	220
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	221	lemma Scons_inject2: "Scons M N = Scons M' N' ==> N=N'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	222	apply (erule equalityE)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	223	apply (iprover intro: equalityI Scons_inject_lemma2)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	224	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	225
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	226	lemma Scons_inject:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	227	"[\| Scons M N = Scons M' N'; [\| M=M'; N=N' \|] ==> P \|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	228	by (iprover dest: Scons_inject1 Scons_inject2)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	229
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	230	lemma Scons_Scons_eq [iff]: "(Scons M N = Scons M' N') = (M=M' & N=N')"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	231	by (blast elim!: Scons_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	232
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	233	(* Distinctness involving Leaf and Numb *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	234
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	235	( Scons vs Leaf )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	236
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	237	lemma Scons_not_Leaf [iff]: "Scons M N \<noteq> Leaf(a)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	238	by (simp add: Leaf_def o_def Scons_not_Atom)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	239
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	240	lemmas Leaf_not_Scons [iff] = Scons_not_Leaf [THEN not_sym, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	241
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	242	( Scons vs Numb )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	243
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	244	lemma Scons_not_Numb [iff]: "Scons M N \<noteq> Numb(k)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	245	by (simp add: Numb_def o_def Scons_not_Atom)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	246
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	247	lemmas Numb_not_Scons [iff] = Scons_not_Numb [THEN not_sym, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	248
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	249
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	250	( Leaf vs Numb )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	251
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	252	lemma Leaf_not_Numb [iff]: "Leaf(a) \<noteq> Numb(k)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	253	by (simp add: Leaf_def Numb_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	254
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	255	lemmas Numb_not_Leaf [iff] = Leaf_not_Numb [THEN not_sym, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	256
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	257
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	258	(* ndepth -- the depth of a node *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	259
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	260	lemma ndepth_K0: "ndepth (Abs_Node(%k. Inr 0, x)) = 0"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	261	by (simp add: ndepth_def Node_K0_I [THEN Abs_Node_inverse] Least_equality)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	262
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	263	lemma ndepth_Push_Node_aux:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	264	"nat_case (Inr (Suc i)) f k = Inr 0 --> Suc(LEAST x. f x = Inr 0) <= k"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	265	apply (induct_tac "k", auto)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	266	apply (erule Least_le)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	267	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	268
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	269	lemma ndepth_Push_Node:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	270	"ndepth (Push_Node (Inr (Suc i)) n) = Suc(ndepth(n))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	271	apply (insert Rep_Node [of n, unfolded Node_def])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	272	apply (auto simp add: ndepth_def Push_Node_def
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	273	Rep_Node [THEN Node_Push_I, THEN Abs_Node_inverse])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	274	apply (rule Least_equality)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	275	apply (auto simp add: Push_def ndepth_Push_Node_aux)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	276	apply (erule LeastI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	277	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	278
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	279
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	280	(* ntrunc applied to the various node sets *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	281
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	282	lemma ntrunc_0 [simp]: "ntrunc 0 M = {}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	283	by (simp add: ntrunc_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	284
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	285	lemma ntrunc_Atom [simp]: "ntrunc (Suc k) (Atom a) = Atom(a)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	286	by (auto simp add: Atom_def ntrunc_def ndepth_K0)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	287
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	288	lemma ntrunc_Leaf [simp]: "ntrunc (Suc k) (Leaf a) = Leaf(a)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	289	by (simp add: Leaf_def o_def ntrunc_Atom)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	290
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	291	lemma ntrunc_Numb [simp]: "ntrunc (Suc k) (Numb i) = Numb(i)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	292	by (simp add: Numb_def o_def ntrunc_Atom)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	293
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	294	lemma ntrunc_Scons [simp]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	295	"ntrunc (Suc k) (Scons M N) = Scons (ntrunc k M) (ntrunc k N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	296	by (auto simp add: Scons_def ntrunc_def One_nat_def ndepth_Push_Node)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	297
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	298
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	299
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	300	( Injection nodes )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	301
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	302	lemma ntrunc_one_In0 [simp]: "ntrunc (Suc 0) (In0 M) = {}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	303	apply (simp add: In0_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	304	apply (simp add: Scons_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	305	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	306
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	307	lemma ntrunc_In0 [simp]: "ntrunc (Suc(Suc k)) (In0 M) = In0 (ntrunc (Suc k) M)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	308	by (simp add: In0_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	309
