isabelle: src/HOL/Library/Formal_Power_Series.thy@498f6ff16804 (annotated)

41959 b460124855b8 tuned headers; wenzelm parents: 39302 diff changeset	1	(* Title: HOL/Library/Formal_Power_Series.thy
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2	Author: Amine Chaieb, University of Cambridge
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3	*)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	5	section \<open>A formalization of formal power series\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	6
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	7	theory Formal_Power_Series
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	8	imports Complex_Main "~~/src/HOL/Number_Theory/Euclidean_Algorithm"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	9	begin
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	10
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	11
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	12	subsection \<open>The type of formal power series\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	13
49834 b27bbb021df1 discontinued obsolete typedef (open) syntax; wenzelm parents: 48757 diff changeset	14	typedef 'a fps = "{f :: nat \<Rightarrow> 'a. True}"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	15	morphisms fps_nth Abs_fps
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	16	by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	17
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	18	notation fps_nth (infixl "$" 75)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	19
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	20	lemma expand_fps_eq: "p = q \<longleftrightarrow> (\<forall>n. p $ n = q $ n)"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	21	by (simp add: fps_nth_inject [symmetric] fun_eq_iff)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	22
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	23	lemma fps_ext: "(\<And>n. p $ n = q $ n) \<Longrightarrow> p = q"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	24	by (simp add: expand_fps_eq)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	25
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	26	lemma fps_nth_Abs_fps [simp]: "Abs_fps f $ n = f n"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	27	by (simp add: Abs_fps_inverse)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	28
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	29	text \<open>Definition of the basic elements 0 and 1 and the basic operations of addition,
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	30	negation and multiplication.\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	31
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36350 diff changeset	32	instantiation fps :: (zero) zero
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	33	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	34	definition fps_zero_def: "0 = Abs_fps (\<lambda>n. 0)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	35	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	36	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	37
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	38	lemma fps_zero_nth [simp]: "0 $ n = 0"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	39	unfolding fps_zero_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	40
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36350 diff changeset	41	instantiation fps :: ("{one, zero}") one
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	42	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	43	definition fps_one_def: "1 = Abs_fps (\<lambda>n. if n = 0 then 1 else 0)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	44	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	45	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	46
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	47	lemma fps_one_nth [simp]: "1 $ n = (if n = 0 then 1 else 0)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	48	unfolding fps_one_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	49
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	50	instantiation fps :: (plus) plus
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	51	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	52	definition fps_plus_def: "op + = (\<lambda>f g. Abs_fps (\<lambda>n. f $ n + g $ n))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	53	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	54	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	55
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	56	lemma fps_add_nth [simp]: "(f + g) $ n = f $ n + g $ n"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	57	unfolding fps_plus_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	58
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	59	instantiation fps :: (minus) minus
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	60	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	61	definition fps_minus_def: "op - = (\<lambda>f g. Abs_fps (\<lambda>n. f $ n - g $ n))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	62	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	63	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	64
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	65	lemma fps_sub_nth [simp]: "(f - g) $ n = f $ n - g $ n"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	66	unfolding fps_minus_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	67
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	68	instantiation fps :: (uminus) uminus
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	69	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	70	definition fps_uminus_def: "uminus = (\<lambda>f. Abs_fps (\<lambda>n. - (f $ n)))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	71	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	72	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	73
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	74	lemma fps_neg_nth [simp]: "(- f) $ n = - (f $ n)"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	75	unfolding fps_uminus_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	76
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	77	instantiation fps :: ("{comm_monoid_add, times}") times
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	78	begin
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	79	definition fps_times_def: "op * = (\<lambda>f g. Abs_fps (\<lambda>n. \<Sum>i=0..n. f $ i * g $ (n - i)))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	80	instance ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	81	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	82
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	83	lemma fps_mult_nth: "(f * g) $ n = (\<Sum>i=0..n. f$i * g$(n - i))"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	84	unfolding fps_times_def by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	85
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	86	lemma fps_mult_nth_0 [simp]: "(f * g) $ 0 = f $ 0 * g $ 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	87	unfolding fps_times_def by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	88
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	89	declare atLeastAtMost_iff [presburger]
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	90	declare Bex_def [presburger]
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	91	declare Ball_def [presburger]
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	92
29913 89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	93	lemma mult_delta_left:
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	94	fixes x y :: "'a::mult_zero"
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	95	shows "(if b then x else 0) * y = (if b then x * y else 0)"
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	96	by simp
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	97
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	98	lemma mult_delta_right:
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	99	fixes x y :: "'a::mult_zero"
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	100	shows "x * (if b then y else 0) = (if b then x * y else 0)"
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	101	by simp
89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	102
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	103	lemma cond_value_iff: "f (if b then x else y) = (if b then f x else f y)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	104	by auto
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	105
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	106	lemma cond_application_beta: "(if b then f else g) x = (if b then f x else g x)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	107	by auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	108
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	109
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	110	subsection \<open>Formal power series form a commutative ring with unity, if the range of sequences
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	111	they represent is a commutative ring with unity\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	112
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	113	instance fps :: (semigroup_add) semigroup_add
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	114	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	115	fix a b c :: "'a fps"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	116	show "a + b + c = a + (b + c)"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	117	by (simp add: fps_ext add.assoc)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	118	qed
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	119
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	120	instance fps :: (ab_semigroup_add) ab_semigroup_add
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	121	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	122	fix a b :: "'a fps"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	123	show "a + b = b + a"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	124	by (simp add: fps_ext add.commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	125	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	126
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	127	lemma fps_mult_assoc_lemma:
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	128	fixes k :: nat
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	129	and f :: "nat \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> 'a::comm_monoid_add"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	130	shows "(\<Sum>j=0..k. \<Sum>i=0..j. f i (j - i) (n - j)) =
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	131	(\<Sum>j=0..k. \<Sum>i=0..k - j. f j i (n - j - i))"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	132	by (induct k) (simp_all add: Suc_diff_le setsum.distrib add.assoc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	133
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	134	instance fps :: (semiring_0) semigroup_mult
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	135	proof
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	136	fix a b c :: "'a fps"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	137	show "(a * b) * c = a * (b * c)"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	138	proof (rule fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	139	fix n :: nat
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	140	have "(\<Sum>j=0..n. \<Sum>i=0..j. a$i * b$(j - i) * c$(n - j)) =
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	141	(\<Sum>j=0..n. \<Sum>i=0..n - j. a$j * b$i * c$(n - j - i))"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	142	by (rule fps_mult_assoc_lemma)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	143	then show "((a * b) * c) $ n = (a * (b * c)) $ n"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	144	by (simp add: fps_mult_nth setsum_right_distrib setsum_left_distrib mult.assoc)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	145	qed
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	146	qed
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	147
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	148	lemma fps_mult_commute_lemma:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	149	fixes n :: nat
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	150	and f :: "nat \<Rightarrow> nat \<Rightarrow> 'a::comm_monoid_add"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	151	shows "(\<Sum>i=0..n. f i (n - i)) = (\<Sum>i=0..n. f (n - i) i)"
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	152	by (rule setsum.reindex_bij_witness[where i="op - n" and j="op - n"]) auto
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	153
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	154	instance fps :: (comm_semiring_0) ab_semigroup_mult
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	155	proof
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	156	fix a b :: "'a fps"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	157	show "a * b = b * a"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	158	proof (rule fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	159	fix n :: nat
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	160	have "(\<Sum>i=0..n. a$i * b$(n - i)) = (\<Sum>i=0..n. a$(n - i) * b$i)"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	161	by (rule fps_mult_commute_lemma)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	162	then show "(a * b) $ n = (b * a) $ n"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	163	by (simp add: fps_mult_nth mult.commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	164	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	165	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	166
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	167	instance fps :: (monoid_add) monoid_add
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	168	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	169	fix a :: "'a fps"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	170	show "0 + a = a" by (simp add: fps_ext)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	171	show "a + 0 = a" by (simp add: fps_ext)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	172	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	173
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	174	instance fps :: (comm_monoid_add) comm_monoid_add
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	175	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	176	fix a :: "'a fps"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	177	show "0 + a = a" by (simp add: fps_ext)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	178	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	179
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	180	instance fps :: (semiring_1) monoid_mult
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	181	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	182	fix a :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	183	show "1 * a = a"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	184	by (simp add: fps_ext fps_mult_nth mult_delta_left setsum.delta)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	185	show "a * 1 = a"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	186	by (simp add: fps_ext fps_mult_nth mult_delta_right setsum.delta')
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	187	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	188
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	189	instance fps :: (cancel_semigroup_add) cancel_semigroup_add
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	190	proof
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	191	fix a b c :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	192	show "b = c" if "a + b = a + c"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	193	using that by (simp add: expand_fps_eq)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	194	show "b = c" if "b + a = c + a"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	195	using that by (simp add: expand_fps_eq)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	196	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	197
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	198	instance fps :: (cancel_ab_semigroup_add) cancel_ab_semigroup_add
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	199	proof
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	200	fix a b c :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	201	show "a + b - a = b"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	202	by (simp add: expand_fps_eq)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	203	show "a - b - c = a - (b + c)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	204	by (simp add: expand_fps_eq diff_diff_eq)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	205	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	206
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	207	instance fps :: (cancel_comm_monoid_add) cancel_comm_monoid_add ..
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	208
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	209	instance fps :: (group_add) group_add
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	210	proof
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	211	fix a b :: "'a fps"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	212	show "- a + a = 0" by (simp add: fps_ext)
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	213	show "a + - b = a - b" by (simp add: fps_ext)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	214	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	215
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	216	instance fps :: (ab_group_add) ab_group_add
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	217	proof
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	218	fix a b :: "'a fps"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	219	show "- a + a = 0" by (simp add: fps_ext)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	220	show "a - b = a + - b" by (simp add: fps_ext)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	221	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	222
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	223	instance fps :: (zero_neq_one) zero_neq_one
60679 ade12ef2773c tuned proofs; wenzelm parents: 60567 diff changeset	224	by standard (simp add: expand_fps_eq)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	225
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	226	instance fps :: (semiring_0) semiring
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	227	proof
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	228	fix a b c :: "'a fps"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	229	show "(a + b) * c = a * c + b * c"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	230	by (simp add: expand_fps_eq fps_mult_nth distrib_right setsum.distrib)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	231	show "a * (b + c) = a * b + a * c"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	232	by (simp add: expand_fps_eq fps_mult_nth distrib_left setsum.distrib)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	233	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	234
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	235	instance fps :: (semiring_0) semiring_0
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	236	proof
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	237	fix a :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	238	show "0 * a = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	239	by (simp add: fps_ext fps_mult_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	240	show "a * 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	241	by (simp add: fps_ext fps_mult_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	242	qed
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	243
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	244	instance fps :: (semiring_0_cancel) semiring_0_cancel ..
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	245
60867 86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	246	instance fps :: (semiring_1) semiring_1 ..
