isabelle: src/HOL/Algebra/abstract/RingHomo.thy@a39bb6d42ace (annotated)

35849 b5522b51cb1e standard headers; wenzelm parents: 27541 diff changeset	1	(* Author: Clemens Ballarin, started 15 April 1997
b5522b51cb1e standard headers; wenzelm parents: 27541 diff changeset	2
b5522b51cb1e standard headers; wenzelm parents: 27541 diff changeset	3	Ring homomorphism.
7998 3d0c34795831 Algebra and Polynomial theories, by Clemens Ballarin paulson parents: diff changeset	4	*)
3d0c34795831 Algebra and Polynomial theories, by Clemens Ballarin paulson parents: diff changeset	5
21423 6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	6	header {* Ring homomorphism *}
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	7
27541 9e585e99b494 tuned import haftmann parents: 21423 diff changeset	8	theory RingHomo
9e585e99b494 tuned import haftmann parents: 21423 diff changeset	9	imports Ring2
9e585e99b494 tuned import haftmann parents: 21423 diff changeset	10	begin
7998 3d0c34795831 Algebra and Polynomial theories, by Clemens Ballarin paulson parents: diff changeset	11
21423 6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	12	definition
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	13	homo :: "('a::ring => 'b::ring) => bool" where
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	14	"homo f \<longleftrightarrow> (ALL a b. f (a + b) = f a + f b &
17479 68a7acb5f22e converted to Isar theory format; wenzelm parents: 13735 diff changeset	15	f (a * b) = f a * f b) &
68a7acb5f22e converted to Isar theory format; wenzelm parents: 13735 diff changeset	16	f 1 = 1"
7998 3d0c34795831 Algebra and Polynomial theories, by Clemens Ballarin paulson parents: diff changeset	17
21423 6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	18
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	19	lemma homoI:
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	20	"!! f. [\| !! a b. f (a + b) = f a + f b; !! a b. f (a * b) = f a * f b;
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	21	f 1 = 1 \|] ==> homo f"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	22	unfolding homo_def by blast
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	23
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	24	lemma homo_add [simp]: "!! f. homo f ==> f (a + b) = f a + f b"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	25	unfolding homo_def by blast
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	26
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	27	lemma homo_mult [simp]: "!! f. homo f ==> f (a * b) = f a * f b"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	28	unfolding homo_def by blast
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	29
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	30	lemma homo_one [simp]: "!! f. homo f ==> f 1 = 1"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	31	unfolding homo_def by blast
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	32
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	33	lemma homo_zero [simp]: "!! f::('a::ring=>'b::ring). homo f ==> f 0 = 0"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	34	apply (rule_tac a = "f 0" in a_lcancel)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	35	apply (simp (no_asm_simp) add: homo_add [symmetric])
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	36	done
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	37
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	38	lemma homo_uminus [simp]:
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	39	"!! f::('a::ring=>'b::ring). homo f ==> f (-a) = - f a"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	40	apply (rule_tac a = "f a" in a_lcancel)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	41	apply (frule homo_zero)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	42	apply (simp (no_asm_simp) add: homo_add [symmetric])
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	43	done
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	44
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	45	lemma homo_power [simp]: "!! f::('a::ring=>'b::ring). homo f ==> f (a ^ n) = f a ^ n"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	46	apply (induct_tac n)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	47	apply (drule homo_one)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	48	apply simp
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	49	apply (drule_tac a = "a^n" and b = "a" in homo_mult)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	50	apply simp
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	51	done
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	52
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	53	lemma homo_SUM [simp]:
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	54	"!! f::('a::ring=>'b::ring).
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	55	homo f ==> f (setsum g {..n::nat}) = setsum (f o g) {..n}"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	56	apply (induct_tac n)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	57	apply simp
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	58	apply simp
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	59	done
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	60
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	61	lemma id_homo [simp]: "homo (%x. x)"
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	62	by (blast intro!: homoI)
6cdd0589aa73 HOL-Algebra: converted legacy ML scripts; wenzelm parents: 20318 diff changeset	63
7998 3d0c34795831 Algebra and Polynomial theories, by Clemens Ballarin paulson parents: diff changeset	64	end

author	huffman
	Sun, 13 Nov 2011 19:26:53 +0100
changeset 45480	a39bb6d42ace
parent 35849	b5522b51cb1e
permissions	-rw-r--r--