isabelle: src/HOL/Algebra/Multiplicative_Group.thy@6905b156a030 (annotated)

65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	1	(* Title: HOL/Algebra/Multiplicative_Group.thy
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	2	Author: Simon Wimmer
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	3	Author: Lars Noschinski
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	4	*)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	5
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	6	theory Multiplicative_Group
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	7	imports
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	8	Complex_Main
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	9	Group
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	10	More_Group
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	11	More_Finite_Product
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	12	Coset
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	13	UnivPoly
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	14	begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	15
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	16	section \<open>Simplification Rules for Polynomials\<close>
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	17	text_raw \<open>\label{sec:simp-rules}\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	18
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	19	lemma (in ring_hom_cring) hom_sub[simp]:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	20	assumes "x \<in> carrier R" "y \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	21	shows "h (x \<ominus> y) = h x \<ominus>\<^bsub>S\<^esub> h y"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	22	using assms by (simp add: R.minus_eq S.minus_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	23
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	24	context UP_ring begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	25
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	26	lemma deg_nzero_nzero:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	27	assumes deg_p_nzero: "deg R p \<noteq> 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	28	shows "p \<noteq> \<zero>\<^bsub>P\<^esub>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	29	using deg_zero deg_p_nzero by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	30
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	31	lemma deg_add_eq:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	32	assumes c: "p \<in> carrier P" "q \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	33	assumes "deg R q \<noteq> deg R p"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	34	shows "deg R (p \<oplus>\<^bsub>P\<^esub> q) = max (deg R p) (deg R q)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	35	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	36	let ?m = "max (deg R p) (deg R q)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	37	from assms have "coeff P p ?m = \<zero> \<longleftrightarrow> coeff P q ?m \<noteq> \<zero>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	38	by (metis deg_belowI lcoeff_nonzero[OF deg_nzero_nzero] linear max.absorb_iff2 max.absorb1)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	39	then have "coeff P (p \<oplus>\<^bsub>P\<^esub> q) ?m \<noteq> \<zero>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	40	using assms by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	41	then have "deg R (p \<oplus>\<^bsub>P\<^esub> q) \<ge> ?m"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	42	using assms by (blast intro: deg_belowI)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	43	with deg_add[OF c] show ?thesis by arith
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	44	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	45
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	46	lemma deg_minus_eq:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	47	assumes "p \<in> carrier P" "q \<in> carrier P" "deg R q \<noteq> deg R p"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	48	shows "deg R (p \<ominus>\<^bsub>P\<^esub> q) = max (deg R p) (deg R q)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	49	using assms by (simp add: deg_add_eq a_minus_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	50
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	51	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	52
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	53	context UP_cring begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	54
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	55	lemma evalRR_add:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	56	assumes "p \<in> carrier P" "q \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	57	assumes x:"x \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	58	shows "eval R R id x (p \<oplus>\<^bsub>P\<^esub> q) = eval R R id x p \<oplus> eval R R id x q"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	59	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	60	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	61	interpret ring_hom_cring P R "eval R R id x" by unfold_locales (rule eval_ring_hom[OF x])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	62	show ?thesis using assms by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	63	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	64
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	65	lemma evalRR_sub:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	66	assumes "p \<in> carrier P" "q \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	67	assumes x:"x \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	68	shows "eval R R id x (p \<ominus>\<^bsub>P\<^esub> q) = eval R R id x p \<ominus> eval R R id x q"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	69	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	70	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	71	interpret ring_hom_cring P R "eval R R id x" by unfold_locales (rule eval_ring_hom[OF x])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	72	show ?thesis using assms by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	73	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	74
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	75	lemma evalRR_mult:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	76	assumes "p \<in> carrier P" "q \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	77	assumes x:"x \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	78	shows "eval R R id x (p \<otimes>\<^bsub>P\<^esub> q) = eval R R id x p \<otimes> eval R R id x q"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	79	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	80	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	81	interpret ring_hom_cring P R "eval R R id x" by unfold_locales (rule eval_ring_hom[OF x])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	82	show ?thesis using assms by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	83	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	84
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	85	lemma evalRR_monom:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	86	assumes a: "a \<in> carrier R" and x: "x \<in> carrier R"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	87	shows "eval R R id x (monom P a d) = a \<otimes> x [^] d"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	88	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	89	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	90	show ?thesis using assms by (simp add: eval_monom)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	91	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	92
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	93	lemma evalRR_one:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	94	assumes x: "x \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	95	shows "eval R R id x \<one>\<^bsub>P\<^esub> = \<one>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	96	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	97	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	98	interpret ring_hom_cring P R "eval R R id x" by unfold_locales (rule eval_ring_hom[OF x])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	99	show ?thesis using assms by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	100	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	101
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	102	lemma carrier_evalRR:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	103	assumes x: "x \<in> carrier R" and "p \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	104	shows "eval R R id x p \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	105	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	106	interpret UP_pre_univ_prop R R id by unfold_locales simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	107	interpret ring_hom_cring P R "eval R R id x" by unfold_locales (rule eval_ring_hom[OF x])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	108	show ?thesis using assms by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	109	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	110
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	111	lemmas evalRR_simps = evalRR_add evalRR_sub evalRR_mult evalRR_monom evalRR_one carrier_evalRR
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	112
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	113	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	114
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	115
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	116
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	117	section \<open>Properties of the Euler \<open>\<phi>\<close>-function\<close>
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	118	text_raw \<open>\label{sec:euler-phi}\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	119
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	120	text\<open>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	121	In this section we prove that for every positive natural number the equation
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	122	$\sum_{d \| n}^n \varphi(d) = n$ holds.
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	123	\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	124
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	125	lemma dvd_div_ge_1 :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	126	fixes a b :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	127	assumes "a \<ge> 1" "b dvd a"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	128	shows "a div b \<ge> 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	129	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	130	from \<open>b dvd a\<close> obtain c where "a = b * c" ..