86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	247
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	248
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	249	subsection \<open>Selection of the nth power of the implicit variable in the infinite sum\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	250
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	251	lemma fps_nonzero_nth: "f \<noteq> 0 \<longleftrightarrow> (\<exists> n. f $n \<noteq> 0)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	252	by (simp add: expand_fps_eq)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	253
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	254	lemma fps_nonzero_nth_minimal: "f \<noteq> 0 \<longleftrightarrow> (\<exists>n. f $ n \<noteq> 0 \<and> (\<forall>m < n. f $ m = 0))"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	255	(is "?lhs \<longleftrightarrow> ?rhs")
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	256	proof
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	257	let ?n = "LEAST n. f $ n \<noteq> 0"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	258	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	259	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	260	from that have "\<exists>n. f $ n \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	261	by (simp add: fps_nonzero_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	262	then have "f $ ?n \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	263	by (rule LeastI_ex)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	264	moreover have "\<forall>m<?n. f $ m = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	265	by (auto dest: not_less_Least)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	266	ultimately have "f $ ?n \<noteq> 0 \<and> (\<forall>m<?n. f $ m = 0)" ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	267	then show ?thesis ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	268	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	269	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	270	using that by (auto simp add: expand_fps_eq)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	271	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	272
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	273	lemma fps_eq_iff: "f = g \<longleftrightarrow> (\<forall>n. f $ n = g $n)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	274	by (rule expand_fps_eq)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	275
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	276	lemma fps_setsum_nth: "setsum f S $ n = setsum (\<lambda>k. (f k) $ n) S"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	277	proof (cases "finite S")
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	278	case True
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	279	then show ?thesis by (induct set: finite) auto
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	280	next
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	281	case False
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	282	then show ?thesis by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	283	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	284
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	285
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	286	subsection \<open>Injection of the basic ring elements and multiplication by scalars\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	287
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	288	definition "fps_const c = Abs_fps (\<lambda>n. if n = 0 then c else 0)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	289
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	290	lemma fps_nth_fps_const [simp]: "fps_const c $ n = (if n = 0 then c else 0)"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	291	unfolding fps_const_def by simp
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	292
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	293	lemma fps_const_0_eq_0 [simp]: "fps_const 0 = 0"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	294	by (simp add: fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	295
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	296	lemma fps_const_1_eq_1 [simp]: "fps_const 1 = 1"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	297	by (simp add: fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	298
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	299	lemma fps_const_neg [simp]: "- (fps_const (c::'a::ring)) = fps_const (- c)"
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	300	by (simp add: fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	301
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	302	lemma fps_const_add [simp]: "fps_const (c::'a::monoid_add) + fps_const d = fps_const (c + d)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	303	by (simp add: fps_ext)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	304
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	305	lemma fps_const_sub [simp]: "fps_const (c::'a::group_add) - fps_const d = fps_const (c - d)"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	306	by (simp add: fps_ext)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	307
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	308	lemma fps_const_mult[simp]: "fps_const (c::'a::ring) * fps_const d = fps_const (c * d)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	309	by (simp add: fps_eq_iff fps_mult_nth setsum.neutral)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	310
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	311	lemma fps_const_add_left: "fps_const (c::'a::monoid_add) + f =
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	312	Abs_fps (\<lambda>n. if n = 0 then c + f$0 else f$n)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	313	by (simp add: fps_ext)
c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	314
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	315	lemma fps_const_add_right: "f + fps_const (c::'a::monoid_add) =
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	316	Abs_fps (\<lambda>n. if n = 0 then f$0 + c else f$n)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	317	by (simp add: fps_ext)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	318
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	319	lemma fps_const_mult_left: "fps_const (c::'a::semiring_0) * f = Abs_fps (\<lambda>n. c * f$n)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	320	unfolding fps_eq_iff fps_mult_nth
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	321	by (simp add: fps_const_def mult_delta_left setsum.delta)
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	322
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	323	lemma fps_const_mult_right: "f * fps_const (c::'a::semiring_0) = Abs_fps (\<lambda>n. f$n * c)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	324	unfolding fps_eq_iff fps_mult_nth
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	325	by (simp add: fps_const_def mult_delta_right setsum.delta')
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	326
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	327	lemma fps_mult_left_const_nth [simp]: "(fps_const (c::'a::semiring_1) * f)$n = c* f$n"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	328	by (simp add: fps_mult_nth mult_delta_left setsum.delta)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	329
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	330	lemma fps_mult_right_const_nth [simp]: "(f * fps_const (c::'a::semiring_1))$n = f$n * c"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	331	by (simp add: fps_mult_nth mult_delta_right setsum.delta')
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	332
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	333
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	334	subsection \<open>Formal power series form an integral domain\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	335
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	336	instance fps :: (ring) ring ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	337
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	338	instance fps :: (ring_1) ring_1
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	339	by (intro_classes, auto simp add: distrib_right)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	340
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	341	instance fps :: (comm_ring_1) comm_ring_1
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	342	by (intro_classes, auto simp add: distrib_right)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	343
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	344	instance fps :: (ring_no_zero_divisors) ring_no_zero_divisors
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	345	proof
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	346	fix a b :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	347	assume "a \<noteq> 0" and "b \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	348	then obtain i j where i: "a $ i \<noteq> 0" "\<forall>k<i. a $ k = 0" and j: "b $ j \<noteq> 0" "\<forall>k<j. b $ k =0"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	349	unfolding fps_nonzero_nth_minimal
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	350	by blast+
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	351	have "(a * b) $ (i + j) = (\<Sum>k=0..i+j. a $ k * b $ (i + j - k))"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	352	by (rule fps_mult_nth)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	353	also have "\<dots> = (a $ i * b $ (i + j - i)) + (\<Sum>k\<in>{0..i+j} - {i}. a $ k * b $ (i + j - k))"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	354	by (rule setsum.remove) simp_all
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	355	also have "(\<Sum>k\<in>{0..i+j}-{i}. a $ k * b $ (i + j - k)) = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	356	proof (rule setsum.neutral [rule_format])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	357	fix k assume "k \<in> {0..i+j} - {i}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	358	then have "k < i \<or> i+j-k < j"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	359	by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	360	then show "a $ k * b $ (i + j - k) = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	361	using i j by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	362	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	363	also have "a $ i * b $ (i + j - i) + 0 = a $ i * b $ j"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	364	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	365	also have "a $ i * b $ j \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	366	using i j by simp
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	367	finally have "(a*b) $ (i+j) \<noteq> 0" .
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	368	then show "a * b \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	369	unfolding fps_nonzero_nth by blast
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	370	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	371
36311 ed3a87a7f977 epheremal replacement of field_simps by field_eq_simps; dropped old division_by_zero instance haftmann parents: 36309 diff changeset	372	instance fps :: (ring_1_no_zero_divisors) ring_1_no_zero_divisors ..
ed3a87a7f977 epheremal replacement of field_simps by field_eq_simps; dropped old division_by_zero instance haftmann parents: 36309 diff changeset	373
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	374	instance fps :: (idom) idom ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	375
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	376	lemma numeral_fps_const: "numeral k = fps_const (numeral k)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	377	by (induct k) (simp_all only: numeral.simps fps_const_1_eq_1
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	378	fps_const_add [symmetric])
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	379
60867 86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	380	lemma neg_numeral_fps_const:
86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	381	"(- numeral k :: 'a :: ring_1 fps) = fps_const (- numeral k)"
86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	382	by (simp add: numeral_fps_const)
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	383
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	384	lemma fps_numeral_nth: "numeral n $ i = (if i = 0 then numeral n else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	385	by (simp add: numeral_fps_const)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	386
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	387	lemma fps_numeral_nth_0 [simp]: "numeral n $ 0 = numeral n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	388	by (simp add: numeral_fps_const)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	389
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	390
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	391	subsection \<open>The eXtractor series X\<close>
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	392
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	393	lemma minus_one_power_iff: "(- (1::'a::comm_ring_1)) ^ n = (if even n then 1 else - 1)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	394	by (induct n) auto
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	395
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	396	definition "X = Abs_fps (\<lambda>n. if n = 1 then 1 else 0)"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	397
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	398	lemma X_mult_nth [simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	399	"(X * (f :: 'a::semiring_1 fps)) $n = (if n = 0 then 0 else f $ (n - 1))"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	400	proof (cases "n = 0")
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	401	case False
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	402	have "(X * f) $n = (\<Sum>i = 0..n. X $ i * f $ (n - i))"
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	403	by (simp add: fps_mult_nth)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	404	also have "\<dots> = f $ (n - 1)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	405	using False by (simp add: X_def mult_delta_left setsum.delta)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	406	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	407	using False by simp
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	408	next
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	409	case True
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	410	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	411	by (simp add: fps_mult_nth X_def)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	412	qed
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	413
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	414	lemma X_mult_right_nth[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	415	"((f :: 'a::comm_semiring_1 fps) * X) $n = (if n = 0 then 0 else f $ (n - 1))"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	416	by (metis X_mult_nth mult.commute)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	417
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	418	lemma X_power_iff: "X^k = Abs_fps (\<lambda>n. if n = k then 1::'a::comm_ring_1 else 0)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	419	proof (induct k)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	420	case 0
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	421	then show ?case by (simp add: X_def fps_eq_iff)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	422	next
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	423	case (Suc k)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	424	have "(X^Suc k) $ m = (if m = Suc k then 1::'a else 0)" for m
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	425	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	426	have "(X^Suc k) $ m = (if m = 0 then 0 else (X^k) $ (m - 1))"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	427	by (simp del: One_nat_def)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	428	then show ?thesis
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	429	using Suc.hyps by (auto cong del: if_weak_cong)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	430	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	431	then show ?case
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	432	by (simp add: fps_eq_iff)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	433	qed
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	434
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	435	lemma X_nth[simp]: "X$n = (if n = 1 then 1 else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	436	by (simp add: X_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	437
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	438	lemma X_power_nth[simp]: "(X^k) $n = (if n = k then 1 else 0::'a::comm_ring_1)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	439	by (simp add: X_power_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	440
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	441	lemma X_power_mult_nth: "(X^k * (f :: 'a::comm_ring_1 fps)) $n = (if n < k then 0 else f $ (n - k))"
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	442	apply (induct k arbitrary: n)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	443	apply simp
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	444	unfolding power_Suc mult.assoc
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	445	apply (case_tac n)
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	446	apply auto
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	447	done
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	448
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	449	lemma X_power_mult_right_nth:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	450	"((f :: 'a::comm_ring_1 fps) * X^k) $n = (if n < k then 0 else f $ (n - k))"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	451	by (metis X_power_mult_nth mult.commute)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	452
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	453
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	454	lemma X_neq_fps_const [simp]: "(X :: 'a :: zero_neq_one fps) \<noteq> fps_const c"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	455	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	456	assume "(X::'a fps) = fps_const (c::'a)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	457	hence "X$1 = (fps_const (c::'a))$1" by (simp only:)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	458	thus False by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	459	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	460
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	461	lemma X_neq_zero [simp]: "(X :: 'a :: zero_neq_one fps) \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	462	by (simp only: fps_const_0_eq_0[symmetric] X_neq_fps_const) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	463
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	464	lemma X_neq_one [simp]: "(X :: 'a :: zero_neq_one fps) \<noteq> 1"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	465	by (simp only: fps_const_1_eq_1[symmetric] X_neq_fps_const) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	466
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	467	lemma X_neq_numeral [simp]: "(X :: 'a :: {semiring_1,zero_neq_one} fps) \<noteq> numeral c"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	468	by (simp only: numeral_fps_const X_neq_fps_const) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	469
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	470	lemma X_pow_eq_X_pow_iff [simp]:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	471	"(X :: ('a :: {comm_ring_1}) fps) ^ m = X ^ n \<longleftrightarrow> m = n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	472	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	473	assume "(X :: 'a fps) ^ m = X ^ n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	474	hence "(X :: 'a fps) ^ m $ m = X ^ n $ m" by (simp only:)
62390 842917225d56 more canonical names nipkow parents: 62343 diff changeset	475	thus "m = n" by (simp split: if_split_asm)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	476	qed simp_all
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	477
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	478
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	479	subsection \<open>Subdegrees\<close>
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	480
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	481	definition subdegree :: "('a::zero) fps \<Rightarrow> nat" where
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	482	"subdegree f = (if f = 0 then 0 else LEAST n. f$n \<noteq> 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	483
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	484	lemma subdegreeI:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	485	assumes "f $ d \<noteq> 0" and "\<And>i. i < d \<Longrightarrow> f $ i = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	486	shows "subdegree f = d"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	487	proof-