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	310	lemma ntrunc_one_In1 [simp]: "ntrunc (Suc 0) (In1 M) = {}"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	311	apply (simp add: In1_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	312	apply (simp add: Scons_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	313	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	314
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	315	lemma ntrunc_In1 [simp]: "ntrunc (Suc(Suc k)) (In1 M) = In1 (ntrunc (Suc k) M)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	316	by (simp add: In1_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	317
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	318
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	319	subsection{Set Constructions}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	320
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	321
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	322	(* Cartesian Product *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	323
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	324	lemma uprodI [intro!]: "[\| M:A; N:B \|] ==> Scons M N : uprod A B"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	325	by (simp add: uprod_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	326
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	327	(The general elimination rule)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	328	lemma uprodE [elim!]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	329	"[\| c : uprod A B;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	330	!!x y. [\| x:A; y:B; c = Scons x y \|] ==> P
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	331	\|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	332	by (auto simp add: uprod_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	333
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	334
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	335	(Elimination of a pair -- introduces no eigenvariables)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	336	lemma uprodE2: "[\| Scons M N : uprod A B; [\| M:A; N:B \|] ==> P \|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	337	by (auto simp add: uprod_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	338
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	339
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	340	(* Disjoint Sum *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	341
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	342	lemma usum_In0I [intro]: "M:A ==> In0(M) : usum A B"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	343	by (simp add: usum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	344
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	345	lemma usum_In1I [intro]: "N:B ==> In1(N) : usum A B"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	346	by (simp add: usum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	347
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	348	lemma usumE [elim!]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	349	"[\| u : usum A B;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	350	!!x. [\| x:A; u=In0(x) \|] ==> P;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	351	!!y. [\| y:B; u=In1(y) \|] ==> P
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	352	\|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	353	by (auto simp add: usum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	354
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	355
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	356	( Injection )
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	357
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	358	lemma In0_not_In1 [iff]: "In0(M) \<noteq> In1(N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	359	by (auto simp add: In0_def In1_def One_nat_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	360
21407 af60523da908 reduced verbosity haftmann parents: 21404 diff changeset	361	lemmas In1_not_In0 [iff] = In0_not_In1 [THEN not_sym, standard]
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	362
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	363	lemma In0_inject: "In0(M) = In0(N) ==> M=N"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	364	by (simp add: In0_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	365
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	366	lemma In1_inject: "In1(M) = In1(N) ==> M=N"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	367	by (simp add: In1_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	368
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	369	lemma In0_eq [iff]: "(In0 M = In0 N) = (M=N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	370	by (blast dest!: In0_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	371
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	372	lemma In1_eq [iff]: "(In1 M = In1 N) = (M=N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	373	by (blast dest!: In1_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	374
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	375	lemma inj_In0: "inj In0"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	376	by (blast intro!: inj_onI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	377
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	378	lemma inj_In1: "inj In1"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	379	by (blast intro!: inj_onI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	380
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	381
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	382	(* Function spaces *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	383
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	384	lemma Lim_inject: "Lim f = Lim g ==> f = g"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	385	apply (simp add: Lim_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	386	apply (rule ext)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	387	apply (blast elim!: Push_Node_inject)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	388	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	389
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	390
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	391	(* proving equality of sets and functions using ntrunc *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	392
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	393	lemma ntrunc_subsetI: "ntrunc k M <= M"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	394	by (auto simp add: ntrunc_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	395
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	396	lemma ntrunc_subsetD: "(!!k. ntrunc k M <= N) ==> M<=N"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	397	by (auto simp add: ntrunc_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	398