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	131	with \<open>a \<ge> 1\<close> show ?thesis by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	132	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	133
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	134	lemma dvd_nat_bounds :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	135	fixes n p :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	136	assumes "p > 0" "n dvd p"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	137	shows "n > 0 \<and> n \<le> p"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	138	using assms by (simp add: dvd_pos_nat dvd_imp_le)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	139
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	140	(* Deviates from the definition given in the library in number theory *)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	141	definition phi' :: "nat => nat"
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	142	where "phi' m = card {x. 1 \<le> x \<and> x \<le> m \<and> coprime x m}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	143
66500 ba94aeb02fbc more correct output syntax declaration haftmann parents: 65416 diff changeset	144	notation (latex output)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	145	phi' ("\<phi> _")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	146
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	147	lemma phi'_nonzero :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	148	assumes "m > 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	149	shows "phi' m > 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	150	proof -
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	151	have "1 \<in> {x. 1 \<le> x \<and> x \<le> m \<and> coprime x m}" using assms by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	152	hence "card {x. 1 \<le> x \<and> x \<le> m \<and> coprime x m} > 0" by (auto simp: card_gt_0_iff)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	153	thus ?thesis unfolding phi'_def by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	154	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	155
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	156	lemma dvd_div_eq_1:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	157	fixes a b c :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	158	assumes "c dvd a" "c dvd b" "a div c = b div c"
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	159	shows "a = b" using assms dvd_mult_div_cancel[OF \<open>c dvd a\<close>] dvd_mult_div_cancel[OF \<open>c dvd b\<close>]
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	160	by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	161
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	162	lemma dvd_div_eq_2:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	163	fixes a b c :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	164	assumes "c>0" "a dvd c" "b dvd c" "c div a = c div b"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	165	shows "a = b"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	166	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	167	have "a > 0" "a \<le> c" using dvd_nat_bounds[OF assms(1-2)] by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	168	have "a*(c div a) = c" using assms dvd_mult_div_cancel by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	169	also have "\<dots> = b*(c div a)" using assms dvd_mult_div_cancel by fastforce
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	170	finally show "a = b" using \<open>c>0\<close> dvd_div_ge_1[OF _ \<open>a dvd c\<close>] by fastforce
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	171	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	172
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	173	lemma div_mult_mono:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	174	fixes a b c :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	175	assumes "a > 0" "a\<le>d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	176	shows "a * b div d \<le> b"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	177	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	178	have "ab div d \<le> ba div a" using assms div_le_mono2 mult.commute[of a b] by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	179	thus ?thesis using assms by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	180	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	181
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	182	text\<open>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	183	We arrive at the main result of this section:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	184	For every positive natural number the equation $\sum_{d \| n}^n \varphi(d) = n$ holds.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	185
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	186	The outline of the proof for this lemma is as follows:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	187	We count the $n$ fractions $1/n$, $\ldots$, $(n-1)/n$, $n/n$.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	188	We analyze the reduced form $a/d = m/n$ for any of those fractions.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	189	We want to know how many fractions $m/n$ have the reduced form denominator $d$.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	190	The condition $1 \leq m \leq n$ is equivalent to the condition $1 \leq a \leq d$.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	191	Therefore we want to know how many $a$ with $1 \leq a \leq d$ exist, s.t. @{term "gcd a d = 1"}.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	192	This number is exactly @{term "phi' d"}.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	193
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	194	Finally, by counting the fractions $m/n$ according to their reduced form denominator,
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	195	we get: @{term [display] "(\<Sum>d \| d dvd n . phi' d) = n"}.
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	196	To formalize this proof in Isabelle, we analyze for an arbitrary divisor $d$ of $n$
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	197	\begin{itemize}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	198	\item the set of reduced form numerators @{term "{a. (1::nat) \<le> a \<and> a \<le> d \<and> coprime a d}"}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	199	\item the set of numerators $m$, for which $m/n$ has the reduced form denominator $d$,
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	200	i.e. the set @{term "{m \<in> {1::nat .. n}. n div gcd m n = d}"}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	201	\end{itemize}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	202	We show that @{term "\<lambda>a. a*n div d"} with the inverse @{term "\<lambda>a. a div gcd a n"} is
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	203	a bijection between theses sets, thus yielding the equality
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	204	@{term [display] "phi' d = card {m \<in> {1 .. n}. n div gcd m n = d}"}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	205	This gives us
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	206	@{term [display] "(\<Sum>d \| d dvd n . phi' d)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	207	= card (\<Union>d \<in> {d. d dvd n}. {m \<in> {1 .. n}. n div gcd m n = d})"}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	208	and by showing
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	209	@{term "(\<Union>d \<in> {d. d dvd n}. {m \<in> {1::nat .. n}. n div gcd m n = d}) \<supseteq> {1 .. n}"}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	210	(this is our counting argument) the thesis follows.
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	211	\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	212	lemma sum_phi'_factors :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	213	fixes n :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	214	assumes "n > 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	215	shows "(\<Sum>d \| d dvd n. phi' d) = n"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	216	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	217	{ fix d assume "d dvd n" then obtain q where q: "n = d * q" ..
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	218	have "card {a. 1 \<le> a \<and> a \<le> d \<and> coprime a d} = card {m \<in> {1 .. n}. n div gcd m n = d}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	219	(is "card ?RF = card ?F")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	220	proof (rule card_bij_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	221	{ fix a b assume "a * n div d = b * n div d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	222	hence "a * (n div d) = b * (n div d)"
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	223	using dvd_div_mult[OF \<open>d dvd n\<close>] by (fastforce simp add: mult.commute)
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	224	hence "a = b" using dvd_div_ge_1[OF _ \<open>d dvd n\<close>] \<open>n>0\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	225	by (simp add: mult.commute nat_mult_eq_cancel1)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	226	} thus "inj_on (\<lambda>a. a*n div d) ?RF" unfolding inj_on_def by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	227	{ fix a assume a:"a\<in>?RF"
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	228	hence "a * (n div d) \<ge> 1" using \<open>n>0\<close> dvd_div_ge_1[OF _ \<open>d dvd n\<close>] by simp
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	229	hence ge_1:"a * n div d \<ge> 1" by (simp add: \<open>d dvd n\<close> div_mult_swap)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	230	have le_n:"a * n div d \<le> n" using div_mult_mono a by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	231	have "gcd (a * n div d) n = n div d * gcd a d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	232	by (simp add: gcd_mult_distrib_nat q ac_simps)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	233	hence "n div gcd (a * n div d) n = dn div (d(n div d))" using a by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	234	hence "a * n div d \<in> ?F"
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	235	using ge_1 le_n by (fastforce simp add: \<open>d dvd n\<close>)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	236	} thus "(\<lambda>a. a*n div d) ` ?RF \<subseteq> ?F" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	237	{ fix m l assume A: "m \<in> ?F" "l \<in> ?F" "m div gcd m n = l div gcd l n"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	238	hence "gcd m n = gcd l n" using dvd_div_eq_2[OF assms] by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	239	hence "m = l" using dvd_div_eq_1[of "gcd m n" m l] A(3) by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	240	} thus "inj_on (\<lambda>a. a div gcd a n) ?F" unfolding inj_on_def by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	241	{ fix m assume "m \<in> ?F"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	242	hence "m div gcd m n \<in> ?RF" using dvd_div_ge_1
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	243	by (fastforce simp add: div_le_mono div_gcd_coprime)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	244	} thus "(\<lambda>a. a div gcd a n) ` ?F \<subseteq> ?RF" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	245	qed force+