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	488	from assms(1) have "f \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	489	moreover from assms(1) have "(LEAST i. f $ i \<noteq> 0) = d"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	490	proof (rule Least_equality)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	491	fix e assume "f $ e \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	492	with assms(2) have "\<not>(e < d)" by blast
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	493	thus "e \<ge> d" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	494	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	495	ultimately show ?thesis unfolding subdegree_def by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	496	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	497
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	498	lemma nth_subdegree_nonzero [simp,intro]: "f \<noteq> 0 \<Longrightarrow> f $ subdegree f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	499	proof-
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	500	assume "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	501	hence "subdegree f = (LEAST n. f $ n \<noteq> 0)" by (simp add: subdegree_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	502	also from \<open>f \<noteq> 0\<close> have "\<exists>n. f$n \<noteq> 0" using fps_nonzero_nth by blast
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	503	from LeastI_ex[OF this] have "f $ (LEAST n. f $ n \<noteq> 0) \<noteq> 0" .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	504	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	505	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	506
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	507	lemma nth_less_subdegree_zero [dest]: "n < subdegree f \<Longrightarrow> f $ n = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	508	proof (cases "f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	509	assume "f \<noteq> 0" and less: "n < subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	510	note less
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	511	also from \<open>f \<noteq> 0\<close> have "subdegree f = (LEAST n. f $ n \<noteq> 0)" by (simp add: subdegree_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	512	finally show "f $ n = 0" using not_less_Least by blast
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	513	qed simp_all
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	514
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	515	lemma subdegree_geI:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	516	assumes "f \<noteq> 0" "\<And>i. i < n \<Longrightarrow> f$i = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	517	shows "subdegree f \<ge> n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	518	proof (rule ccontr)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	519	assume "\<not>(subdegree f \<ge> n)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	520	with assms(2) have "f $ subdegree f = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	521	moreover from assms(1) have "f $ subdegree f \<noteq> 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	522	ultimately show False by contradiction
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	523	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	524
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	525	lemma subdegree_greaterI:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	526	assumes "f \<noteq> 0" "\<And>i. i \<le> n \<Longrightarrow> f$i = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	527	shows "subdegree f > n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	528	proof (rule ccontr)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	529	assume "\<not>(subdegree f > n)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	530	with assms(2) have "f $ subdegree f = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	531	moreover from assms(1) have "f $ subdegree f \<noteq> 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	532	ultimately show False by contradiction
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	533	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	534
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	535	lemma subdegree_leI:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	536	"f $ n \<noteq> 0 \<Longrightarrow> subdegree f \<le> n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	537	by (rule leI) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	538
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	539
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	540	lemma subdegree_0 [simp]: "subdegree 0 = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	541	by (simp add: subdegree_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	542
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	543	lemma subdegree_1 [simp]: "subdegree (1 :: ('a :: zero_neq_one) fps) = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	544	by (auto intro!: subdegreeI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	545
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	546	lemma subdegree_X [simp]: "subdegree (X :: ('a :: zero_neq_one) fps) = 1"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	547	by (auto intro!: subdegreeI simp: X_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	548
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	549	lemma subdegree_fps_const [simp]: "subdegree (fps_const c) = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	550	by (cases "c = 0") (auto intro!: subdegreeI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	551
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	552	lemma subdegree_numeral [simp]: "subdegree (numeral n) = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	553	by (simp add: numeral_fps_const)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	554
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	555	lemma subdegree_eq_0_iff: "subdegree f = 0 \<longleftrightarrow> f = 0 \<or> f $ 0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	556	proof (cases "f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	557	assume "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	558	thus ?thesis
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	559	using nth_subdegree_nonzero[OF \<open>f \<noteq> 0\<close>] by (fastforce intro!: subdegreeI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	560	qed simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	561
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	562	lemma subdegree_eq_0 [simp]: "f $ 0 \<noteq> 0 \<Longrightarrow> subdegree f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	563	by (simp add: subdegree_eq_0_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	564
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	565	lemma nth_subdegree_mult [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	566	fixes f g :: "('a :: {mult_zero,comm_monoid_add}) fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	567	shows "(f * g) $ (subdegree f + subdegree g) = f $ subdegree f * g $ subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	568	proof-
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	569	let ?n = "subdegree f + subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	570	have "(f * g) $ ?n = (\<Sum>i=0..?n. f$i * g$(?n-i))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	571	by (simp add: fps_mult_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	572	also have "... = (\<Sum>i=0..?n. if i = subdegree f then f$i * g$(?n-i) else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	573	proof (intro setsum.cong)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	574	fix x assume x: "x \<in> {0..?n}"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	575	hence "x = subdegree f \<or> x < subdegree f \<or> ?n - x < subdegree g" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	576	thus "f $ x * g $ (?n - x) = (if x = subdegree f then f $ x * g $ (?n - x) else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	577	by (elim disjE conjE) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	578	qed auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	579	also have "... = f $ subdegree f * g $ subdegree g" by (simp add: setsum.delta)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	580	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	581	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	582
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	583	lemma subdegree_mult [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	584	assumes "f \<noteq> 0" "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	585	shows "subdegree ((f :: ('a :: {ring_no_zero_divisors}) fps) * g) = subdegree f + subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	586	proof (rule subdegreeI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	587	let ?n = "subdegree f + subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	588	have "(f * g) $ ?n = (\<Sum>i=0..?n. f$i * g$(?n-i))" by (simp add: fps_mult_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	589	also have "... = (\<Sum>i=0..?n. if i = subdegree f then f$i * g$(?n-i) else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	590	proof (intro setsum.cong)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	591	fix x assume x: "x \<in> {0..?n}"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	592	hence "x = subdegree f \<or> x < subdegree f \<or> ?n - x < subdegree g" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	593	thus "f $ x * g $ (?n - x) = (if x = subdegree f then f $ x * g $ (?n - x) else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	594	by (elim disjE conjE) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	595	qed auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	596	also have "... = f $ subdegree f * g $ subdegree g" by (simp add: setsum.delta)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	597	also from assms have "... \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	598	finally show "(f * g) $ (subdegree f + subdegree g) \<noteq> 0" .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	599	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	600	fix m assume m: "m < subdegree f + subdegree g"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	601	have "(f * g) $ m = (\<Sum>i=0..m. f$i * g$(m-i))" by (simp add: fps_mult_nth)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	602	also have "... = (\<Sum>i=0..m. 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	603	proof (rule setsum.cong)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	604	fix i assume "i \<in> {0..m}"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	605	with m have "i < subdegree f \<or> m - i < subdegree g" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	606	thus "f$i * g$(m-i) = 0" by (elim disjE) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	607	qed auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	608	finally show "(f * g) $ m = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	609	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	610
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	611	lemma subdegree_power [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	612	"subdegree ((f :: ('a :: ring_1_no_zero_divisors) fps) ^ n) = n * subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	613	by (cases "f = 0"; induction n) simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	614
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	615	lemma subdegree_uminus [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	616	"subdegree (-(f::('a::group_add) fps)) = subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	617	by (simp add: subdegree_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	618
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	619	lemma subdegree_minus_commute [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	620	"subdegree (f-(g::('a::group_add) fps)) = subdegree (g - f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	621	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	622	have "f - g = -(g - f)" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	623	also have "subdegree ... = subdegree (g - f)" by (simp only: subdegree_uminus)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	624	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	625	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	626
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	627	lemma subdegree_add_ge:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	628	assumes "f \<noteq> -(g :: ('a :: {group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	629	shows "subdegree (f + g) \<ge> min (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	630	proof (rule subdegree_geI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	631	from assms show "f + g \<noteq> 0" by (subst (asm) eq_neg_iff_add_eq_0)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	632	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	633	fix i assume "i < min (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	634	hence "f $ i = 0" and "g $ i = 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	635	thus "(f + g) $ i = 0" by force
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	636	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	637
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	638	lemma subdegree_add_eq1:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	639	assumes "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	640	assumes "subdegree f < subdegree (g :: ('a :: {group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	641	shows "subdegree (f + g) = subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	642	proof (rule antisym[OF subdegree_leI])
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	643	from assms show "subdegree (f + g) \<ge> subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	644	by (intro order.trans[OF min.boundedI subdegree_add_ge]) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	645	from assms have "f $ subdegree f \<noteq> 0" "g $ subdegree f = 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	646	thus "(f + g) $ subdegree f \<noteq> 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	647	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	648
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	649	lemma subdegree_add_eq2:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	650	assumes "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	651	assumes "subdegree g < subdegree (f :: ('a :: {ab_group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	652	shows "subdegree (f + g) = subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	653	using subdegree_add_eq1[OF assms] by (simp add: add.commute)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	654
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	655	lemma subdegree_diff_eq1:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	656	assumes "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	657	assumes "subdegree f < subdegree (g :: ('a :: {ab_group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	658	shows "subdegree (f - g) = subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	659	using subdegree_add_eq1[of f "-g"] assms by (simp add: add.commute)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	660
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	661	lemma subdegree_diff_eq2:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	662	assumes "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	663	assumes "subdegree g < subdegree (f :: ('a :: {ab_group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	664	shows "subdegree (f - g) = subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	665	using subdegree_add_eq2[of "-g" f] assms by (simp add: add.commute)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	666
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	667	lemma subdegree_diff_ge [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	668	assumes "f \<noteq> (g :: ('a :: {group_add}) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	669	shows "subdegree (f - g) \<ge> min (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	670	using assms subdegree_add_ge[of f "-g"] by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	671
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	672
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	673
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	674
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	675	subsection \<open>Shifting and slicing\<close>
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	676
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	677	definition fps_shift :: "nat \<Rightarrow> 'a fps \<Rightarrow> 'a fps" where
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	678	"fps_shift n f = Abs_fps (\<lambda>i. f $ (i + n))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	679
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	680	lemma fps_shift_nth [simp]: "fps_shift n f $ i = f $ (i + n)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	681	by (simp add: fps_shift_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	682
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	683	lemma fps_shift_0 [simp]: "fps_shift 0 f = f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	684	by (intro fps_ext) (simp add: fps_shift_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	685
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	686	lemma fps_shift_zero [simp]: "fps_shift n 0 = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	687	by (intro fps_ext) (simp add: fps_shift_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	688
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	689	lemma fps_shift_one: "fps_shift n 1 = (if n = 0 then 1 else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	690	by (intro fps_ext) (simp add: fps_shift_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	691
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	692	lemma fps_shift_fps_const: "fps_shift n (fps_const c) = (if n = 0 then fps_const c else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	693	by (intro fps_ext) (simp add: fps_shift_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	694
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	695	lemma fps_shift_numeral: "fps_shift n (numeral c) = (if n = 0 then numeral c else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	696	by (simp add: numeral_fps_const fps_shift_fps_const)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	697
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	698	lemma fps_shift_X_power [simp]:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	699	"n \<le> m \<Longrightarrow> fps_shift n (X ^ m) = (X ^ (m - n) ::'a::comm_ring_1 fps)"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	700	by (intro fps_ext) (auto simp: fps_shift_def )
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	701
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	702	lemma fps_shift_times_X_power:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	703	"n \<le> subdegree f \<Longrightarrow> fps_shift n f * X ^ n = (f :: 'a :: comm_ring_1 fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	704	by (intro fps_ext) (auto simp: X_power_mult_right_nth nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	705
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	706	lemma fps_shift_times_X_power' [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	707	"fps_shift n (f * X^n) = (f :: 'a :: comm_ring_1 fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	708	by (intro fps_ext) (auto simp: X_power_mult_right_nth nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	709
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	710	lemma fps_shift_times_X_power'':
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	711	"m \<le> n \<Longrightarrow> fps_shift n (f * X^m) = fps_shift (n - m) (f :: 'a :: comm_ring_1 fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	712	by (intro fps_ext) (auto simp: X_power_mult_right_nth nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	713
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	714	lemma fps_shift_subdegree [simp]:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	715	"n \<le> subdegree f \<Longrightarrow> subdegree (fps_shift n f) = subdegree (f :: 'a :: comm_ring_1 fps) - n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	716	by (cases "f = 0") (force intro: nth_less_subdegree_zero subdegreeI)+
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	717
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	718	lemma subdegree_decompose:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	719	"f = fps_shift (subdegree f) f * X ^ subdegree (f :: ('a :: comm_ring_1) fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	720	by (rule fps_ext) (auto simp: X_power_mult_right_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	721
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	722	lemma subdegree_decompose':
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	723	"n \<le> subdegree (f :: ('a :: comm_ring_1) fps) \<Longrightarrow> f = fps_shift n f * X^n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	724	by (rule fps_ext) (auto simp: X_power_mult_right_nth intro!: nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	725
