isabelle: src/HOL/Library/Bit.thy@615da8b8d758 (annotated)

41959 b460124855b8 tuned headers; wenzelm parents: 36409 diff changeset	1	(* Title: HOL/Library/Bit.thy
b460124855b8 tuned headers; wenzelm parents: 36409 diff changeset	2	Author: Brian Huffman
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	3	*)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	4
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	5	header {* The Field of Integers mod 2 *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	6
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	7	theory Bit
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	8	imports Main
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	9	begin
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	10
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	11	subsection {* Bits as a datatype *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	12
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	13	typedef (open) bit = "UNIV :: bool set" ..
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	14
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	15	instantiation bit :: "{zero, one}"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	16	begin
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	17
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	18	definition zero_bit_def:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	19	"0 = Abs_bit False"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	20
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	21	definition one_bit_def:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	22	"1 = Abs_bit True"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	23
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	24	instance ..
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	25
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	26	end
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	27
45701 615da8b8d758 discontinued obsolete datatype "alt_names"; wenzelm parents: 41959 diff changeset	28	rep_datatype "0::bit" "1::bit"
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	29	proof -
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	30	fix P and x :: bit
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	31	assume "P (0::bit)" and "P (1::bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	32	then have "\<forall>b. P (Abs_bit b)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	33	unfolding zero_bit_def one_bit_def
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	34	by (simp add: all_bool_eq)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	35	then show "P x"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	36	by (induct x) simp
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	37	next
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	38	show "(0::bit) \<noteq> (1::bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	39	unfolding zero_bit_def one_bit_def
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	40	by (simp add: Abs_bit_inject)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	41	qed
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	42
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	43	lemma bit_not_0_iff [iff]: "(x::bit) \<noteq> 0 \<longleftrightarrow> x = 1"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	44	by (induct x) simp_all
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	45
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	46	lemma bit_not_1_iff [iff]: "(x::bit) \<noteq> 1 \<longleftrightarrow> x = 0"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	47	by (induct x) simp_all
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	48
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	49
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	50	subsection {* Type @{typ bit} forms a field *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	51
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	52	instantiation bit :: field_inverse_zero
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	53	begin
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	54
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	55	definition plus_bit_def:
31212 a94aea0cef76 eliminated case input syntax on bits haftmann parents: 30129 diff changeset	56	"x + y = bit_case y (bit_case 1 0 y) x"
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	57
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	58	definition times_bit_def:
31212 a94aea0cef76 eliminated case input syntax on bits haftmann parents: 30129 diff changeset	59	"x * y = bit_case 0 y x"
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	60
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	61	definition uminus_bit_def [simp]:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	62	"- x = (x :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	63
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	64	definition minus_bit_def [simp]:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	65	"x - y = (x + y :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	66
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	67	definition inverse_bit_def [simp]:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	68	"inverse x = (x :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	69
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	70	definition divide_bit_def [simp]:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	71	"x / y = (x * y :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	72
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	73	lemmas field_bit_defs =
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	74	plus_bit_def times_bit_def minus_bit_def uminus_bit_def
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	75	divide_bit_def inverse_bit_def
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	76
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	77	instance proof
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	78	qed (unfold field_bit_defs, auto split: bit.split)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	79
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	80	end
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	81
30129 419116f1157a remove unnecessary simp rules huffman parents: 29995 diff changeset	82	lemma bit_add_self: "x + x = (0 :: bit)"
419116f1157a remove unnecessary simp rules huffman parents: 29995 diff changeset	83	unfolding plus_bit_def by (simp split: bit.split)
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	84
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	85	lemma bit_mult_eq_1_iff [simp]: "x * y = (1 :: bit) \<longleftrightarrow> x = 1 \<and> y = 1"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	86	unfolding times_bit_def by (simp split: bit.split)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	87
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	88	text {* Not sure whether the next two should be simp rules. *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	89
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	90	lemma bit_add_eq_0_iff: "x + y = (0 :: bit) \<longleftrightarrow> x = y"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	91	unfolding plus_bit_def by (simp split: bit.split)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	92
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	93	lemma bit_add_eq_1_iff: "x + y = (1 :: bit) \<longleftrightarrow> x \<noteq> y"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	94	unfolding plus_bit_def by (simp split: bit.split)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	95
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	96
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	97	subsection {* Numerals at type @{typ bit} *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	98
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	99	instantiation bit :: number_ring
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	100	begin
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	101
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	102	definition number_of_bit_def:
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	103	"(number_of w :: bit) = of_int w"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	104
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	105	instance proof
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	106	qed (rule number_of_bit_def)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	107
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	108	end
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	109
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	110	text {* All numerals reduce to either 0 or 1. *}
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	111
29995 62efbd0ef132 add rule for minus 1 at type bit huffman parents: 29994 diff changeset	112	lemma bit_minus1 [simp]: "-1 = (1 :: bit)"
62efbd0ef132 add rule for minus 1 at type bit huffman parents: 29994 diff changeset	113	by (simp only: number_of_Min uminus_bit_def)
62efbd0ef132 add rule for minus 1 at type bit huffman parents: 29994 diff changeset	114
29994 6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	115	lemma bit_number_of_even [simp]: "number_of (Int.Bit0 w) = (0 :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	116	by (simp only: number_of_Bit0 add_0_left bit_add_self)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	117
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	118	lemma bit_number_of_odd [simp]: "number_of (Int.Bit1 w) = (1 :: bit)"
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	119	by (simp only: number_of_Bit1 add_assoc bit_add_self
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	120	monoid_add_class.add_0_right)
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	121
6ca6b6bd6e15 add formalization of a type of integers mod 2 to Library huffman parents: diff changeset	122	end

author	wenzelm
	Wed, 30 Nov 2011 23:30:08 +0100
changeset 45701	615da8b8d758
parent 41959	b460124855b8
child 47108	2a1953f0d20d
permissions	-rw-r--r--