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	246	} hence phi'_eq:"\<And>d. d dvd n \<Longrightarrow> phi' d = card {m \<in> {1 .. n}. n div gcd m n = d}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	247	unfolding phi'_def by presburger
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	248	have fin:"finite {d. d dvd n}" using dvd_nat_bounds[OF \<open>n>0\<close>] by force
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	249	have "(\<Sum>d \| d dvd n. phi' d)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	250	= card (\<Union>d \<in> {d. d dvd n}. {m \<in> {1 .. n}. n div gcd m n = d})"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	251	using card_UN_disjoint[OF fin, of "(\<lambda>d. {m \<in> {1 .. n}. n div gcd m n = d})"] phi'_eq
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	252	by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	253	also have "(\<Union>d \<in> {d. d dvd n}. {m \<in> {1 .. n}. n div gcd m n = d}) = {1 .. n}" (is "?L = ?R")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	254	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	255	show "?L \<supseteq> ?R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	256	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	257	fix m assume m: "m \<in> ?R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	258	thus "m \<in> ?L" using dvd_triv_right[of "n div gcd m n" "gcd m n"]
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	259	by simp
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	260	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	261	qed fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	262	finally show ?thesis by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	263	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	264
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	265	section \<open>Order of an Element of a Group\<close>
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	266	text_raw \<open>\label{sec:order-elem}\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	267
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	268
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	269	context group begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	270
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	271	lemma pow_eq_div2 :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	272	fixes m n :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	273	assumes x_car: "x \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	274	assumes pow_eq: "x [^] m = x [^] n"
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	275	shows "x [^] (m - n) = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	276	proof (cases "m < n")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	277	case False
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	278	have "\<one> \<otimes> x [^] m = x [^] m" by (simp add: x_car)
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	279	also have "\<dots> = x [^] (m - n) \<otimes> x [^] n"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	280	using False by (simp add: nat_pow_mult x_car)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	281	also have "\<dots> = x [^] (m - n) \<otimes> x [^] m"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	282	by (simp add: pow_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	283	finally show ?thesis by (simp add: x_car)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	284	qed simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	285
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	286	definition ord where "ord a = Min {d \<in> {1 .. order G} . a [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	287
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	288	lemma
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	289	assumes finite:"finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	290	assumes a:"a \<in> carrier G"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	291	shows ord_ge_1: "1 \<le> ord a" and ord_le_group_order: "ord a \<le> order G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	292	and pow_ord_eq_1: "a [^] ord a = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	293	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	294	have "\<not>inj_on (\<lambda>x. a [^] x) {0 .. order G}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	295	proof (rule notI)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	296	assume A: "inj_on (\<lambda>x. a [^] x) {0 .. order G}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	297	have "order G + 1 = card {0 .. order G}" by simp
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	298	also have "\<dots> = card ((\<lambda>x. a [^] x) ` {0 .. order G})" (is "_ = card ?S")
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	299	using A by (simp add: card_image)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	300	also have "?S = {a [^] x \| x. x \<in> {0 .. order G}}" by blast
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	301	also have "\<dots> \<subseteq> carrier G" (is "?S \<subseteq> _") using a by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	302	then have "card ?S \<le> order G" unfolding order_def
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	303	by (rule card_mono[OF finite])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	304	finally show False by arith
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	305	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	306
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	307	then obtain x y where x_y:"x \<noteq> y" "x \<in> {0 .. order G}" "y \<in> {0 .. order G}"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	308	"a [^] x = a [^] y" unfolding inj_on_def by blast
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	309	obtain d where "1 \<le> d" "a [^] d = \<one>" "d \<le> order G"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	310	proof cases
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	311	assume "y < x" with x_y show ?thesis
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	312	by (intro that[where d="x - y"]) (auto simp add: pow_eq_div2[OF a])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	313	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	314	assume "\<not>y < x" with x_y show ?thesis
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	315	by (intro that[where d="y - x"]) (auto simp add: pow_eq_div2[OF a])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	316	qed
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	317	hence "ord a \<in> {d \<in> {1 .. order G} . a [^] d = \<one>}"
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	318	unfolding ord_def using Min_in[of "{d \<in> {1 .. order G} . a [^] d = \<one>}"]
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	319	by fastforce
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	320	then show "1 \<le> ord a" and "ord a \<le> order G" and "a [^] ord a = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	321	by (auto simp: order_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	322	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	323
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	324	lemma finite_group_elem_finite_ord :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	325	assumes "finite (carrier G)" "x \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	326	shows "\<exists> d::nat. d \<ge> 1 \<and> x [^] d = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	327	using assms ord_ge_1 pow_ord_eq_1 by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	328
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	329	lemma ord_min:
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	330	assumes "finite (carrier G)" "1 \<le> d" "a \<in> carrier G" "a [^] d = \<one>" shows "ord a \<le> d"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	331	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	332	define Ord where "Ord = {d \<in> {1..order G}. a [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	333	have fin: "finite Ord" by (auto simp: Ord_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	334	have in_ord: "ord a \<in> Ord"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	335	using assms pow_ord_eq_1 ord_ge_1 ord_le_group_order by (auto simp: Ord_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	336	then have "Ord \<noteq> {}" by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	337
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	338	show ?thesis
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	339	proof (cases "d \<le> order G")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	340	case True
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	341	then have "d \<in> Ord" using assms by (auto simp: Ord_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	342	with fin in_ord show ?thesis
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	343	unfolding ord_def Ord_def[symmetric] by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	344	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	345	case False
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	346	then show ?thesis using in_ord by (simp add: Ord_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	347	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	348	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	349
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	350	lemma ord_inj :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	351	assumes finite: "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	352	assumes a: "a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	353	shows "inj_on (\<lambda> x . a [^] x) {0 .. ord a - 1}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	354	proof (rule inj_onI, rule ccontr)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	355	fix x y assume A: "x \<in> {0 .. ord a - 1}" "y \<in> {0 .. ord a - 1}" "a [^] x= a [^] y" "x \<noteq> y"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	356
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	357	have "finite {d \<in> {1..order G}. a [^] d = \<one>}" by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	358
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	359	{ fix x y assume A: "x < y" "x \<in> {0 .. ord a - 1}" "y \<in> {0 .. ord a - 1}"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	360	"a [^] x = a [^] y"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	361	hence "y - x < ord a" by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	362	also have "\<dots> \<le> order G" using assms by (simp add: ord_le_group_order)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	363	finally have y_x_range:"y - x \<in> {1 .. order G}" using A by force
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	364	have "a [^] (y-x) = \<one>" using a A by (simp add: pow_eq_div2)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	365
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	366	hence y_x:"y - x \<in> {d \<in> {1.. order G}. a [^] d = \<one>}" using y_x_range by blast
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	367	have "min (y - x) (ord a) = ord a"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	368	using Min.in_idem[OF \<open>finite {d \<in> {1 .. order G} . a [^] d = \<one>}\<close> y_x] ord_def by auto
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	369	with \<open>y - x < ord a\<close> have False by linarith