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	726	lemma fps_shift_fps_shift:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	727	"fps_shift (m + n) f = fps_shift m (fps_shift n f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	728	by (rule fps_ext) (simp add: add_ac)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	729
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	730	lemma fps_shift_add:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	731	"fps_shift n (f + g) = fps_shift n f + fps_shift n g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	732	by (simp add: fps_eq_iff)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	733
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	734	lemma fps_shift_mult:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	735	assumes "n \<le> subdegree (g :: 'b :: {comm_ring_1} fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	736	shows "fps_shift n (hg) = h fps_shift n g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	737	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	738	from assms have "g = fps_shift n g * X^n" by (rule subdegree_decompose')
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	739	also have "h * ... = (h * fps_shift n g) * X^n" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	740	also have "fps_shift n ... = h * fps_shift n g" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	741	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	742	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	743
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	744	lemma fps_shift_mult_right:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	745	assumes "n \<le> subdegree (g :: 'b :: {comm_ring_1} fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	746	shows "fps_shift n (gh) = h fps_shift n g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	747	by (subst mult.commute, subst fps_shift_mult) (simp_all add: assms)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	748
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	749	lemma nth_subdegree_zero_iff [simp]: "f $ subdegree f = 0 \<longleftrightarrow> f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	750	by (cases "f = 0") auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	751
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	752	lemma fps_shift_subdegree_zero_iff [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	753	"fps_shift (subdegree f) f = 0 \<longleftrightarrow> f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	754	by (subst (1) nth_subdegree_zero_iff[symmetric], cases "f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	755	(simp_all del: nth_subdegree_zero_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	756
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	757
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	758	definition "fps_cutoff n f = Abs_fps (\<lambda>i. if i < n then f$i else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	759
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	760	lemma fps_cutoff_nth [simp]: "fps_cutoff n f $ i = (if i < n then f$i else 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	761	unfolding fps_cutoff_def by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	762
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	763	lemma fps_cutoff_zero_iff: "fps_cutoff n f = 0 \<longleftrightarrow> (f = 0 \<or> n \<le> subdegree f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	764	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	765	assume A: "fps_cutoff n f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	766	thus "f = 0 \<or> n \<le> subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	767	proof (cases "f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	768	assume "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	769	with A have "n \<le> subdegree f"
62390 842917225d56 more canonical names nipkow parents: 62343 diff changeset	770	by (intro subdegree_geI) (auto simp: fps_eq_iff split: if_split_asm)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	771	thus ?thesis ..
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	772	qed simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	773	qed (auto simp: fps_eq_iff intro: nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	774
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	775	lemma fps_cutoff_0 [simp]: "fps_cutoff 0 f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	776	by (simp add: fps_eq_iff)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	777
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	778	lemma fps_cutoff_zero [simp]: "fps_cutoff n 0 = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	779	by (simp add: fps_eq_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	780
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	781	lemma fps_cutoff_one: "fps_cutoff n 1 = (if n = 0 then 0 else 1)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	782	by (simp add: fps_eq_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	783
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	784	lemma fps_cutoff_fps_const: "fps_cutoff n (fps_const c) = (if n = 0 then 0 else fps_const c)"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	785	by (simp add: fps_eq_iff)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	786
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	787	lemma fps_cutoff_numeral: "fps_cutoff n (numeral c) = (if n = 0 then 0 else numeral c)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	788	by (simp add: numeral_fps_const fps_cutoff_fps_const)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	789
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	790	lemma fps_shift_cutoff:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	791	"fps_shift n (f :: ('a :: comm_ring_1) fps) * X^n + fps_cutoff n f = f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	792	by (simp add: fps_eq_iff X_power_mult_right_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	793
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	794
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	795	subsection \<open>Formal Power series form a metric space\<close>
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	796
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	797	definition (in dist) "ball x r = {y. dist y x < r}"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	798
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	799	instantiation fps :: (comm_ring_1) dist
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	800	begin
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	801
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	802	definition
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	803	dist_fps_def: "dist (a :: 'a fps) b = (if a = b then 0 else inverse (2 ^ subdegree (a - b)))"
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	804
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	805	lemma dist_fps_ge0: "dist (a :: 'a fps) b \<ge> 0"
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	806	by (simp add: dist_fps_def)
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	807
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	808	lemma dist_fps_sym: "dist (a :: 'a fps) b = dist b a"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	809	by (simp add: dist_fps_def)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	810
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	811	instance ..
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	812
30746 d6915b738bd9 fps made instance of number_ring chaieb parents: 30488 diff changeset	813	end
d6915b738bd9 fps made instance of number_ring chaieb parents: 30488 diff changeset	814
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	815	instantiation fps :: (comm_ring_1) metric_space
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	816	begin
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	817
62101 26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	818	definition uniformity_fps_def [code del]:
26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	819	"(uniformity :: ('a fps \<times> 'a fps) filter) = (INF e:{0 <..}. principal {(x, y). dist x y < e})"
26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	820
26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	821	definition open_fps_def' [code del]:
26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	822	"open (U :: 'a fps set) \<longleftrightarrow> (\<forall>x\<in>U. eventually (\<lambda>(x', y). x' = x \<longrightarrow> y \<in> U) uniformity)"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	823
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	824	instance
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	825	proof
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	826	show th: "dist a b = 0 \<longleftrightarrow> a = b" for a b :: "'a fps"
62390 842917225d56 more canonical names nipkow parents: 62343 diff changeset	827	by (simp add: dist_fps_def split: if_split_asm)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	828	then have th'[simp]: "dist a a = 0" for a :: "'a fps" by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	829
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	830	fix a b c :: "'a fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	831	consider "a = b" \| "c = a \<or> c = b" \| "a \<noteq> b" "a \<noteq> c" "b \<noteq> c" by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	832	then show "dist a b \<le> dist a c + dist b c"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	833	proof cases
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	834	case 1
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	835	then show ?thesis by (simp add: dist_fps_def)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	836	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	837	case 2
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	838	then show ?thesis
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	839	by (cases "c = a") (simp_all add: th dist_fps_sym)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	840	next
60567 19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	841	case neq: 3
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	842	have False if "dist a b > dist a c + dist b c"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	843	proof -
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	844	let ?n = "subdegree (a - b)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	845	from neq have "dist a b > 0" "dist b c > 0" and "dist a c > 0" by (simp_all add: dist_fps_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	846	with that have "dist a b > dist a c" and "dist a b > dist b c" by simp_all
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	847	with neq have "?n < subdegree (a - c)" and "?n < subdegree (b - c)"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	848	by (simp_all add: dist_fps_def field_simps)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	849	hence "(a - c) $ ?n = 0" and "(b - c) $ ?n = 0"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	850	by (simp_all only: nth_less_subdegree_zero)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	851	hence "(a - b) $ ?n = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	852	moreover from neq have "(a - b) $ ?n \<noteq> 0" by (intro nth_subdegree_nonzero) simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	853	ultimately show False by contradiction
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	854	qed
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	855	thus ?thesis by (auto simp add: not_le[symmetric])
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	856	qed
62101 26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	857	qed (rule open_fps_def' uniformity_fps_def)+
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	858
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	859	end
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	860
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	861	declare uniformity_Abort[where 'a="'a :: comm_ring_1 fps", code]
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	862
62101 26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	863	lemma open_fps_def: "open (S :: 'a::comm_ring_1 fps set) = (\<forall>a \<in> S. \<exists>r. r >0 \<and> ball a r \<subseteq> S)"
26c0a70f78a3 add uniform spaces hoelzl parents: 61969 diff changeset	864	unfolding open_dist ball_def subset_eq by simp
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	865
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	866	text \<open>The infinite sums and justification of the notation in textbooks.\<close>
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	867
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	868	lemma reals_power_lt_ex:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	869	fixes x y :: real
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	870	assumes xp: "x > 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	871	and y1: "y > 1"
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	872	shows "\<exists>k>0. (1/y)^k < x"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	873	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	874	have yp: "y > 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	875	using y1 by simp
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	876	from reals_Archimedean2[of "max 0 (- log y x) + 1"]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	877	obtain k :: nat where k: "real k > max 0 (- log y x) + 1"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	878	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	879	from k have kp: "k > 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	880	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	881	from k have "real k > - log y x"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	882	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	883	then have "ln y * real k > - ln x"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	884	unfolding log_def
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	885	using ln_gt_zero_iff[OF yp] y1
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	886	by (simp add: minus_divide_left field_simps del: minus_divide_left[symmetric])
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	887	then have "ln y * real k + ln x > 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	888	by simp
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	889	then have "exp (real k * ln y + ln x) > exp 0"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	890	by (simp add: ac_simps)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	891	then have "y ^ k * x > 1"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	892	unfolding exp_zero exp_add exp_real_of_nat_mult exp_ln [OF xp] exp_ln [OF yp]
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	893	by simp
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	894	then have "x > (1 / y)^k" using yp
60867 86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	895	by (simp add: field_simps)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	896	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	897	using kp by blast
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	898	qed
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	899
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	900	lemma fps_sum_rep_nth: "(setsum (\<lambda>i. fps_const(a$i)*X^i) {0..m})$n =
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	901	(if n \<le> m then a$n else 0::'a::comm_ring_1)"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	902	apply (auto simp add: fps_setsum_nth cond_value_iff cong del: if_weak_cong)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	903	apply (simp add: setsum.delta')
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	904	done
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	905
61969 e01015e49041 more symbols; wenzelm parents: 61943 diff changeset	906	lemma fps_notation: "(\<lambda>n. setsum (\<lambda>i. fps_const(a$i) * X^i) {0..n}) \<longlonglongrightarrow> a"
e01015e49041 more symbols; wenzelm parents: 61943 diff changeset	907	(is "?s \<longlonglongrightarrow> a")
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	908	proof -
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	909	have "\<exists>n0. \<forall>n \<ge> n0. dist (?s n) a < r" if "r > 0" for r
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	910	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	911	obtain n0 where n0: "(1/2)^n0 < r" "n0 > 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	912	using reals_power_lt_ex[OF \<open>r > 0\<close>, of 2] by auto
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	913	show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	914	proof -
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	915	have "dist (?s n) a < r" if nn0: "n \<ge> n0" for n
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	916	proof -
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	917	from that have thnn0: "(1/2)^n \<le> (1/2 :: real)^n0"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	918	by (simp add: divide_simps)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	919	show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	920	proof (cases "?s n = a")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	921	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	922	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	923	unfolding dist_eq_0_iff[of "?s n" a, symmetric]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	924	using \<open>r > 0\<close> by (simp del: dist_eq_0_iff)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	925	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	926	case False
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	927	from False have dth: "dist (?s n) a = (1/2)^subdegree (?s n - a)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	928	by (simp add: dist_fps_def field_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	929	from False have kn: "subdegree (?s n - a) > n"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	930	by (intro subdegree_greaterI) (simp_all add: fps_sum_rep_nth)
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	931	then have "dist (?s n) a < (1/2)^n"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	932	by (simp add: field_simps dist_fps_def)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	933	also have "\<dots> \<le> (1/2)^n0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	934	using nn0 by (simp add: divide_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	935	also have "\<dots> < r"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	936	using n0 by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	937	finally show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	938	qed
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	939	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	940	then show ?thesis by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	941	qed
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	942	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	943	then show ?thesis
60017 b785d6d06430 Overloading of ln and powr, but "approximation" no longer works for powr. Code generation also fails due to type ambiguity in scala. paulson <lp15@cam.ac.uk> parents: 59867 diff changeset	944	unfolding lim_sequentially by blast
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	945	qed
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	946
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	947
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	948	subsection \<open>Inverses of formal power series\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	949
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	950	declare setsum.cong[fundef_cong]
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	951
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	952	instantiation fps :: ("{comm_monoid_add,inverse,times,uminus}") inverse
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	953	begin
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	954
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	955	fun natfun_inverse:: "'a fps \<Rightarrow> nat \<Rightarrow> 'a"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	956	where
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	957	"natfun_inverse f 0 = inverse (f$0)"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	958	\| "natfun_inverse f n = - inverse (f$0) * setsum (\<lambda>i. f$i * natfun_inverse f (n - i)) {1..n}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	959
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	960	definition fps_inverse_def: "inverse f = (if f $ 0 = 0 then 0 else Abs_fps (natfun_inverse f))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	961
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	962	definition fps_divide_def:
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	963	"f div g = (if g = 0 then 0 else
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	964	let n = subdegree g; h = fps_shift n g
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	965	in fps_shift n (f * inverse h))"
36311 ed3a87a7f977 epheremal replacement of field_simps by field_eq_simps; dropped old division_by_zero instance haftmann parents: 36309 diff changeset	966
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	967	instance ..
