isabelle: src/HOL/Word/Misc_Numeric.thy@88ccc0ae310c (annotated)

24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	1	(*
e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	2	Author: Jeremy Dawson, NICTA
24350 4d74f37c6367 headers for document generation huffman parents: 24333 diff changeset	3	*)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	4
58874 7172c7ffb047 modernized header; wenzelm parents: 58770 diff changeset	5	section {* Useful Numerical Lemmas *}
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	6
37655 f4d616d41a59 more speaking theory names haftmann parents: 37591 diff changeset	7	theory Misc_Numeric
58770 ae5e9b4f8daf downshift of theory Parity in the hierarchy haftmann parents: 58740 diff changeset	8	imports Main
25592 e8ddaf6bf5df explicit import of theory Main haftmann parents: 25349 diff changeset	9	begin
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	10
54847 d6cf9a5b9be9 prefer plain bool over dedicated type for binary digits haftmann parents: 54221 diff changeset	11	lemma mod_2_neq_1_eq_eq_0:
d6cf9a5b9be9 prefer plain bool over dedicated type for binary digits haftmann parents: 54221 diff changeset	12	fixes k :: int
d6cf9a5b9be9 prefer plain bool over dedicated type for binary digits haftmann parents: 54221 diff changeset	13	shows "k mod 2 \<noteq> 1 \<longleftrightarrow> k mod 2 = 0"
54869 0046711700c8 tuned proofs and declarations haftmann parents: 54863 diff changeset	14	by (fact not_mod_2_eq_1_eq_0)
54847 d6cf9a5b9be9 prefer plain bool over dedicated type for binary digits haftmann parents: 54221 diff changeset	15
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	16	lemma z1pmod2:
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	17	fixes b :: int
51612b889361 cleanup haftmann parents: 54869 diff changeset	18	shows "(2 * b + 1) mod 2 = (1::int)"
51612b889361 cleanup haftmann parents: 54869 diff changeset	19	by arith
51612b889361 cleanup haftmann parents: 54869 diff changeset	20
51612b889361 cleanup haftmann parents: 54869 diff changeset	21	lemma diff_le_eq':
51612b889361 cleanup haftmann parents: 54869 diff changeset	22	"a - b \<le> c \<longleftrightarrow> a \<le> b + (c::int)"
54869 0046711700c8 tuned proofs and declarations haftmann parents: 54863 diff changeset	23	by arith
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	24
e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	25	lemma emep1:
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	26	fixes n d :: int
51612b889361 cleanup haftmann parents: 54869 diff changeset	27	shows "even n \<Longrightarrow> even d \<Longrightarrow> 0 \<le> d \<Longrightarrow> (n + 1) mod d = (n mod d) + 1"
58740 cb9d84d3e7f2 turn even into an abbreviation haftmann parents: 58681 diff changeset	28	by (auto simp add: pos_zmod_mult_2 add.commute dvd_def)
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	29
51612b889361 cleanup haftmann parents: 54869 diff changeset	30	lemma int_mod_ge:
51612b889361 cleanup haftmann parents: 54869 diff changeset	31	"a < n \<Longrightarrow> 0 < (n :: int) \<Longrightarrow> a \<le> a mod n"
51612b889361 cleanup haftmann parents: 54869 diff changeset	32	by (metis dual_order.trans le_cases mod_pos_pos_trivial pos_mod_conj)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	33
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	34	lemma int_mod_ge':
51612b889361 cleanup haftmann parents: 54869 diff changeset	35	"b < 0 \<Longrightarrow> 0 < (n :: int) \<Longrightarrow> b + n \<le> b mod n"
51612b889361 cleanup haftmann parents: 54869 diff changeset	36	by (metis add_less_same_cancel2 int_mod_ge mod_add_self2)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	37
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	38	lemma int_mod_le':
51612b889361 cleanup haftmann parents: 54869 diff changeset	39	"(0::int) \<le> b - n \<Longrightarrow> b mod n \<le> b - n"
51612b889361 cleanup haftmann parents: 54869 diff changeset	40	by (metis minus_mod_self2 zmod_le_nonneg_dividend)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	41
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	42	lemma zless2:
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	43	"0 < (2 :: int)"
54869 0046711700c8 tuned proofs and declarations haftmann parents: 54863 diff changeset	44	by (fact zero_less_numeral)
24465 70f0214b3ecc revert to Word library version from 2007/08/20 huffman parents: 24414 diff changeset	45
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	46	lemma zless2p:
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	47	"0 < (2 ^ n :: int)"
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	48	by arith
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	49
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	50	lemma zle2p:
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	51	"0 \<le> (2 ^ n :: int)"
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	52	by arith
24465 70f0214b3ecc revert to Word library version from 2007/08/20 huffman parents: 24414 diff changeset	53
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	54	lemma m1mod2k:
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	55	"- 1 mod 2 ^ n = (2 ^ n - 1 :: int)"
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	56	using zless2p by (rule zmod_minus1)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	57
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	58	lemma p1mod22k':
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	59	fixes b :: int
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	60	shows "(1 + 2 * b) mod (2 * 2 ^ n) = 1 + 2 * (b mod 2 ^ n)"
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	61	using zle2p by (rule pos_zmod_mult_2)
24465 70f0214b3ecc revert to Word library version from 2007/08/20 huffman parents: 24414 diff changeset	62
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	63	lemma p1mod22k:
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	64	fixes b :: int
3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	65	shows "(2 * b + 1) mod (2 * 2 ^ n) = 2 * (b mod 2 ^ n) + 1"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 54872 diff changeset	66	by (simp add: p1mod22k' add.commute)
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	67
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	68	lemma int_mod_lem:
51612b889361 cleanup haftmann parents: 54869 diff changeset	69	"(0 :: int) < n ==> (0 <= b & b < n) = (b mod n = b)"
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	70	apply safe
54871 51612b889361 cleanup haftmann parents: 54869 diff changeset	71	apply (erule (1) mod_pos_pos_trivial)
51612b889361 cleanup haftmann parents: 54869 diff changeset	72	apply (erule_tac [!] subst)
51612b889361 cleanup haftmann parents: 54869 diff changeset	73	apply auto
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	74	done
e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	75
53062 3af1a6020014 some vague grouping of related theorems, with slight tuning of headings and sorting out of dubious lemmas into separate theory haftmann parents: 51301 diff changeset	76	end
24333 e77ea0ea7f2c * HOL-Word: kleing parents: diff changeset	77

author	Lars Noschinski <noschinl@in.tum.de>
	Mon, 18 May 2015 16:59:09 +0200
changeset 60290	88ccc0ae310c
parent 58874	7172c7ffb047
child 61799	4cf66f21b764
permissions	-rw-r--r--