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	370	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	371	note X = this
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	372
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	373	{ assume "x < y" with A X have False by blast }
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	374	moreover
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	375	{ assume "x > y" with A X have False by metis }
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	376	moreover
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	377	{ assume "x = y" then have False using A by auto}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	378	ultimately
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	379	show False by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	380	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	381
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	382	lemma ord_inj' :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	383	assumes finite: "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	384	assumes a: "a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	385	shows "inj_on (\<lambda> x . a [^] x) {1 .. ord a}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	386	proof (rule inj_onI, rule ccontr)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	387	fix x y :: nat
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	388	assume A:"x \<in> {1 .. ord a}" "y \<in> {1 .. ord a}" "a [^] x = a [^] y" "x\<noteq>y"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	389	{ assume "x < ord a" "y < ord a"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	390	hence False using ord_inj[OF assms] A unfolding inj_on_def by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	391	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	392	moreover
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	393	{ assume "x = ord a" "y < ord a"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	394	hence "a [^] y = a [^] (0::nat)" using pow_ord_eq_1[OF assms] A by auto
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	395	hence "y=0" using ord_inj[OF assms] \<open>y < ord a\<close> unfolding inj_on_def by force
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	396	hence False using A by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	397	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	398	moreover
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	399	{ assume "y = ord a" "x < ord a"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	400	hence "a [^] x = a [^] (0::nat)" using pow_ord_eq_1[OF assms] A by auto
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	401	hence "x=0" using ord_inj[OF assms] \<open>x < ord a\<close> unfolding inj_on_def by force
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	402	hence False using A by fastforce
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	403	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	404	ultimately show False using A by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	405	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	406
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	407	lemma ord_elems :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	408	assumes "finite (carrier G)" "a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	409	shows "{a[^]x \| x. x \<in> (UNIV :: nat set)} = {a[^]x \| x. x \<in> {0 .. ord a - 1}}" (is "?L = ?R")
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	410	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	411	show "?R \<subseteq> ?L" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	412	{ fix y assume "y \<in> ?L"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	413	then obtain x::nat where x:"y = a[^]x" by auto
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	414	define r where "r = x mod ord a"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	415	then obtain q where q:"x = q * ord a + r" using mod_eqD by atomize_elim presburger
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	416	hence "y = (a[^]ord a)[^]q \<otimes> a[^]r"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	417	using x assms by (simp add: mult.commute nat_pow_mult nat_pow_pow)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	418	hence "y = a[^]r" using assms by (simp add: pow_ord_eq_1)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	419	have "r < ord a" using ord_ge_1[OF assms] by (simp add: r_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	420	hence "r \<in> {0 .. ord a - 1}" by (force simp: r_def)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	421	hence "y \<in> {a[^]x \| x. x \<in> {0 .. ord a - 1}}" using \<open>y=a[^]r\<close> by blast
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	422	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	423	thus "?L \<subseteq> ?R" by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	424	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	425
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	426	lemma ord_dvd_pow_eq_1 :
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	427	assumes "finite (carrier G)" "a \<in> carrier G" "a [^] k = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	428	shows "ord a dvd k"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	429	proof -
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	430	define r where "r = k mod ord a"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	431	then obtain q where q:"k = q*ord a + r" using mod_eqD by atomize_elim presburger
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	432	hence "a[^]k = (a[^]ord a)[^]q \<otimes> a[^]r"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	433	using assms by (simp add: mult.commute nat_pow_mult nat_pow_pow)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	434	hence "a[^]k = a[^]r" using assms by (simp add: pow_ord_eq_1)
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	435	hence "a[^]r = \<one>" using assms(3) by simp
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	436	have "r < ord a" using ord_ge_1[OF assms(1-2)] by (simp add: r_def)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	437	hence "r = 0" using \<open>a[^]r = \<one>\<close> ord_def[of a] ord_min[of r a] assms(1-2) by linarith
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	438	thus ?thesis using q by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	439	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	440
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	441	lemma dvd_gcd :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	442	fixes a b :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	443	obtains q where "a * (b div gcd a b) = b*q"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	444	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	445	have "a * (b div gcd a b) = (a div gcd a b) * b" by (simp add: div_mult_swap dvd_div_mult)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	446	also have "\<dots> = b * (a div gcd a b)" by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	447	finally show "a * (b div gcd a b) = b * (a div gcd a b) " .
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	448	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	449
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	450	lemma ord_pow_dvd_ord_elem :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	451	assumes finite[simp]: "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	452	assumes a[simp]:"a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	453	shows "ord (a[^]n) = ord a div gcd n (ord a)"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	454	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	455	have "(a[^]n) [^] ord a = (a [^] ord a) [^] n"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	456	by (simp add: mult.commute nat_pow_pow)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	457	hence "(a[^]n) [^] ord a = \<one>" by (simp add: pow_ord_eq_1)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	458	obtain q where "n * (ord a div gcd n (ord a)) = ord a * q" by (rule dvd_gcd)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	459	hence "(a[^]n) [^] (ord a div gcd n (ord a)) = (a [^] ord a)[^]q" by (simp add : nat_pow_pow)
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	460	hence pow_eq_1: "(a[^]n) [^] (ord a div gcd n (ord a)) = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	461	by (auto simp add : pow_ord_eq_1[of a])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	462	have "ord a \<ge> 1" using ord_ge_1 by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	463	have ge_1:"ord a div gcd n (ord a) \<ge> 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	464	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	465	have "gcd n (ord a) dvd ord a" by blast
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	466	thus ?thesis by (rule dvd_div_ge_1[OF \<open>ord a \<ge> 1\<close>])
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	467	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	468	have "ord a \<le> order G" by (simp add: ord_le_group_order)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	469	have "ord a div gcd n (ord a) \<le> order G"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	470	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	471	have "ord a div gcd n (ord a) \<le> ord a" by simp
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	472	thus ?thesis using \<open>ord a \<le> order G\<close> by linarith
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	473	qed
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	474	hence ord_gcd_elem:"ord a div gcd n (ord a) \<in> {d \<in> {1..order G}. (a[^]n) [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	475	using ge_1 pow_eq_1 by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	476	{ fix d :: nat
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	477	assume d_elem:"d \<in> {d \<in> {1..order G}. (a[^]n) [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	478	assume d_lt:"d < ord a div gcd n (ord a)"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	479	hence pow_nd:"a[^](n*d) = \<one>" using d_elem
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	480	by (simp add : nat_pow_pow)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	481	hence "ord a dvd n*d" using assms by (auto simp add : ord_dvd_pow_eq_1)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	482	then obtain q where "ord a * q = n*d" by (metis dvd_mult_div_cancel)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	483	hence prod_eq:"(ord a div gcd n (ord a)) * q = (n div gcd n (ord a)) * d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	484	by (simp add: dvd_div_mult)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	485	have cp:"coprime (ord a div gcd n (ord a)) (n div gcd n (ord a))"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	486	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	487	have "coprime (n div gcd n (ord a)) (ord a div gcd n (ord a))"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	488	using div_gcd_coprime[of n "ord a"] ge_1 by fastforce
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	489	thus ?thesis by (simp add: ac_simps)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	490	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	491	have dvd_d:"(ord a div gcd n (ord a)) dvd d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	492	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	493	have "ord a div gcd n (ord a) dvd (n div gcd n (ord a)) * d" using prod_eq