36311 ed3a87a7f977 epheremal replacement of field_simps by field_eq_simps; dropped old division_by_zero instance haftmann parents: 36309 diff changeset	968
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	969	end
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	970
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	971	lemma fps_inverse_zero [simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	972	"inverse (0 :: 'a::{comm_monoid_add,inverse,times,uminus} fps) = 0"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	973	by (simp add: fps_ext fps_inverse_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	974
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	975	lemma fps_inverse_one [simp]: "inverse (1 :: 'a::{division_ring,zero_neq_one} fps) = 1"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	976	apply (auto simp add: expand_fps_eq fps_inverse_def)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	977	apply (case_tac n)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	978	apply auto
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	979	done
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	980
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	981	lemma inverse_mult_eq_1 [intro]:
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	982	assumes f0: "f$0 \<noteq> (0::'a::field)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	983	shows "inverse f * f = 1"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	984	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	985	have c: "inverse f * f = f * inverse f"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	986	by (simp add: mult.commute)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	987	from f0 have ifn: "\<And>n. inverse f $ n = natfun_inverse f n"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	988	by (simp add: fps_inverse_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	989	from f0 have th0: "(inverse f * f) $ 0 = 1"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	990	by (simp add: fps_mult_nth fps_inverse_def)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	991	have "(inverse f * f)$n = 0" if np: "n > 0" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	992	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	993	from np have eq: "{0..n} = {0} \<union> {1 .. n}"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	994	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	995	have d: "{0} \<inter> {1 .. n} = {}"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	996	by auto
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	997	from f0 np have th0: "- (inverse f $ n) =
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	998	(setsum (\<lambda>i. f$i * natfun_inverse f (n - i)) {1..n}) / (f$0)"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	999	by (cases n) (simp_all add: divide_inverse fps_inverse_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1000	from th0[symmetric, unfolded nonzero_divide_eq_eq[OF f0]]
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1001	have th1: "setsum (\<lambda>i. f$i * natfun_inverse f (n - i)) {1..n} = - (f$0) * (inverse f)$n"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1002	by (simp add: field_simps)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1003	have "(f * inverse f) $ n = (\<Sum>i = 0..n. f $i * natfun_inverse f (n - i))"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1004	unfolding fps_mult_nth ifn ..
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1005	also have "\<dots> = f$0 * natfun_inverse f n + (\<Sum>i = 1..n. f$i * natfun_inverse f (n-i))"
46757 ad878aff9c15 removing finiteness goals bulwahn parents: 46131 diff changeset	1006	by (simp add: eq)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1007	also have "\<dots> = 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1008	unfolding th1 ifn by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1009	finally show ?thesis unfolding c .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1010	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1011	with th0 show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1012	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1013	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1014
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1015	lemma fps_inverse_0_iff[simp]: "(inverse f) $ 0 = (0::'a::division_ring) \<longleftrightarrow> f $ 0 = 0"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	1016	by (simp add: fps_inverse_def nonzero_imp_inverse_nonzero)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1017
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1018	lemma fps_inverse_nth_0 [simp]: "inverse f $ 0 = inverse (f $ 0 :: 'a :: division_ring)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1019	by (simp add: fps_inverse_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1020
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1021	lemma fps_inverse_eq_0_iff[simp]: "inverse f = (0:: ('a::division_ring) fps) \<longleftrightarrow> f $ 0 = 0"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1022	proof
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1023	assume A: "inverse f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1024	have "0 = inverse f $ 0" by (subst A) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1025	thus "f $ 0 = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1026	qed (simp add: fps_inverse_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1027
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1028	lemma fps_inverse_idempotent[intro, simp]:
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1029	assumes f0: "f$0 \<noteq> (0::'a::field)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1030	shows "inverse (inverse f) = f"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1031	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1032	from f0 have if0: "inverse f $ 0 \<noteq> 0" by simp
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1033	from inverse_mult_eq_1[OF f0] inverse_mult_eq_1[OF if0]
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1034	have "inverse f * f = inverse f * inverse (inverse f)"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	1035	by (simp add: ac_simps)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1036	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1037	using f0 unfolding mult_cancel_left by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1038	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1039
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1040	lemma fps_inverse_unique:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1041	assumes fg: "(f :: 'a :: field fps) * g = 1"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1042	shows "inverse f = g"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1043	proof -
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1044	have f0: "f $ 0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1045	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1046	assume "f $ 0 = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1047	hence "0 = (f * g) $ 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1048	also from fg have "(f * g) $ 0 = 1" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1049	finally show False by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1050	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1051	from inverse_mult_eq_1[OF this] fg
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1052	have th0: "inverse f * f = g * f"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	1053	by (simp add: ac_simps)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1054	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1055	using f0
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1056	unfolding mult_cancel_right
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	1057	by (auto simp add: expand_fps_eq)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1058	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1059
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1060	lemma setsum_zero_lemma:
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1061	fixes n::nat
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1062	assumes "0 < n"
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1063	shows "(\<Sum>i = 0..n. if n = i then 1 else if n - i = 1 then - 1 else 0) = (0::'a::field)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1064	proof -
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1065	let ?f = "\<lambda>i. if n = i then 1 else if n - i = 1 then - 1 else 0"
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1066	let ?g = "\<lambda>i. if i = n then 1 else if i = n - 1 then - 1 else 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1067	let ?h = "\<lambda>i. if i=n - 1 then - 1 else 0"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1068	have th1: "setsum ?f {0..n} = setsum ?g {0..n}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1069	by (rule setsum.cong) auto
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1070	have th2: "setsum ?g {0..n - 1} = setsum ?h {0..n - 1}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1071	apply (rule setsum.cong)
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1072	using assms
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1073	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1074	done
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1075	have eq: "{0 .. n} = {0.. n - 1} \<union> {n}"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1076	by auto
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1077	from assms have d: "{0.. n - 1} \<inter> {n} = {}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1078	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1079	have f: "finite {0.. n - 1}" "finite {n}"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1080	by auto
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1081	show ?thesis
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1082	unfolding th1
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1083	apply (simp add: setsum.union_disjoint[OF f d, unfolded eq[symmetric]] del: One_nat_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1084	unfolding th2
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1085	apply (simp add: setsum.delta)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1086	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1087	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1088
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1089	lemma fps_inverse_mult: "inverse (f * g :: 'a::field fps) = inverse f * inverse g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1090	proof (cases "f$0 = 0 \<or> g$0 = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1091	assume "\<not>(f$0 = 0 \<or> g$0 = 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1092	hence [simp]: "f$0 \<noteq> 0" "g$0 \<noteq> 0" by simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1093	show ?thesis
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1094	proof (rule fps_inverse_unique)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1095	have "f * g * (inverse f * inverse g) = (inverse f * f) * (inverse g * g)" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1096	also have "... = 1" by (subst (1 2) inverse_mult_eq_1) simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1097	finally show "f * g * (inverse f * inverse g) = 1" .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1098	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1099	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1100	assume A: "f$0 = 0 \<or> g$0 = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1101	hence "inverse (f * g) = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1102	also from A have "... = inverse f * inverse g" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1103	finally show "inverse (f * g) = inverse f * inverse g" .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1104	qed
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1105
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1106
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1107	lemma fps_inverse_gp: "inverse (Abs_fps(\<lambda>n. (1::'a::field))) =
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1108	Abs_fps (\<lambda>n. if n= 0 then 1 else if n=1 then - 1 else 0)"
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1109	apply (rule fps_inverse_unique)
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1110	apply (simp_all add: fps_eq_iff fps_mult_nth setsum_zero_lemma)
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1111	done
645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	1112
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1113	lemma subdegree_inverse [simp]: "subdegree (inverse (f::'a::field fps)) = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1114	proof (cases "f$0 = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1115	assume nz: "f$0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1116	hence "subdegree (inverse f) + subdegree f = subdegree (inverse f * f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1117	by (subst subdegree_mult) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1118	also from nz have "subdegree f = 0" by (simp add: subdegree_eq_0_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1119	also from nz have "inverse f * f = 1" by (rule inverse_mult_eq_1)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1120	finally show "subdegree (inverse f) = 0" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1121	qed (simp_all add: fps_inverse_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1122
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1123	lemma fps_is_unit_iff [simp]: "(f :: 'a :: field fps) dvd 1 \<longleftrightarrow> f $ 0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1124	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1125	assume "f dvd 1"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1126	then obtain g where "1 = f * g" by (elim dvdE)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1127	from this[symmetric] have "(f*g) $ 0 = 1" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1128	thus "f $ 0 \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1129	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1130	assume A: "f $ 0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1131	thus "f dvd 1" by (simp add: inverse_mult_eq_1[OF A, symmetric])
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1132	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1133
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1134	lemma subdegree_eq_0' [simp]: "(f :: 'a :: field fps) dvd 1 \<Longrightarrow> subdegree f = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1135	by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1136
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1137	lemma fps_unit_dvd [simp]: "(f $ 0 :: 'a :: field) \<noteq> 0 \<Longrightarrow> f dvd g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1138	by (rule dvd_trans, subst fps_is_unit_iff) simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1139
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1140
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1141
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1142	instantiation fps :: (field) ring_div
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1143	begin
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1144
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1145	definition fps_mod_def:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1146	"f mod g = (if g = 0 then f else
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1147	let n = subdegree g; h = fps_shift n g
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1148	in fps_cutoff n (f * inverse h) * h)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1149
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1150	lemma fps_mod_eq_zero:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1151	assumes "g \<noteq> 0" and "subdegree f \<ge> subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1152	shows "f mod g = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1153	using assms by (cases "f = 0") (auto simp: fps_cutoff_zero_iff fps_mod_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1154
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1155	lemma fps_times_divide_eq:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1156	assumes "g \<noteq> 0" and "subdegree f \<ge> subdegree (g :: 'a fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1157	shows "f div g * g = f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1158	proof (cases "f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1159	assume nz: "f \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1160	def n \<equiv> "subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1161	def h \<equiv> "fps_shift n g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1162	from assms have [simp]: "h $ 0 \<noteq> 0" unfolding h_def by (simp add: n_def)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1163