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	399	(A generalized form of the take-lemma)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	400	lemma ntrunc_equality: "(!!k. ntrunc k M = ntrunc k N) ==> M=N"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	401	apply (rule equalityI)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	402	apply (rule_tac [!] ntrunc_subsetD)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	403	apply (rule_tac [!] ntrunc_subsetI [THEN [2] subset_trans], auto)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	404	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	405
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	406	lemma ntrunc_o_equality:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	407	"[\| !!k. (ntrunc(k) o h1) = (ntrunc(k) o h2) \|] ==> h1=h2"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	408	apply (rule ntrunc_equality [THEN ext])
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	409	apply (simp add: expand_fun_eq)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	410	done
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	411
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	412
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	413	(* Monotonicity *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	414
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	415	lemma uprod_mono: "[\| A<=A'; B<=B' \|] ==> uprod A B <= uprod A' B'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	416	by (simp add: uprod_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	417
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	418	lemma usum_mono: "[\| A<=A'; B<=B' \|] ==> usum A B <= usum A' B'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	419	by (simp add: usum_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	420
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	421	lemma Scons_mono: "[\| M<=M'; N<=N' \|] ==> Scons M N <= Scons M' N'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	422	by (simp add: Scons_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	423
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	424	lemma In0_mono: "M<=N ==> In0(M) <= In0(N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	425	by (simp add: In0_def subset_refl Scons_mono)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	426
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	427	lemma In1_mono: "M<=N ==> In1(M) <= In1(N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	428	by (simp add: In1_def subset_refl Scons_mono)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	429
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	430
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	431	(* Split and Case *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	432
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	433	lemma Split [simp]: "Split c (Scons M N) = c M N"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	434	by (simp add: Split_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	435
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	436	lemma Case_In0 [simp]: "Case c d (In0 M) = c(M)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	437	by (simp add: Case_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	438
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	439	lemma Case_In1 [simp]: "Case c d (In1 N) = d(N)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	440	by (simp add: Case_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	441
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	442
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	443
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	444	(** UN x. B(x) rules **)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	445
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	446	lemma ntrunc_UN1: "ntrunc k (UN x. f(x)) = (UN x. ntrunc k (f x))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	447	by (simp add: ntrunc_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	448
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	449	lemma Scons_UN1_x: "Scons (UN x. f x) M = (UN x. Scons (f x) M)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	450	by (simp add: Scons_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	451
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	452	lemma Scons_UN1_y: "Scons M (UN x. f x) = (UN x. Scons M (f x))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	453	by (simp add: Scons_def, blast)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	454
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	455	lemma In0_UN1: "In0(UN x. f(x)) = (UN x. In0(f(x)))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	456	by (simp add: In0_def Scons_UN1_y)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	457
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	458	lemma In1_UN1: "In1(UN x. f(x)) = (UN x. In1(f(x)))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	459	by (simp add: In1_def Scons_UN1_y)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	460
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	461
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	462	(* Equality for Cartesian Product *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	463
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	464	lemma dprodI [intro!]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	465	"[\| (M,M'):r; (N,N'):s \|] ==> (Scons M N, Scons M' N') : dprod r s"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	466	by (auto simp add: dprod_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	467
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	468	(The general elimination rule)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	469	lemma dprodE [elim!]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	470	"[\| c : dprod r s;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	471	!!x y x' y'. [\| (x,x') : r; (y,y') : s;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	472	c = (Scons x y, Scons x' y') \|] ==> P
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	473	\|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	474	by (auto simp add: dprod_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	475
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	476
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	477	(* Equality for Disjoint Sum *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	478
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	479	lemma dsum_In0I [intro]: "(M,M'):r ==> (In0(M), In0(M')) : dsum r s"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	480	by (auto simp add: dsum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	481
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	482	lemma dsum_In1I [intro]: "(N,N'):s ==> (In1(N), In1(N')) : dsum r s"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	483	by (auto simp add: dsum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	484
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	485	lemma dsumE [elim!]:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	486	"[\| w : dsum r s;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	487	!!x x'. [\| (x,x') : r; w = (In0(x), In0(x')) \|] ==> P;
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	488	!!y y'. [\| (y,y') : s; w = (In1(y), In1(y')) \|] ==> P
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	489	\|] ==> P"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	490	by (auto simp add: dsum_def)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	491