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	494	by (metis dvd_triv_right mult.commute)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	495	hence "ord a div gcd n (ord a) dvd d * (n div gcd n (ord a))"
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	496	by (simp add: mult.commute)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	497	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	498	using cp by (simp add: coprime_dvd_mult_left_iff)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	499	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	500	have "d > 0" using d_elem by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	501	hence "ord a div gcd n (ord a) \<le> d" using dvd_d by (simp add : Nat.dvd_imp_le)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	502	hence False using d_lt by simp
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	503	} hence ord_gcd_min: "\<And> d . d \<in> {d \<in> {1..order G}. (a[^]n) [^] d = \<one>}
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	504	\<Longrightarrow> d\<ge>ord a div gcd n (ord a)" by fastforce
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	505	have fin:"finite {d \<in> {1..order G}. (a[^]n) [^] d = \<one>}" by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	506	thus ?thesis using Min_eqI[OF fin ord_gcd_min ord_gcd_elem]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	507	unfolding ord_def by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	508	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	509
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	510	lemma ord_1_eq_1 :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	511	assumes "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	512	shows "ord \<one> = 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	513	using assms ord_ge_1 ord_min[of 1 \<one>] by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	514
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	515	theorem lagrange_dvd:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	516	assumes "finite(carrier G)" "subgroup H G" shows "(card H) dvd (order G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	517	using assms by (simp add: lagrange[symmetric])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	518
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	519	lemma element_generates_subgroup:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	520	assumes finite[simp]: "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	521	assumes a[simp]: "a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	522	shows "subgroup {a [^] i \| i. i \<in> {0 .. ord a - 1}} G"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	523	proof
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	524	show "{a[^]i \| i. i \<in> {0 .. ord a - 1} } \<subseteq> carrier G" by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	525	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	526	fix x y
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	527	assume A: "x \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}" "y \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}"
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	528	obtain i::nat where i:"x = a[^]i" and i2:"i \<in> UNIV" using A by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	529	obtain j::nat where j:"y = a[^]j" and j2:"j \<in> UNIV" using A by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	530	have "a[^](i+j) \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}" using ord_elems[OF assms] A by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	531	thus "x \<otimes> y \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	532	using i j a ord_elems assms by (auto simp add: nat_pow_mult)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	533	next
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	534	show "\<one> \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}" by force
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	535	next
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	536	fix x assume x: "x \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	537	hence x_in_carrier: "x \<in> carrier G" by auto
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	538	then obtain d::nat where d:"x [^] d = \<one>" and "d\<ge>1"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	539	using finite_group_elem_finite_ord by auto
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	540	have inv_1:"x[^](d - 1) \<otimes> x = \<one>" using \<open>d\<ge>1\<close> d nat_pow_Suc[of x "d - 1"] by simp
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	541	have elem:"x [^] (d - 1) \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	542	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	543	obtain i::nat where i:"x = a[^]i" using x by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	544	hence "x[^](d - 1) \<in> {a[^]i \| i. i \<in> (UNIV::nat set)}" by (auto simp add: nat_pow_pow)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	545	thus ?thesis using ord_elems[of a] by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	546	qed
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	547	have inv:"inv x = x[^](d - 1)" using inv_equality[OF inv_1] x_in_carrier by blast
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	548	thus "inv x \<in> {a[^]i \| i. i \<in> {0 .. ord a - 1}}" using elem inv by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	549	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	550
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	551	lemma ord_dvd_group_order :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	552	assumes finite[simp]: "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	553	assumes a[simp]: "a \<in> carrier G"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	554	shows "ord a dvd order G"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	555	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	556	have card_dvd:"card {a[^]i \| i. i \<in> {0 .. ord a - 1}} dvd card (carrier G)"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	557	using lagrange_dvd element_generates_subgroup unfolding order_def by simp
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	558	have "inj_on (\<lambda> i . a[^]i) {0..ord a - 1}" using ord_inj by simp
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	559	hence cards_eq:"card ( (\<lambda> i . a[^]i) ` {0..ord a - 1}) = card {0..ord a - 1}"
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	560	using card_image[of "\<lambda> i . a[^]i" "{0..ord a - 1}"] by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	561	have "(\<lambda> i . a[^]i) ` {0..ord a - 1} = {a[^]i \| i. i \<in> {0..ord a - 1}}" by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	562	hence "card {a[^]i \| i. i \<in> {0..ord a - 1}} = card {0..ord a - 1}" using cards_eq by simp
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	563	also have "\<dots> = ord a" using ord_ge_1[of a] by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	564	finally show ?thesis using card_dvd by (simp add: order_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	565	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	566
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	567	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	568
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	569
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	570	section \<open>Number of Roots of a Polynomial\<close>
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	571	text_raw \<open>\label{sec:number-roots}\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	572
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	573
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	574	definition mult_of :: "('a, 'b) ring_scheme \<Rightarrow> 'a monoid" where
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	575	"mult_of R \<equiv> \<lparr> carrier = carrier R - {\<zero>\<^bsub>R\<^esub>}, mult = mult R, one = \<one>\<^bsub>R\<^esub>\<rparr>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	576
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	577	lemma carrier_mult_of: "carrier (mult_of R) = carrier R - {\<zero>\<^bsub>R\<^esub>}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	578	by (simp add: mult_of_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	579
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	580	lemma mult_mult_of: "mult (mult_of R) = mult R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	581	by (simp add: mult_of_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	582
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67341 diff changeset	583	lemma nat_pow_mult_of: "([^]\<^bsub>mult_of R\<^esub>) = (([^]\<^bsub>R\<^esub>) :: _ \<Rightarrow> nat \<Rightarrow> _)"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	584	by (simp add: mult_of_def fun_eq_iff nat_pow_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	585
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	586	lemma one_mult_of: "\<one>\<^bsub>mult_of R\<^esub> = \<one>\<^bsub>R\<^esub>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	587	by (simp add: mult_of_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	588
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	589	lemmas mult_of_simps = carrier_mult_of mult_mult_of nat_pow_mult_of one_mult_of
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	590
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	591	context field begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	592
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	593	lemma field_mult_group :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	594	shows "group (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	595	apply (rule groupI)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	596	apply (auto simp: mult_of_simps m_assoc dest: integral)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	597	by (metis Diff_iff Units_inv_Units Units_l_inv field_Units singletonE)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	598
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	599	lemma finite_mult_of: "finite (carrier R) \<Longrightarrow> finite (carrier (mult_of R))"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	600	by (auto simp: mult_of_simps)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	601
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	602	lemma order_mult_of: "finite (carrier R) \<Longrightarrow> order (mult_of R) = order R - 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	603	unfolding order_def carrier_mult_of by (simp add: card.remove)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	604
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	605	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	606
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	607
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	608
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	609	lemma (in monoid) Units_pow_closed :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	610	fixes d :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	611	assumes "x \<in> Units G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	612	shows "x [^] d \<in> Units G"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	613	by (metis assms group.is_monoid monoid.nat_pow_closed units_group units_of_carrier units_of_pow)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	614