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1164	from assms nz have "f div g * g = fps_shift n (f * inverse h) * g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1165	by (simp add: fps_divide_def Let_def h_def n_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1166	also have "... = fps_shift n (f * inverse h) * X^n * h" unfolding h_def n_def
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1167	by (subst subdegree_decompose[of g]) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1168	also have "fps_shift n (f * inverse h) * X^n = f * inverse h"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1169	by (rule fps_shift_times_X_power) (simp_all add: nz assms n_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1170	also have "... * h = f * (inverse h * h)" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1171	also have "inverse h * h = 1" by (rule inverse_mult_eq_1) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1172	finally show ?thesis by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1173	qed (simp_all add: fps_divide_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1174
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1175	lemma
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1176	assumes "g$0 \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1177	shows fps_divide_unit: "f div g = f * inverse g" and fps_mod_unit [simp]: "f mod g = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1178	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1179	from assms have [simp]: "subdegree g = 0" by (simp add: subdegree_eq_0_iff)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1180	from assms show "f div g = f * inverse g"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1181	by (auto simp: fps_divide_def Let_def subdegree_eq_0_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1182	from assms show "f mod g = 0" by (intro fps_mod_eq_zero) auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1183	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1184
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1185	context
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1186	begin
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1187	private lemma fps_divide_cancel_aux1:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1188	assumes "h$0 \<noteq> (0 :: 'a :: field)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1189	shows "(h * f) div (h * g) = f div g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1190	proof (cases "g = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1191	assume "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1192	from assms have "h \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1193	note nz [simp] = \<open>g \<noteq> 0\<close> \<open>h \<noteq> 0\<close>
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1194	from assms have [simp]: "subdegree h = 0" by (simp add: subdegree_eq_0_iff)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1195
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1196	have "(h * f) div (h * g) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1197	fps_shift (subdegree g) (h * f * inverse (fps_shift (subdegree g) (h*g)))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1198	by (simp add: fps_divide_def Let_def)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1199	also have "h * f * inverse (fps_shift (subdegree g) (h*g)) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1200	(inverse h * h) * f * inverse (fps_shift (subdegree g) g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1201	by (subst fps_shift_mult) (simp_all add: algebra_simps fps_inverse_mult)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1202	also from assms have "inverse h * h = 1" by (rule inverse_mult_eq_1)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1203	finally show "(h * f) div (h * g) = f div g" by (simp_all add: fps_divide_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1204	qed (simp_all add: fps_divide_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1205
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1206	private lemma fps_divide_cancel_aux2:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1207	"(f * X^m) div (g * X^m) = f div (g :: 'a :: field fps)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1208	proof (cases "g = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1209	assume [simp]: "g \<noteq> 0"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1210	have "(f * X^m) div (g * X^m) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1211	fps_shift (subdegree g + m) (finverse (fps_shift (subdegree g + m) (gX^m))*X^m)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1212	by (simp add: fps_divide_def Let_def algebra_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1213	also have "... = f div g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1214	by (simp add: fps_shift_times_X_power'' fps_divide_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1215	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1216	qed (simp_all add: fps_divide_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1217
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1218	instance proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1219	fix f g :: "'a fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1220	def n \<equiv> "subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1221	def h \<equiv> "fps_shift n g"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1222
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1223	show "f div g * g + f mod g = f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1224	proof (cases "g = 0 \<or> f = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1225	assume "\<not>(g = 0 \<or> f = 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1226	hence nz [simp]: "f \<noteq> 0" "g \<noteq> 0" by simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1227	show ?thesis
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1228	proof (rule disjE[OF le_less_linear])
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1229	assume "subdegree f \<ge> subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1230	with nz show ?thesis by (simp add: fps_mod_eq_zero fps_times_divide_eq)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1231	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1232	assume "subdegree f < subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1233	have g_decomp: "g = h * X^n" unfolding h_def n_def by (rule subdegree_decompose)
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1234	have "f div g * g + f mod g =
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1235	fps_shift n (f * inverse h) * g + fps_cutoff n (f * inverse h) * h"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1236	by (simp add: fps_mod_def fps_divide_def Let_def n_def h_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1237	also have "... = h * (fps_shift n (f * inverse h) * X^n + fps_cutoff n (f * inverse h))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1238	by (subst g_decomp) (simp add: algebra_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1239	also have "... = f * (inverse h * h)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1240	by (subst fps_shift_cutoff) simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1241	also have "inverse h * h = 1" by (rule inverse_mult_eq_1) (simp add: h_def n_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1242	finally show ?thesis by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1243	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1244	qed (auto simp: fps_mod_def fps_divide_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1245	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1246
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1247	fix f g h :: "'a fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1248	assume "h \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1249	show "(h * f) div (h * g) = f div g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1250	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1251	def m \<equiv> "subdegree h"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1252	def h' \<equiv> "fps_shift m h"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1253	have h_decomp: "h = h' * X ^ m" unfolding h'_def m_def by (rule subdegree_decompose)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1254	from \<open>h \<noteq> 0\<close> have [simp]: "h'$0 \<noteq> 0" by (simp add: h'_def m_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1255	have "(h * f) div (h * g) = (h' * f * X^m) div (h' * g * X^m)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1256	by (simp add: h_decomp algebra_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1257	also have "... = f div g" by (simp add: fps_divide_cancel_aux1 fps_divide_cancel_aux2)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1258	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1259	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1260
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1261	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1262	fix f g h :: "'a fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1263	assume [simp]: "h \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1264	def n \<equiv> "subdegree h"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1265	def h' \<equiv> "fps_shift n h"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1266	note dfs = n_def h'_def
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1267	have "(f + g * h) div h = fps_shift n (f * inverse h') + fps_shift n (g * (h * inverse h'))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1268	by (simp add: fps_divide_def Let_def dfs[symmetric] algebra_simps fps_shift_add)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1269	also have "h * inverse h' = (inverse h' * h') * X^n"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1270	by (subst subdegree_decompose) (simp_all add: dfs)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1271	also have "... = X^n" by (subst inverse_mult_eq_1) (simp_all add: dfs)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1272	also have "fps_shift n (g * X^n) = g" by simp
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1273	also have "fps_shift n (f * inverse h') = f div h"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1274	by (simp add: fps_divide_def Let_def dfs)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1275	finally show "(f + g * h) div h = g + f div h" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1276	qed (auto simp: fps_divide_def fps_mod_def Let_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1277
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1278	end
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1279	end
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1280
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1281	lemma subdegree_mod:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1282	assumes "f \<noteq> 0" "subdegree f < subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1283	shows "subdegree (f mod g) = subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1284	proof (cases "f div g * g = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1285	assume "f div g * g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1286	hence [simp]: "f div g \<noteq> 0" "g \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1287	from mod_div_equality[of f g] have "f mod g = f - f div g * g" by (simp add: algebra_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1288	also from assms have "subdegree ... = subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1289	by (intro subdegree_diff_eq1) simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1290	finally show ?thesis .
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1291	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1292	assume zero: "f div g * g = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1293	from mod_div_equality[of f g] have "f mod g = f - f div g * g" by (simp add: algebra_simps)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1294	also note zero
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1295	finally show ?thesis by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1296	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1297
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1298	lemma fps_divide_nth_0 [simp]: "g $ 0 \<noteq> 0 \<Longrightarrow> (f div g) $ 0 = f $ 0 / (g $ 0 :: _ :: field)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1299	by (simp add: fps_divide_unit divide_inverse)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1300
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1301
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1302	lemma dvd_imp_subdegree_le:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1303	"(f :: 'a :: idom fps) dvd g \<Longrightarrow> g \<noteq> 0 \<Longrightarrow> subdegree f \<le> subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1304	by (auto elim: dvdE)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1305
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1306	lemma fps_dvd_iff:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1307	assumes "(f :: 'a :: field fps) \<noteq> 0" "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1308	shows "f dvd g \<longleftrightarrow> subdegree f \<le> subdegree g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1309	proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1310	assume "subdegree f \<le> subdegree g"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1311	with assms have "g mod f = 0"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1312	by (simp add: fps_mod_def Let_def fps_cutoff_zero_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1313	thus "f dvd g" by (simp add: dvd_eq_mod_eq_0)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1314	qed (simp add: assms dvd_imp_subdegree_le)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1315
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1316	lemma fps_const_inverse: "inverse (fps_const (a::'a::field)) = fps_const (inverse a)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1317	by (cases "a \<noteq> 0", rule fps_inverse_unique) (auto simp: fps_eq_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1318
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1319	lemma fps_const_divide: "fps_const (x :: _ :: field) / fps_const y = fps_const (x / y)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1320	by (cases "y = 0") (simp_all add: fps_divide_unit fps_const_inverse divide_inverse)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1321
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1322	lemma inverse_fps_numeral:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1323	"inverse (numeral n :: ('a :: field_char_0) fps) = fps_const (inverse (numeral n))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1324	by (intro fps_inverse_unique fps_ext) (simp_all add: fps_numeral_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1325
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1326
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1327
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1328
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1329	instantiation fps :: (field) normalization_semidom
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1330	begin
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1331
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1332	definition fps_unit_factor_def [simp]:
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1333	"unit_factor f = fps_shift (subdegree f) f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1334
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1335	definition fps_normalize_def [simp]:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1336	"normalize f = (if f = 0 then 0 else X ^ subdegree f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1337
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1338	instance proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1339	fix f :: "'a fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1340	show "unit_factor f * normalize f = f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1341	by (simp add: fps_shift_times_X_power)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1342	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1343	fix f g :: "'a fps"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1344	show "unit_factor (f * g) = unit_factor f * unit_factor g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1345	proof (cases "f = 0 \<or> g = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1346	assume "\<not>(f = 0 \<or> g = 0)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1347	thus "unit_factor (f * g) = unit_factor f * unit_factor g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1348	unfolding fps_unit_factor_def
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1349	by (auto simp: fps_shift_fps_shift fps_shift_mult fps_shift_mult_right)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1350	qed auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1351	qed auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1352
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1353	end
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1354
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1355	instance fps :: (field) algebraic_semidom ..
