isabelle: src/HOL/Library/Finite_Cartesian_Product.thy@a94aea0cef76 (annotated)

29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	1	(* Title: HOL/Library/Finite_Cartesian_Product
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	2	Author: Amine Chaieb, University of Cambridge
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	3	*)
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	4
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	5	header {* Definition of finite Cartesian product types. *}
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	6
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	7	theory Finite_Cartesian_Product
30661 54858c8ad226 tuned header haftmann parents: 30582 diff changeset	8	imports Main (FIXME: ATP_Linkup is only needed for metis at a few places. We could dispense of that by changing the proofs.)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	9	begin
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	10
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	11	definition hassize (infixr "hassize" 12) where
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	12	"(S hassize n) = (finite S \<and> card S = n)"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	13
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	14	lemma hassize_image_inj: assumes f: "inj_on f S" and S: "S hassize n"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	15	shows "f ` S hassize n"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	16	using f S card_image[OF f]
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	17	by (simp add: hassize_def inj_on_def)
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	18
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	19
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	20	subsection {* Finite Cartesian products, with indexing and lambdas. *}
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	21
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	22	typedef (open Cart)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	23	('a, 'b) "^" (infixl "^" 15)
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	24	= "UNIV :: ('b \<Rightarrow> 'a) set"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	25	morphisms Cart_nth Cart_lambda ..
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	26
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	27	notation Cart_nth (infixl "$" 90)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	28
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	29	notation (xsymbols) Cart_lambda (binder "\<chi>" 10)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	30
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	31	lemma stupid_ext: "(\<forall>x. f x = g x) \<longleftrightarrow> (f = g)"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	32	apply auto
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	33	apply (rule ext)
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	34	apply auto
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	35	done
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	36
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	37	lemma Cart_eq: "((x:: 'a ^ 'b) = y) \<longleftrightarrow> (\<forall>i. x$i = y$i)"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	38	by (simp add: Cart_nth_inject [symmetric] expand_fun_eq)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	39
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	40	lemma Cart_lambda_beta [simp]: "Cart_lambda g $ i = g i"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	41	by (simp add: Cart_lambda_inverse)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	42
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	43	lemma Cart_lambda_unique:
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	44	fixes f :: "'a ^ 'b"
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	45	shows "(\<forall>i. f$i = g i) \<longleftrightarrow> Cart_lambda g = f"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	46	by (auto simp add: Cart_eq)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	47
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	48	lemma Cart_lambda_eta: "(\<chi> i. (g$i)) = g"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	49	by (simp add: Cart_eq)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	50
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	51	text{* A non-standard sum to "paste" Cartesian products. *}
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	52
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	53	definition pastecart :: "'a ^ 'm \<Rightarrow> 'a ^ 'n \<Rightarrow> 'a ^ ('m + 'n)" where
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	54	"pastecart f g = (\<chi> i. case i of Inl a \<Rightarrow> f$a \| Inr b \<Rightarrow> g$b)"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	55
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	56	definition fstcart:: "'a ^('m + 'n) \<Rightarrow> 'a ^ 'm" where
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	57	"fstcart f = (\<chi> i. (f$(Inl i)))"
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	58
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	59	definition sndcart:: "'a ^('m + 'n) \<Rightarrow> 'a ^ 'n" where
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	60	"sndcart f = (\<chi> i. (f$(Inr i)))"
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	61
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	62	lemma nth_pastecart_Inl [simp]: "pastecart f g $ Inl a = f$a"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	63	unfolding pastecart_def by simp
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	64
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	65	lemma nth_pastecart_Inr [simp]: "pastecart f g $ Inr b = g$b"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	66	unfolding pastecart_def by simp
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	67
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	68	lemma nth_fstcart [simp]: "fstcart f $ i = f $ Inl i"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	69	unfolding fstcart_def by simp
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	70
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	71	lemma nth_sndtcart [simp]: "sndcart f $ i = f $ Inr i"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	72	unfolding sndcart_def by simp
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	73
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	74	lemma finite_sum_image: "(UNIV::('a + 'b) set) = range Inl \<union> range Inr"
638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	75	by (auto, case_tac x, auto)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	76
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	77	lemma fstcart_pastecart: "fstcart (pastecart (x::'a ^'m ) (y:: 'a ^ 'n)) = x"
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	78	by (simp add: Cart_eq)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	79
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	80	lemma sndcart_pastecart: "sndcart (pastecart (x::'a ^'m ) (y:: 'a ^ 'n)) = y"
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	81	by (simp add: Cart_eq)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	82
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	83	lemma pastecart_fst_snd: "pastecart (fstcart z) (sndcart z) = z"
30582 638b088bb840 imported patch euclidean huffman parents: 30488 diff changeset	84	by (simp add: Cart_eq pastecart_def fstcart_def sndcart_def split: sum.split)
29835 62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	85
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	86	lemma pastecart_eq: "(x = y) \<longleftrightarrow> (fstcart x = fstcart y) \<and> (sndcart x = sndcart y)"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	87	using pastecart_fst_snd[of x] pastecart_fst_snd[of y] by metis
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	88
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	89	lemma forall_pastecart: "(\<forall>p. P p) \<longleftrightarrow> (\<forall>x y. P (pastecart x y))"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	90	by (metis pastecart_fst_snd fstcart_pastecart sndcart_pastecart)
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	91
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	92	lemma exists_pastecart: "(\<exists>p. P p) \<longleftrightarrow> (\<exists>x y. P (pastecart x y))"
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	93	by (metis pastecart_fst_snd fstcart_pastecart sndcart_pastecart)
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	94
62da280e5d0b A formalization of finite cartesian product types chaieb parents: diff changeset	95	end

author	haftmann
	Wed, 20 May 2009 15:35:12 +0200
changeset 31212	a94aea0cef76
parent 30661	54858c8ad226
permissions	-rw-r--r--