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	615	lemma (in comm_monoid) is_monoid:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	616	shows "monoid G" by unfold_locales
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	617
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	618	declare comm_monoid.is_monoid[intro?]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	619
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	620	lemma (in ring) r_right_minus_eq[simp]:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	621	assumes "a \<in> carrier R" "b \<in> carrier R"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	622	shows "a \<ominus> b = \<zero> \<longleftrightarrow> a = b"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	623	using assms by (metis a_minus_def add.inv_closed minus_equality r_neg)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	624
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	625	context UP_cring begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	626
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	627	lemma is_UP_cring:"UP_cring R" by (unfold_locales)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	628	lemma is_UP_ring :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	629	shows "UP_ring R" by (unfold_locales)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	630
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	631	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	632
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	633	context UP_domain begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	634
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	635
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	636	lemma roots_bound:
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	637	assumes f [simp]: "f \<in> carrier P"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	638	assumes f_not_zero: "f \<noteq> \<zero>\<^bsub>P\<^esub>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	639	assumes finite: "finite (carrier R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	640	shows "finite {a \<in> carrier R . eval R R id a f = \<zero>} \<and>
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	641	card {a \<in> carrier R . eval R R id a f = \<zero>} \<le> deg R f" using f f_not_zero
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	642	proof (induction "deg R f" arbitrary: f)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	643	case 0
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	644	have "\<And>x. eval R R id x f \<noteq> \<zero>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	645	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	646	fix x
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	647	have "(\<Oplus>i\<in>{..deg R f}. id (coeff P f i) \<otimes> x [^] i) \<noteq> \<zero>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	648	using 0 lcoeff_nonzero_nonzero[where p = f] by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	649	thus "eval R R id x f \<noteq> \<zero>" using 0 unfolding eval_def P_def by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	650	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	651	then have *: "{a \<in> carrier R. eval R R (\<lambda>a. a) a f = \<zero>} = {}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	652	by (auto simp: id_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	653	show ?case by (simp add: *)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	654	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	655	case (Suc x)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	656	show ?case
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	657	proof (cases "\<exists> a \<in> carrier R . eval R R id a f = \<zero>")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	658	case True
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	659	then obtain a where a_carrier[simp]: "a \<in> carrier R" and a_root:"eval R R id a f = \<zero>" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	660	have R_not_triv: "carrier R \<noteq> {\<zero>}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	661	by (metis R.one_zeroI R.zero_not_one)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	662	obtain q where q:"(q \<in> carrier P)" and
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	663	f:"f = (monom P \<one>\<^bsub>R\<^esub> 1 \<ominus>\<^bsub> P\<^esub> monom P a 0) \<otimes>\<^bsub>P\<^esub> q \<oplus>\<^bsub>P\<^esub> monom P (eval R R id a f) 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	664	using remainder_theorem[OF Suc.prems(1) a_carrier R_not_triv] by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	665	hence lin_fac: "f = (monom P \<one>\<^bsub>R\<^esub> 1 \<ominus>\<^bsub> P\<^esub> monom P a 0) \<otimes>\<^bsub>P\<^esub> q" using q by (simp add: a_root)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	666	have deg:"deg R (monom P \<one>\<^bsub>R\<^esub> 1 \<ominus>\<^bsub> P\<^esub> monom P a 0) = 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	667	using a_carrier by (simp add: deg_minus_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	668	hence mon_not_zero:"(monom P \<one>\<^bsub>R\<^esub> 1 \<ominus>\<^bsub> P\<^esub> monom P a 0) \<noteq> \<zero>\<^bsub>P\<^esub>"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	669	by (fastforce simp del: r_right_minus_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	670	have q_not_zero:"q \<noteq> \<zero>\<^bsub>P\<^esub>" using Suc by (auto simp add : lin_fac)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	671	hence "deg R q = x" using Suc deg deg_mult[OF mon_not_zero q_not_zero _ q]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	672	by (simp add : lin_fac)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	673	hence q_IH:"finite {a \<in> carrier R . eval R R id a q = \<zero>}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	674	\<and> card {a \<in> carrier R . eval R R id a q = \<zero>} \<le> x" using Suc q q_not_zero by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	675	have subs:"{a \<in> carrier R . eval R R id a f = \<zero>}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	676	\<subseteq> {a \<in> carrier R . eval R R id a q = \<zero>} \<union> {a}" (is "?L \<subseteq> ?R \<union> {a}")
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	677	using a_carrier \<open>q \<in> _\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	678	by (auto simp: evalRR_simps lin_fac R.integral_iff)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	679	have "{a \<in> carrier R . eval R R id a f = \<zero>} \<subseteq> insert a {a \<in> carrier R . eval R R id a q = \<zero>}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	680	using subs by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	681	hence "card {a \<in> carrier R . eval R R id a f = \<zero>} \<le>
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	682	card (insert a {a \<in> carrier R . eval R R id a q = \<zero>})" using q_IH by (blast intro: card_mono)
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	683	also have "\<dots> \<le> deg R f" using q_IH \<open>Suc x = _\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	684	by (simp add: card_insert_if)
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	685	finally show ?thesis using q_IH \<open>Suc x = _\<close> using finite by force
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	686	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	687	case False
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	688	hence "card {a \<in> carrier R. eval R R id a f = \<zero>} = 0" using finite by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	689	also have "\<dots> \<le> deg R f" by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	690	finally show ?thesis using finite by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	691	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	692	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	693
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	694	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	695
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	696	lemma (in domain) num_roots_le_deg :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	697	fixes p d :: nat
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	698	assumes finite:"finite (carrier R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	699	assumes d_neq_zero : "d \<noteq> 0"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	700	shows "card {x \<in> carrier R. x [^] d = \<one>} \<le> d"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	701	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	702	let ?f = "monom (UP R) \<one>\<^bsub>R\<^esub> d \<ominus>\<^bsub> (UP R)\<^esub> monom (UP R) \<one>\<^bsub>R\<^esub> 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	703	have one_in_carrier:"\<one> \<in> carrier R" by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	704	interpret R: UP_domain R "UP R" by (unfold_locales)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	705	have "deg R ?f = d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	706	using d_neq_zero by (simp add: R.deg_minus_eq)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	707	hence f_not_zero:"?f \<noteq> \<zero>\<^bsub>UP R\<^esub>" using d_neq_zero by (auto simp add : R.deg_nzero_nzero)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	708	have roots_bound:"finite {a \<in> carrier R . eval R R id a ?f = \<zero>} \<and>
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	709	card {a \<in> carrier R . eval R R id a ?f = \<zero>} \<le> deg R ?f"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	710	using finite by (intro R.roots_bound[OF _ f_not_zero]) simp
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	711	have subs:"{x \<in> carrier R. x [^] d = \<one>} \<subseteq> {a \<in> carrier R . eval R R id a ?f = \<zero>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	712	by (auto simp: R.evalRR_simps)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	713	then have "card {x \<in> carrier R. x [^] d = \<one>} \<le>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	714	card {a \<in> carrier R. eval R R id a ?f = \<zero>}" using finite by (simp add : card_mono)
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	715	thus ?thesis using \<open>deg R ?f = d\<close> roots_bound by linarith
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	716	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	717
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	718
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	719
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	720	section \<open>The Multiplicative Group of a Field\<close>
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	721	text_raw \<open>\label{sec:mult-group}\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	722
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	723
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	724	text \<open>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	725	In this section we show that the multiplicative group of a finite field
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	726	is generated by a single element, i.e. it is cyclic. The proof is inspired
67299 ba52a058942f prefer formal citations; wenzelm parents: 67226 diff changeset	727	by the first proof given in the survey~@{cite "conrad-cyclicity"}.