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1356
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1357
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1358	subsection \<open>Formal power series form a Euclidean ring\<close>
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1359
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1360	instantiation fps :: (field) euclidean_ring
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1361	begin
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1362
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1363	definition fps_euclidean_size_def:
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1364	"euclidean_size f = (if f = 0 then 0 else 2 ^ subdegree f)"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1365
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1366	instance proof
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1367	fix f g :: "'a fps" assume [simp]: "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1368	show "euclidean_size f \<le> euclidean_size (f * g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1369	by (cases "f = 0") (auto simp: fps_euclidean_size_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1370	show "euclidean_size (f mod g) < euclidean_size g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1371	apply (cases "f = 0", simp add: fps_euclidean_size_def)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1372	apply (rule disjE[OF le_less_linear[of "subdegree g" "subdegree f"]])
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1373	apply (simp_all add: fps_mod_eq_zero fps_euclidean_size_def subdegree_mod)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1374	done
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1375	qed (simp_all add: fps_euclidean_size_def)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1376
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1377	end
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1378
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1379	instantiation fps :: (field) euclidean_ring_gcd
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1380	begin
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1381	definition fps_gcd_def: "(gcd :: 'a fps \<Rightarrow> _) = gcd_eucl"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1382	definition fps_lcm_def: "(lcm :: 'a fps \<Rightarrow> _) = lcm_eucl"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1383	definition fps_Gcd_def: "(Gcd :: 'a fps set \<Rightarrow> _) = Gcd_eucl"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1384	definition fps_Lcm_def: "(Lcm :: 'a fps set \<Rightarrow> _) = Lcm_eucl"
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1385	instance by standard (simp_all add: fps_gcd_def fps_lcm_def fps_Gcd_def fps_Lcm_def)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1386	end
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1387
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1388	lemma fps_gcd:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1389	assumes [simp]: "f \<noteq> 0" "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1390	shows "gcd f g = X ^ min (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1391	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1392	let ?m = "min (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1393	show "gcd f g = X ^ ?m"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1394	proof (rule sym, rule gcdI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1395	fix d assume "d dvd f" "d dvd g"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1396	thus "d dvd X ^ ?m" by (cases "d = 0") (auto simp: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1397	qed (simp_all add: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1398	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1399
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1400	lemma fps_gcd_altdef: "gcd (f :: 'a :: field fps) g =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1401	(if f = 0 \<and> g = 0 then 0 else
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1402	if f = 0 then X ^ subdegree g else
877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1403	if g = 0 then X ^ subdegree f else
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1404	X ^ min (subdegree f) (subdegree g))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1405	by (simp add: fps_gcd)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1406
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1407	lemma fps_lcm:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1408	assumes [simp]: "f \<noteq> 0" "g \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1409	shows "lcm f g = X ^ max (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1410	proof -
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1411	let ?m = "max (subdegree f) (subdegree g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1412	show "lcm f g = X ^ ?m"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1413	proof (rule sym, rule lcmI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1414	fix d assume "f dvd d" "g dvd d"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1415	thus "X ^ ?m dvd d" by (cases "d = 0") (auto simp: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1416	qed (simp_all add: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1417	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1418
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1419	lemma fps_lcm_altdef: "lcm (f :: 'a :: field fps) g =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1420	(if f = 0 \<or> g = 0 then 0 else X ^ max (subdegree f) (subdegree g))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1421	by (simp add: fps_lcm)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1422
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1423	lemma fps_Gcd:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1424	assumes "A - {0} \<noteq> {}"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1425	shows "Gcd A = X ^ (INF f:A-{0}. subdegree f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1426	proof (rule sym, rule GcdI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1427	fix f assume "f \<in> A"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1428	thus "X ^ (INF f:A - {0}. subdegree f) dvd f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1429	by (cases "f = 0") (auto simp: fps_dvd_iff intro!: cINF_lower)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1430	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1431	fix d assume d: "\<And>f. f \<in> A \<Longrightarrow> d dvd f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1432	from assms obtain f where "f \<in> A - {0}" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1433	with d[of f] have [simp]: "d \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1434	from d assms have "subdegree d \<le> (INF f:A-{0}. subdegree f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1435	by (intro cINF_greatest) (auto simp: fps_dvd_iff[symmetric])
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1436	with d assms show "d dvd X ^ (INF f:A-{0}. subdegree f)" by (simp add: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1437	qed simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1438
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1439	lemma fps_Gcd_altdef: "Gcd (A :: 'a :: field fps set) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1440	(if A \<subseteq> {0} then 0 else X ^ (INF f:A-{0}. subdegree f))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1441	using fps_Gcd by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1442
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1443	lemma fps_Lcm:
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1444	assumes "A \<noteq> {}" "0 \<notin> A" "bdd_above (subdegree`A)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1445	shows "Lcm A = X ^ (SUP f:A. subdegree f)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1446	proof (rule sym, rule LcmI)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1447	fix f assume "f \<in> A"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1448	moreover from assms(3) have "bdd_above (subdegree ` A)" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1449	ultimately show "f dvd X ^ (SUP f:A. subdegree f)" using assms(2)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1450	by (cases "f = 0") (auto simp: fps_dvd_iff intro!: cSUP_upper)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1451	next
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1452	fix d assume d: "\<And>f. f \<in> A \<Longrightarrow> f dvd d"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1453	from assms obtain f where f: "f \<in> A" "f \<noteq> 0" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1454	show "X ^ (SUP f:A. subdegree f) dvd d"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1455	proof (cases "d = 0")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1456	assume "d \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1457	moreover from d have "\<And>f. f \<in> A \<Longrightarrow> f \<noteq> 0 \<Longrightarrow> f dvd d" by blast
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1458	ultimately have "subdegree d \<ge> (SUP f:A. subdegree f)" using assms
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1459	by (intro cSUP_least) (auto simp: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1460	with \<open>d \<noteq> 0\<close> show ?thesis by (simp add: fps_dvd_iff)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1461	qed simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1462	qed simp_all
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1463
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1464	lemma fps_Lcm_altdef:
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	1465	"Lcm (A :: 'a :: field fps set) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1466	(if 0 \<in> A \<or> \<not>bdd_above (subdegree`A) then 0 else
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1467	if A = {} then 1 else X ^ (SUP f:A. subdegree f))"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1468	proof (cases "bdd_above (subdegree`A)")
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1469	assume unbounded: "\<not>bdd_above (subdegree`A)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1470	have "Lcm A = 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1471	proof (rule ccontr)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1472	assume "Lcm A \<noteq> 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1473	from unbounded obtain f where f: "f \<in> A" "subdegree (Lcm A) < subdegree f"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1474	unfolding bdd_above_def by (auto simp: not_le)
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	1475	moreover from this and \<open>Lcm A \<noteq> 0\<close> have "subdegree f \<le> subdegree (Lcm A)"
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1476	by (intro dvd_imp_subdegree_le dvd_Lcm) simp_all
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1477	ultimately show False by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1478	qed
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1479	with unbounded show ?thesis by simp
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1480	qed (simp_all add: fps_Lcm Lcm_eq_0_I)
4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	1481
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1482
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1483
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1484	subsection \<open>Formal Derivatives, and the MacLaurin theorem around 0\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1485
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1486	definition "fps_deriv f = Abs_fps (\<lambda>n. of_nat (n + 1) * f $ (n + 1))"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1487
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1488	lemma fps_deriv_nth[simp]: "fps_deriv f $ n = of_nat (n +1) * f $ (n + 1)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1489	by (simp add: fps_deriv_def)
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1490
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1491	lemma fps_deriv_linear[simp]:
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1492	"fps_deriv (fps_const (a::'a::comm_semiring_1) * f + fps_const b * g) =
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1493	fps_const a * fps_deriv f + fps_const b * fps_deriv g"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1494	unfolding fps_eq_iff fps_add_nth fps_const_mult_left fps_deriv_nth by (simp add: field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1495
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1496	lemma fps_deriv_mult[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1497	fixes f :: "'a::comm_ring_1 fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1498	shows "fps_deriv (f * g) = f * fps_deriv g + fps_deriv f * g"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1499	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1500	let ?D = "fps_deriv"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1501	have "(f * ?D g + ?D f * g) $ n = ?D (f*g) $ n" for n
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1502	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1503	let ?Zn = "{0 ..n}"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1504	let ?Zn1 = "{0 .. n + 1}"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1505	let ?g = "\<lambda>i. of_nat (i+1) * g $ (i+1) * f $ (n - i) +
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1506	of_nat (i+1)* f $ (i+1) * g $ (n - i)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1507	let ?h = "\<lambda>i. of_nat i * g $ i * f $ ((n+1) - i) +
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1508	of_nat i* f $ i * g $ ((n + 1) - i)"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1509	have s0: "setsum (\<lambda>i. of_nat i * f $ i * g $ (n + 1 - i)) ?Zn1 =
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1510	setsum (\<lambda>i. of_nat (n + 1 - i) * f $ (n + 1 - i) * g $ i) ?Zn1"
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	1511	by (rule setsum.reindex_bij_witness[where i="op - (n + 1)" and j="op - (n + 1)"]) auto
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1512	have s1: "setsum (\<lambda>i. f $ i * g $ (n + 1 - i)) ?Zn1 =
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1513	setsum (\<lambda>i. f $ (n + 1 - i) * g $ i) ?Zn1"
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	1514	by (rule setsum.reindex_bij_witness[where i="op - (n + 1)" and j="op - (n + 1)"]) auto
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1515	have "(f * ?D g + ?D f * g)$n = (?D g * f + ?D f * g)$n"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	1516	by (simp only: mult.commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1517	also have "\<dots> = (\<Sum>i = 0..n. ?g i)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1518	by (simp add: fps_mult_nth setsum.distrib[symmetric])
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1519	also have "\<dots> = setsum ?h {0..n+1}"
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	1520	by (rule setsum.reindex_bij_witness_not_neutral
7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	1521	[where S'="{}" and T'="{0}" and j="Suc" and i="\<lambda>i. i - 1"]) auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1522	also have "\<dots> = (fps_deriv (f * g)) $ n"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1523	apply (simp only: fps_deriv_nth fps_mult_nth setsum.distrib)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1524	unfolding s0 s1
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1525	unfolding setsum.distrib[symmetric] setsum_right_distrib
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1526	apply (rule setsum.cong)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1527	apply (auto simp add: of_nat_diff field_simps)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1528	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1529	finally show ?thesis .