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	492
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	493	(* Monotonicity *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	494
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	495	lemma dprod_mono: "[\| r<=r'; s<=s' \|] ==> dprod r s <= dprod r' s'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	496	by blast
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	497
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	498	lemma dsum_mono: "[\| r<=r'; s<=s' \|] ==> dsum r s <= dsum r' s'"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	499	by blast
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	500
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	501
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	502	(* Bounding theorems *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	503
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	504	lemma dprod_Sigma: "(dprod (A <> B) (C <> D)) <= (uprod A C) <*> (uprod B D)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	505	by blast
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	506
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	507	lemmas dprod_subset_Sigma = subset_trans [OF dprod_mono dprod_Sigma, standard]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	508
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	509	(Dependent version)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	510	lemma dprod_subset_Sigma2:
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	511	"(dprod (Sigma A B) (Sigma C D)) <=
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	512	Sigma (uprod A C) (Split (%x y. uprod (B x) (D y)))"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	513	by auto
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	514
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	515	lemma dsum_Sigma: "(dsum (A <> B) (C <> D)) <= (usum A C) <*> (usum B D)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	516	by blast
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	517
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	518	lemmas dsum_subset_Sigma = subset_trans [OF dsum_mono dsum_Sigma, standard]
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	519
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	520
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	521	(* Domain *)
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	522
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	523	lemma Domain_dprod [simp]: "Domain (dprod r s) = uprod (Domain r) (Domain s)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	524	by auto
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	525
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	526	lemma Domain_dsum [simp]: "Domain (dsum r s) = usum (Domain r) (Domain s)"
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	527	by auto
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	528
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	529
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	530	subsection {* Finishing the datatype package setup *}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	531
20847 7e8c724339e0 clarified setup name haftmann parents: 20819 diff changeset	532	setup "DatatypeCodegen.setup_hooks"
24162 8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	533	text {* hides popular names *}
8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	534	hide (open) type node item
20819 cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	535	hide (open) const Push Node Atom Leaf Numb Lim Split Case
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	536
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	537
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	538	section {* Datatypes *}
cb6ae81dd0be merged with theory Datatype_Universe; wenzelm parents: 20798 diff changeset	539
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	540	subsection {* Representing primitive types *}
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	541
24194 96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	542	rep_datatype bool
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	543	distinct True_not_False False_not_True
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	544	induction bool_induct
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	545
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	546	declare case_split [cases type: bool]
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	547	-- "prefer plain propositional version"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	548
24194 96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	549	lemma size_bool [code func]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	550	"size (b\<Colon>bool) = 0" by (cases b) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	551
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	552	rep_datatype unit
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	553	induction unit_induct
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	554
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	555	rep_datatype prod
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	556	inject Pair_eq
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	557	induction prod_induct
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	558
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24194 diff changeset	559	declare prod.size [noatp]
7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24194 diff changeset	560
22782 8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	561	lemmas prod_caseI = prod.cases [THEN iffD2, standard]
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	562
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	563	lemma prod_caseI2: "!!p. [\| !!a b. p = (a, b) ==> c a b \|] ==> prod_case c p"
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	564	by auto
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	565
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	566	lemma prod_caseI2': "!!p. [\| !!a b. (a, b) = p ==> c a b x \|] ==> prod_case c p x"
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	567	by (auto simp: split_tupled_all)
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	568
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	569	lemma prod_caseE: "prod_case c p ==> (!!x y. p = (x, y) ==> c x y ==> Q) ==> Q"
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	570	by (induct p) auto
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	571
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	572	lemma prod_caseE': "prod_case c p z ==> (!!x y. p = (x, y) ==> c x y z ==> Q) ==> Q"
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	573	by (induct p) auto
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	574
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	575	lemma prod_case_unfold: "prod_case = (%c p. c (fst p) (snd p))"
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	576	by (simp add: expand_fun_eq)
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	577
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	578	declare prod_caseI2' [intro!] prod_caseI2 [intro!] prod_caseI [intro!]
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	579	declare prod_caseE' [elim!] prod_caseE [elim!]