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	728	\<close>
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	729
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	730	lemma (in group) pow_order_eq_1:
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	731	assumes "finite (carrier G)" "x \<in> carrier G" shows "x [^] order G = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	732	using assms by (metis nat_pow_pow ord_dvd_group_order pow_ord_eq_1 dvdE nat_pow_one)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	733
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	734	(* XXX remove in AFP devel, replaced by div_eq_dividend_iff *)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	735	lemma nat_div_eq: "a \<noteq> 0 \<Longrightarrow> (a :: nat) div b = a \<longleftrightarrow> b = 1"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	736	apply rule
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	737	apply (cases "b = 0")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	738	apply simp_all
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	739	apply (metis (full_types) One_nat_def Suc_lessI div_less_dividend less_not_refl3)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	740	done
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	741
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	742	lemma (in group)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	743	assumes finite': "finite (carrier G)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	744	assumes "a \<in> carrier G"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	745	shows pow_ord_eq_ord_iff: "group.ord G (a [^] k) = ord a \<longleftrightarrow> coprime k (ord a)" (is "?L \<longleftrightarrow> ?R")
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	746	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	747	assume A: ?L then show ?R
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	748	using assms ord_ge_1 [OF assms]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66500 diff changeset	749	by (auto simp: nat_div_eq ord_pow_dvd_ord_elem coprime_iff_gcd_eq_1)
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	750	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	751	assume ?R then show ?L
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	752	using ord_pow_dvd_ord_elem[OF assms, of k] by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	753	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	754
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	755	context field begin
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	756
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	757	lemma num_elems_of_ord_eq_phi':
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	758	assumes finite: "finite (carrier R)" and dvd: "d dvd order (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	759	and exists: "\<exists>a\<in>carrier (mult_of R). group.ord (mult_of R) a = d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	760	shows "card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = d} = phi' d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	761	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	762	note mult_of_simps[simp]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	763	have finite': "finite (carrier (mult_of R))" using finite by (rule finite_mult_of)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	764
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67341 diff changeset	765	interpret G:group "mult_of R" rewrites "([^]\<^bsub>mult_of R\<^esub>) = (([^]) :: _ \<Rightarrow> nat \<Rightarrow> _)" and "\<one>\<^bsub>mult_of R\<^esub> = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	766	by (rule field_mult_group) simp_all
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	767
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	768	from exists
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	769	obtain a where a:"a \<in> carrier (mult_of R)" and ord_a: "group.ord (mult_of R) a = d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	770	by (auto simp add: card_gt_0_iff)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	771
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	772	have set_eq1:"{a[^]n\| n. n \<in> {1 .. d}} = {x \<in> carrier (mult_of R). x [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	773	proof (rule card_seteq)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	774	show "finite {x \<in> carrier (mult_of R). x [^] d = \<one>}" using finite by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	775
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	776	show "{a[^]n\| n. n \<in> {1 ..d}} \<subseteq> {x \<in> carrier (mult_of R). x[^]d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	777	proof
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	778	fix x assume "x \<in> {a[^]n \| n. n \<in> {1 .. d}}"
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	779	then obtain n where n:"x = a[^]n \<and> n \<in> {1 .. d}" by auto
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	780	have "x[^]d =(a[^]d)[^]n" using n a ord_a by (simp add:nat_pow_pow mult.commute)
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	781	hence "x[^]d = \<one>" using ord_a G.pow_ord_eq_1[OF finite' a] by fastforce
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	782	thus "x \<in> {x \<in> carrier (mult_of R). x[^]d = \<one>}" using G.nat_pow_closed[OF a] n by blast
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	783	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	784
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	785	show "card {x \<in> carrier (mult_of R). x [^] d = \<one>} \<le> card {a[^]n \| n. n \<in> {1 .. d}}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	786	proof -
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	787	have *:"{a[^]n \| n. n \<in> {1 .. d }} = ((\<lambda> n. a[^]n) ` {1 .. d})" by auto
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	788	have "0 < order (mult_of R)" unfolding order_mult_of[OF finite]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	789	using card_mono[OF finite, of "{\<zero>, \<one>}"] by (simp add: order_def)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	790	have "card {x \<in> carrier (mult_of R). x [^] d = \<one>} \<le> card {x \<in> carrier R. x [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	791	using finite by (auto intro: card_mono)
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	792	also have "\<dots> \<le> d" using \<open>0 < order (mult_of R)\<close> num_roots_le_deg[OF finite, of d]
ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	793	by (simp add : dvd_pos_nat[OF _ \<open>d dvd order (mult_of R)\<close>])
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	794	finally show ?thesis using G.ord_inj'[OF finite' a] ord_a * by (simp add: card_image)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	795	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	796	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	797
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	798	have set_eq2:"{x \<in> carrier (mult_of R) . group.ord (mult_of R) x = d}
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	799	= (\<lambda> n . a[^]n) ` {n \<in> {1 .. d}. group.ord (mult_of R) (a[^]n) = d}" (is "?L = ?R")
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	800	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	801	{ fix x assume x:"x \<in> (carrier (mult_of R)) \<and> group.ord (mult_of R) x = d"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	802	hence "x \<in> {x \<in> carrier (mult_of R). x [^] d = \<one>}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	803	by (simp add: G.pow_ord_eq_1[OF finite', of x, symmetric])
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	804	then obtain n where n:"x = a[^]n \<and> n \<in> {1 .. d}" using set_eq1 by blast
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	805	hence "x \<in> ?R" using x by fast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	806	} thus "?L \<subseteq> ?R" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	807	show "?R \<subseteq> ?L" using a by (auto simp add: carrier_mult_of[symmetric] simp del: carrier_mult_of)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	808	qed
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	809	have "inj_on (\<lambda> n . a[^]n) {n \<in> {1 .. d}. group.ord (mult_of R) (a[^]n) = d}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	810	using G.ord_inj'[OF finite' a, unfolded ord_a] unfolding inj_on_def by fast
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	811	hence "card ((\<lambda>n. a[^]n) ` {n \<in> {1 .. d}. group.ord (mult_of R) (a[^]n) = d})
df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	812	= card {k \<in> {1 .. d}. group.ord (mult_of R) (a[^]k) = d}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	813	using card_image by blast
67226 ec32cdaab97b isabelle update_cartouches -c -t; wenzelm parents: 67051 diff changeset	814	thus ?thesis using set_eq2 G.pow_ord_eq_ord_iff[OF finite' \<open>a \<in> _\<close>, unfolded ord_a]
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	815	by (simp add: phi'_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	816	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	817
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	818	end
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	819
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	820
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	821	theorem (in field) finite_field_mult_group_has_gen :