8bc6fbbe1d0f Added intro / elim rules for prod_case. berghofe parents: 22744 diff changeset	580
24162 8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	581	lemma prod_case_split [code post]:
8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	582	"prod_case = split"
8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	583	by (auto simp add: expand_fun_eq)
8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	584
8dfd5dd65d82 split off theory Option for benefit of code generator haftmann parents: 22886 diff changeset	585	lemmas [code inline] = prod_case_split [symmetric]
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	586
24194 96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	587	rep_datatype sum
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	588	distinct Inl_not_Inr Inr_not_Inl
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	589	inject Inl_eq Inr_eq
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	590	induction sum_induct
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	591
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	592	lemma size_sum [code func]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	593	"size (x \<Colon> 'a + 'b) = 0" by (cases x) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	594
22230 bdec4a82f385 a few additions and deletions nipkow parents: 21905 diff changeset	595	lemma sum_case_KK[simp]: "sum_case (%x. a) (%x. a) = (%x. a)"
bdec4a82f385 a few additions and deletions nipkow parents: 21905 diff changeset	596	by (rule ext) (simp split: sum.split)
bdec4a82f385 a few additions and deletions nipkow parents: 21905 diff changeset	597
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	598	lemma surjective_sum: "sum_case (%x::'a. f (Inl x)) (%y::'b. f (Inr y)) s = f(s)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	599	apply (rule_tac s = s in sumE)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	600	apply (erule ssubst)
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	601	apply (rule sum.cases(1))
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	602	apply (erule ssubst)
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	603	apply (rule sum.cases(2))
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	604	done
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	605
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	606	lemma sum_case_weak_cong: "s = t ==> sum_case f g s = sum_case f g t"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	607	-- {* Prevents simplification of @{text f} and @{text g}: much faster. *}
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	608	by simp
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	609
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	610	lemma sum_case_inject:
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	611	"sum_case f1 f2 = sum_case g1 g2 ==> (f1 = g1 ==> f2 = g2 ==> P) ==> P"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	612	proof -
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	613	assume a: "sum_case f1 f2 = sum_case g1 g2"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	614	assume r: "f1 = g1 ==> f2 = g2 ==> P"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	615	show P
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	616	apply (rule r)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	617	apply (rule ext)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	618	apply (cut_tac x = "Inl x" in a [THEN fun_cong], simp)
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	619	apply (rule ext)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	620	apply (cut_tac x = "Inr x" in a [THEN fun_cong], simp)
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	621	done
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	622	qed
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	623
13635 c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	624	constdefs
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	625	Suml :: "('a => 'c) => 'a + 'b => 'c"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	626	"Suml == (%f. sum_case f arbitrary)"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	627
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	628	Sumr :: "('b => 'c) => 'a + 'b => 'c"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	629	"Sumr == sum_case arbitrary"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	630
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	631	lemma Suml_inject: "Suml f = Suml g ==> f = g"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	632	by (unfold Suml_def) (erule sum_case_inject)
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	633
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	634	lemma Sumr_inject: "Sumr f = Sumr g ==> f = g"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	635	by (unfold Sumr_def) (erule sum_case_inject)
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	636
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	637	hide (open) const Suml Sumr
13635 c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	638
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	639
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	640	subsection {* Further cases/induct rules for tuples *}
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	641
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	642	lemma prod_cases3 [cases type]:
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	643	obtains (fields) a b c where "y = (a, b, c)"
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	644	by (cases y, case_tac b) blast
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	645
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	646	lemma prod_induct3 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	647	"(!!a b c. P (a, b, c)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	648	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	649
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	650	lemma prod_cases4 [cases type]:
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	651	obtains (fields) a b c d where "y = (a, b, c, d)"
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	652	by (cases y, case_tac c) blast
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	653
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	654	lemma prod_induct4 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	655	"(!!a b c d. P (a, b, c, d)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	656	by (cases x) blast
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	657
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	658	lemma prod_cases5 [cases type]:
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	659	obtains (fields) a b c d e where "y = (a, b, c, d, e)"
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	660	by (cases y, case_tac d) blast
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	661
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	662	lemma prod_induct5 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	663	"(!!a b c d e. P (a, b, c, d, e)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	664	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	665
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	666	lemma prod_cases6 [cases type]:
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	667	obtains (fields) a b c d e f where "y = (a, b, c, d, e, f)"
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	668	by (cases y, case_tac e) blast
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	669
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	670	lemma prod_induct6 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	671	"(!!a b c d e f. P (a, b, c, d, e, f)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	672	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	673
20798 3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	674	lemma prod_cases7 [cases type]:
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	675	obtains (fields) a b c d e f g where "y = (a, b, c, d, e, f, g)"
3275b03e2fff removed obsolete sum_case_Inl/Inr; wenzelm parents: 20588 diff changeset	676	by (cases y, case_tac f) blast
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	677
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	678	lemma prod_induct7 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	679	"(!!a b c d e f g. P (a, b, c, d, e, f, g)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	680	by (cases x) blast
5759 bf5d9e5b8cdf unit and bool are now represented as datatypes. berghofe parents: 5714 diff changeset	681
24194 96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	682
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	683	subsection {* The option datatype *}
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	684
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	685	datatype 'a option = None \| Some 'a
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	686
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	687	lemma not_None_eq [iff]: "(x ~= None) = (EX y. x = Some y)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	688	by (induct x) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	689
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	690	lemma not_Some_eq [iff]: "(ALL y. x ~= Some y) = (x = None)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	691	by (induct x) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	692
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	693	text{*Although it may appear that both of these equalities are helpful
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	694	only when applied to assumptions, in practice it seems better to give
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	695	them the uniform iff attribute. *}
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	696
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	697	lemma option_caseE:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	698	assumes c: "(case x of None => P \| Some y => Q y)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	699	obtains
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	700	(None) "x = None" and P
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	701	\| (Some) y where "x = Some y" and "Q y"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	702	using c by (cases x) simp_all
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	703
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	704
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	705	subsubsection {* Operations *}
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	706
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	707	consts
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	708	the :: "'a option => 'a"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	709	primrec
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	710	"the (Some x) = x"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	711
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	712	consts
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	713	o2s :: "'a option => 'a set"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	714	primrec
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	715	"o2s None = {}"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	716	"o2s (Some x) = {x}"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	717
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	718	lemma ospec [dest]: "(ALL x:o2s A. P x) ==> A = Some x ==> P x"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	719	by simp
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	720
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	721	ML_setup {* change_claset (fn cs => cs addSD2 ("ospec", thm "ospec")) *}
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	722
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	723	lemma elem_o2s [iff]: "(x : o2s xo) = (xo = Some x)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	724	by (cases xo) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	725
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	726	lemma o2s_empty_eq [simp]: "(o2s xo = {}) = (xo = None)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	727	by (cases xo) auto
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	728
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	729
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	730	constdefs
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	731	option_map :: "('a => 'b) => ('a option => 'b option)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	732	"option_map == %f y. case y of None => None \| Some x => Some (f x)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	733
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	734	lemmas [code func del] = option_map_def
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	735
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	736	lemma option_map_None [simp, code]: "option_map f None = None"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	737	by (simp add: option_map_def)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	738
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	739	lemma option_map_Some [simp, code]: "option_map f (Some x) = Some (f x)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	740	by (simp add: option_map_def)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	741
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	742	lemma option_map_is_None [iff]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	743	"(option_map f opt = None) = (opt = None)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	744	by (simp add: option_map_def split add: option.split)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	745
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	746	lemma option_map_eq_Some [iff]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	747	"(option_map f xo = Some y) = (EX z. xo = Some z & f z = y)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	748	by (simp add: option_map_def split add: option.split)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	749
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	750	lemma option_map_comp:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	751	"option_map f (option_map g opt) = option_map (f o g) opt"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	752	by (simp add: option_map_def split add: option.split)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	753
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	754	lemma option_map_o_sum_case [simp]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	755	"option_map f o sum_case g h = sum_case (option_map f o g) (option_map f o h)"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	756	by (rule ext) (simp split: sum.split)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	757
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	758
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	759	subsubsection {* Code generator setup *}
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	760
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	761	definition
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	762	is_none :: "'a option \<Rightarrow> bool" where
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	763	is_none_none [code post, symmetric, code inline]: "is_none x \<longleftrightarrow> x = None"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	764
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	765	lemma is_none_code [code]:
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	766	shows "is_none None \<longleftrightarrow> True"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	767	and "is_none (Some x) \<longleftrightarrow> False"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	768	unfolding is_none_none [symmetric] by simp_all
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	769
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	770	hide (open) const is_none
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	771
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	772	code_type option
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	773	(SML "_ option")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	774	(OCaml "_ option")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	775	(Haskell "Maybe _")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	776
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	777	code_const None and Some
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	778	(SML "NONE" and "SOME")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	779	(OCaml "None" and "Some _")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	780	(Haskell "Nothing" and "Just")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	781
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	782	code_instance option :: eq
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	783	(Haskell -)
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	784
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	785	code_const "op = \<Colon> 'a\<Colon>eq option \<Rightarrow> 'a option \<Rightarrow> bool"
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	786	(Haskell infixl 4 "==")
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	787
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	788	code_reserved SML
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	789	option NONE SOME
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	790
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	791	code_reserved OCaml
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	792	option None Some
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	793
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	794	code_modulename SML
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	795	Datatype Nat
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	796
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	797	code_modulename OCaml
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	798	Datatype Nat
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	799
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	800	code_modulename Haskell
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	801	Datatype Nat
96013f81faef re-eliminated Option.thy haftmann parents: 24162 diff changeset	802
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	803	end

author	paulson
	Wed, 15 Aug 2007 12:52:56 +0200
changeset 24286	7619080e49f0
parent 24194	96013f81faef
child 24699	c6674504103f
permissions	-rw-r--r--