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	822	assumes finite:"finite (carrier R)"
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	823	shows "\<exists> a \<in> carrier (mult_of R) . carrier (mult_of R) = {a[^]i \| i::nat . i \<in> UNIV}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	824	proof -
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	825	note mult_of_simps[simp]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	826	have finite': "finite (carrier (mult_of R))" using finite by (rule finite_mult_of)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	827
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	828	interpret G: group "mult_of R" rewrites
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67341 diff changeset	829	"([^]\<^bsub>mult_of R\<^esub>) = (([^]) :: _ \<Rightarrow> nat \<Rightarrow> _)" and "\<one>\<^bsub>mult_of R\<^esub> = \<one>"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	830	by (rule field_mult_group) (simp_all add: fun_eq_iff nat_pow_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	831
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	832	let ?N = "\<lambda> x . card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = x}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	833	have "0 < order R - 1" unfolding order_def using card_mono[OF finite, of "{\<zero>, \<one>}"] by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	834	then have *: "0 < order (mult_of R)" using assms by (simp add: order_mult_of)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	835	have fin: "finite {d. d dvd order (mult_of R) }" using dvd_nat_bounds[OF *] by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	836
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	837	have "(\<Sum>d \| d dvd order (mult_of R). ?N d)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	838	= card (UN d:{d . d dvd order (mult_of R) }. {a \<in> carrier (mult_of R). group.ord (mult_of R) a = d})"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	839	(is "_ = card ?U")
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	840	using fin finite by (subst card_UN_disjoint) auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	841	also have "?U = carrier (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	842	proof
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	843	{ fix x assume x:"x \<in> carrier (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	844	hence x':"x\<in>carrier (mult_of R)" by simp
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	845	then have "group.ord (mult_of R) x dvd order (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	846	using finite' G.ord_dvd_group_order[OF _ x'] by (simp add: order_mult_of)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	847	hence "x \<in> ?U" using dvd_nat_bounds[of "order (mult_of R)" "group.ord (mult_of R) x"] x by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	848	} thus "carrier (mult_of R) \<subseteq> ?U" by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	849	qed auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	850	also have "card ... = order (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	851	using order_mult_of finite' by (simp add: order_def)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	852	finally have sum_Ns_eq: "(\<Sum>d \| d dvd order (mult_of R). ?N d) = order (mult_of R)" .
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	853
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	854	{ fix d assume d:"d dvd order (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	855	have "card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = d} \<le> phi' d"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	856	proof cases
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	857	assume "card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = d} = 0" thus ?thesis by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	858	next
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	859	assume "card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = d} \<noteq> 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	860	hence "\<exists>a \<in> carrier (mult_of R). group.ord (mult_of R) a = d" by (auto simp: card_eq_0_iff)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	861	thus ?thesis using num_elems_of_ord_eq_phi'[OF finite d] by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	862	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	863	}
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	864	hence all_le:"\<And>i. i \<in> {d. d dvd order (mult_of R) }
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	865	\<Longrightarrow> (\<lambda>i. card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = i}) i \<le> (\<lambda>i. phi' i) i" by fast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	866	hence le:"(\<Sum>i \| i dvd order (mult_of R). ?N i)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	867	\<le> (\<Sum>i \| i dvd order (mult_of R). phi' i)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	868	using sum_mono[of "{d . d dvd order (mult_of R)}"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	869	"\<lambda>i. card {a \<in> carrier (mult_of R). group.ord (mult_of R) a = i}"] by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	870	have "order (mult_of R) = (\<Sum>d \| d dvd order (mult_of R). phi' d)" using *
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	871	by (simp add: sum_phi'_factors)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	872	hence eq:"(\<Sum>i \| i dvd order (mult_of R). ?N i)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	873	= (\<Sum>i \| i dvd order (mult_of R). phi' i)" using le sum_Ns_eq by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	874	have "\<And>i. i \<in> {d. d dvd order (mult_of R) } \<Longrightarrow> ?N i = (\<lambda>i. phi' i) i"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	875	proof (rule ccontr)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	876	fix i
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	877	assume i1:"i \<in> {d. d dvd order (mult_of R)}" and "?N i \<noteq> phi' i"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	878	hence "?N i = 0"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	879	using num_elems_of_ord_eq_phi'[OF finite, of i] by (auto simp: card_eq_0_iff)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	880	moreover have "0 < i" using * i1 by (simp add: dvd_nat_bounds[of "order (mult_of R)" i])
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	881	ultimately have "?N i < phi' i" using phi'_nonzero by presburger
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	882	hence "(\<Sum>i \| i dvd order (mult_of R). ?N i)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	883	< (\<Sum>i \| i dvd order (mult_of R). phi' i)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	884	using sum_strict_mono_ex1[OF fin, of "?N" "\<lambda> i . phi' i"]
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	885	i1 all_le by auto
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	886	thus False using eq by force
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	887	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	888	hence "?N (order (mult_of R)) > 0" using * by (simp add: phi'_nonzero)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	889	then obtain a where a:"a \<in> carrier (mult_of R)" and a_ord:"group.ord (mult_of R) a = order (mult_of R)"
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	890	by (auto simp add: card_gt_0_iff)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	891	hence set_eq:"{a[^]i \| i::nat. i \<in> UNIV} = (\<lambda>x. a[^]x) ` {0 .. group.ord (mult_of R) a - 1}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	892	using G.ord_elems[OF finite'] by auto
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	893	have card_eq:"card ((\<lambda>x. a[^]x) ` {0 .. group.ord (mult_of R) a - 1}) = card {0 .. group.ord (mult_of R) a - 1}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	894	by (intro card_image G.ord_inj finite' a)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	895	hence "card ((\<lambda> x . a[^]x) ` {0 .. group.ord (mult_of R) a - 1}) = card {0 ..order (mult_of R) - 1}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	896	using assms by (simp add: card_eq a_ord)
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	897	hence card_R_minus_1:"card {a[^]i \| i::nat. i \<in> UNIV} = order (mult_of R)"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	898	using * by (subst set_eq) auto
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	899	have **:"{a[^]i \| i::nat. i \<in> UNIV} \<subseteq> carrier (mult_of R)"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	900	using G.nat_pow_closed[OF a] by auto
67341 df79ef3b3a41 Renamed (^) to [^] in preparation of the move from "op X" to (X) nipkow parents: 67299 diff changeset	901	with _ have "carrier (mult_of R) = {a[^]i\|i::nat. i \<in> UNIV}"
65416 f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	902	by (rule card_seteq[symmetric]) (simp_all add: card_R_minus_1 finite order_def del: UNIV_I)
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	903	thus ?thesis using a by blast
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	904	qed
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	905
f707dbcf11e3 more approproiate placement of theories MiscAlgebra and Multiplicate_Group haftmann parents: diff changeset	906	end

author	wenzelm
	Sat, 27 Jan 2018 20:35:34 +0100
changeset 67519	6905b156a030
parent 67399	eab6ce8368fa
child 68157	057d5b4ce47e
permissions	-rw-r--r--