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1530	qed
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1531	then show ?thesis
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	1532	unfolding fps_eq_iff by auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1533	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1534
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	1535	lemma fps_deriv_X[simp]: "fps_deriv X = 1"
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	1536	by (simp add: fps_deriv_def X_def fps_eq_iff)
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	1537
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1538	lemma fps_deriv_neg[simp]:
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1539	"fps_deriv (- (f:: 'a::comm_ring_1 fps)) = - (fps_deriv f)"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	1540	by (simp add: fps_eq_iff fps_deriv_def)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1541
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1542	lemma fps_deriv_add[simp]:
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1543	"fps_deriv ((f:: 'a::comm_ring_1 fps) + g) = fps_deriv f + fps_deriv g"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1544	using fps_deriv_linear[of 1 f 1 g] by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1545
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1546	lemma fps_deriv_sub[simp]:
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1547	"fps_deriv ((f:: 'a::comm_ring_1 fps) - g) = fps_deriv f - fps_deriv g"
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	1548	using fps_deriv_add [of f "- g"] by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1549
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1550	lemma fps_deriv_const[simp]: "fps_deriv (fps_const c) = 0"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	1551	by (simp add: fps_ext fps_deriv_def fps_const_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1552
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1553	lemma fps_deriv_mult_const_left[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1554	"fps_deriv (fps_const (c::'a::comm_ring_1) * f) = fps_const c * fps_deriv f"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1555	by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1556
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1557	lemma fps_deriv_0[simp]: "fps_deriv 0 = 0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1558	by (simp add: fps_deriv_def fps_eq_iff)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1559
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1560	lemma fps_deriv_1[simp]: "fps_deriv 1 = 0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1561	by (simp add: fps_deriv_def fps_eq_iff )
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1562
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1563	lemma fps_deriv_mult_const_right[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1564	"fps_deriv (f * fps_const (c::'a::comm_ring_1)) = fps_deriv f * fps_const c"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1565	by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1566
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1567	lemma fps_deriv_setsum:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1568	"fps_deriv (setsum f S) = setsum (\<lambda>i. fps_deriv (f i :: 'a::comm_ring_1 fps)) S"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1569	proof (cases "finite S")
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1570	case False
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1571	then show ?thesis by simp
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1572	next
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1573	case True
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1574	show ?thesis by (induct rule: finite_induct [OF True]) simp_all
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1575	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1576
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1577	lemma fps_deriv_eq_0_iff [simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1578	"fps_deriv f = 0 \<longleftrightarrow> f = fps_const (f$0 :: 'a::{idom,semiring_char_0})"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1579	(is "?lhs \<longleftrightarrow> ?rhs")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1580	proof
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1581	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1582	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1583	from that have "fps_deriv f = fps_deriv (fps_const (f$0))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1584	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1585	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1586	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1587	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1588	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1589	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1590	from that have "\<forall>n. (fps_deriv f)$n = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1591	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1592	then have "\<forall>n. f$(n+1) = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1593	by (simp del: of_nat_Suc of_nat_add One_nat_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1594	then show ?thesis
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1595	apply (clarsimp simp add: fps_eq_iff fps_const_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1596	apply (erule_tac x="n - 1" in allE)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1597	apply simp
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1598	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1599	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1600	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1601
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1602	lemma fps_deriv_eq_iff:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1603	fixes f :: "'a::{idom,semiring_char_0} fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1604	shows "fps_deriv f = fps_deriv g \<longleftrightarrow> (f = fps_const(f$0 - g$0) + g)"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1605	proof -
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1606	have "fps_deriv f = fps_deriv g \<longleftrightarrow> fps_deriv (f - g) = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1607	by simp
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1608	also have "\<dots> \<longleftrightarrow> f - g = fps_const ((f - g) $ 0)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1609	unfolding fps_deriv_eq_0_iff ..
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1610	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1611	by (simp add: field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1612	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1613
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1614	lemma fps_deriv_eq_iff_ex:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1615	"(fps_deriv f = fps_deriv g) \<longleftrightarrow> (\<exists>c::'a::{idom,semiring_char_0}. f = fps_const c + g)"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1616	by (auto simp: fps_deriv_eq_iff)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1617
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1618
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1619	fun fps_nth_deriv :: "nat \<Rightarrow> 'a::semiring_1 fps \<Rightarrow> 'a fps"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1620	where
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1621	"fps_nth_deriv 0 f = f"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1622	\| "fps_nth_deriv (Suc n) f = fps_nth_deriv n (fps_deriv f)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1623
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1624	lemma fps_nth_deriv_commute: "fps_nth_deriv (Suc n) f = fps_deriv (fps_nth_deriv n f)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1625	by (induct n arbitrary: f) auto
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1626
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1627	lemma fps_nth_deriv_linear[simp]:
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1628	"fps_nth_deriv n (fps_const (a::'a::comm_semiring_1) * f + fps_const b * g) =
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1629	fps_const a * fps_nth_deriv n f + fps_const b * fps_nth_deriv n g"
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1630	by (induct n arbitrary: f g) (auto simp add: fps_nth_deriv_commute)
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1631
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1632	lemma fps_nth_deriv_neg[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1633	"fps_nth_deriv n (- (f :: 'a::comm_ring_1 fps)) = - (fps_nth_deriv n f)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1634	by (induct n arbitrary: f) simp_all
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1635
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1636	lemma fps_nth_deriv_add[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1637	"fps_nth_deriv n ((f :: 'a::comm_ring_1 fps) + g) = fps_nth_deriv n f + fps_nth_deriv n g"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1638	using fps_nth_deriv_linear[of n 1 f 1 g] by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1639
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1640	lemma fps_nth_deriv_sub[simp]:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1641	"fps_nth_deriv n ((f :: 'a::comm_ring_1 fps) - g) = fps_nth_deriv n f - fps_nth_deriv n g"
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	1642	using fps_nth_deriv_add [of n f "- g"] by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1643
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1644	lemma fps_nth_deriv_0[simp]: "fps_nth_deriv n 0 = 0"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1645	by (induct n) simp_all
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1646
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1647	lemma fps_nth_deriv_1[simp]: "fps_nth_deriv n 1 = (if n = 0 then 1 else 0)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1648	by (induct n) simp_all
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1649
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1650	lemma fps_nth_deriv_const[simp]:
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1651	"fps_nth_deriv n (fps_const c) = (if n = 0 then fps_const c else 0)"
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1652	by (cases n) simp_all
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1653
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1654	lemma fps_nth_deriv_mult_const_left[simp]:
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1655	"fps_nth_deriv n (fps_const (c::'a::comm_ring_1) * f) = fps_const c * fps_nth_deriv n f"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1656	using fps_nth_deriv_linear[of n "c" f 0 0 ] by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1657
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1658	lemma fps_nth_deriv_mult_const_right[simp]:
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1659	"fps_nth_deriv n (f * fps_const (c::'a::comm_ring_1)) = fps_nth_deriv n f * fps_const c"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	1660	using fps_nth_deriv_linear[of n "c" f 0 0] by (simp add: mult.commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1661
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1662	lemma fps_nth_deriv_setsum:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1663	"fps_nth_deriv n (setsum f S) = setsum (\<lambda>i. fps_nth_deriv n (f i :: 'a::comm_ring_1 fps)) S"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1664	proof (cases "finite S")
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1665	case True
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1666	show ?thesis by (induct rule: finite_induct [OF True]) simp_all
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1667	next
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1668	case False
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1669	then show ?thesis by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1670	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1671
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1672	lemma fps_deriv_maclauren_0:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1673	"(fps_nth_deriv k (f :: 'a::comm_semiring_1 fps)) $ 0 = of_nat (fact k) * f $ k"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1674	by (induct k arbitrary: f) (auto simp add: field_simps of_nat_mult)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1675
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1676
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1677	subsection \<open>Powers\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1678
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1679	lemma fps_power_zeroth_eq_one: "a$0 =1 \<Longrightarrow> a^n $ 0 = (1::'a::semiring_1)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1680	by (induct n) (auto simp add: expand_fps_eq fps_mult_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1681
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1682	lemma fps_power_first_eq: "(a :: 'a::comm_ring_1 fps) $ 0 =1 \<Longrightarrow> a^n $ 1 = of_nat n * a$1"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1683	proof (induct n)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1684	case 0
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1685	then show ?case by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1686	next
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1687	case (Suc n)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1688	show ?case unfolding power_Suc fps_mult_nth
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1689	using Suc.hyps[OF \<open>a$0 = 1\<close>] \<open>a$0 = 1\<close> fps_power_zeroth_eq_one[OF \<open>a$0=1\<close>]
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1690	by (simp add: field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1691	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1692
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1693	lemma startsby_one_power:"a $ 0 = (1::'a::comm_ring_1) \<Longrightarrow> a^n $ 0 = 1"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1694	by (induct n) (auto simp add: fps_mult_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1695
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1696	lemma startsby_zero_power:"a $0 = (0::'a::comm_ring_1) \<Longrightarrow> n > 0 \<Longrightarrow> a^n $0 = 0"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1697	by (induct n) (auto simp add: fps_mult_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1698
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1699	lemma startsby_power:"a $0 = (v::'a::comm_ring_1) \<Longrightarrow> a^n $0 = v^n"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1700	by (induct n) (auto simp add: fps_mult_nth)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1701
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1702	lemma startsby_zero_power_iff[simp]: "a^n $0 = (0::'a::idom) \<longleftrightarrow> n \<noteq> 0 \<and> a$0 = 0"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1703	apply (rule iffI)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1704	apply (induct n)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1705	apply (auto simp add: fps_mult_nth)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1706	apply (rule startsby_zero_power, simp_all)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1707	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1708
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1709	lemma startsby_zero_power_prefix:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1710	assumes a0: "a $ 0 = (0::'a::idom)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1711	shows "\<forall>n < k. a ^ k $ n = 0"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1712	using a0
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1713	proof (induct k rule: nat_less_induct)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1714	fix k
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1715	assume H: "\<forall>m<k. a $0 = 0 \<longrightarrow> (\<forall>n<m. a ^ m $ n = 0)" and a0: "a $ 0 = 0"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1716	show "\<forall>m<k. a ^ k $ m = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1717	proof (cases k)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1718	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1719	then show ?thesis by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1720	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1721	case (Suc l)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1722	have "a^k $ m = 0" if mk: "m < k" for m
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1723	proof (cases "m = 0")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1724	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1725	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1726	using startsby_zero_power[of a k] Suc a0 by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1727	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1728	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1729	have "a ^k $ m = (a^l * a) $m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1730	by (simp add: Suc mult.commute)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1731	also have "\<dots> = (\<Sum>i = 0..m. a ^ l $ i * a $ (m - i))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1732	by (simp add: fps_mult_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1733	also have "\<dots> = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1734	apply (rule setsum.neutral)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1735	apply auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1736	apply (case_tac "x = m")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1737	using a0 apply simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1738	apply (rule H[rule_format])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1739	using a0 Suc mk apply auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1740	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1741	finally show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1742	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1743	then show ?thesis by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1744	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1745	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1746
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1747	lemma startsby_zero_setsum_depends:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1748	assumes a0: "a $0 = (0::'a::idom)"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1749	and kn: "n \<ge> k"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1750	shows "setsum (\<lambda>i. (a ^ i)$k) {0 .. n} = setsum (\<lambda>i. (a ^ i)$k) {0 .. k}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1751	apply (rule setsum.mono_neutral_right)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1752	using kn
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1753	apply auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1754	apply (rule startsby_zero_power_prefix[rule_format, OF a0])
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1755	apply arith
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1756	done
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1757
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1758	lemma startsby_zero_power_nth_same:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1759	assumes a0: "a$0 = (0::'a::idom)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1760	shows "a^n $ n = (a$1) ^ n"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1761	proof (induct n)
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1762	case 0
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1763	then show ?case by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1764	next
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1765	case (Suc n)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1766	have "a ^ Suc n $ (Suc n) = (a^n * a)$(Suc n)"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1767	by (simp add: field_simps)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1768	also have "\<dots> = setsum (\<lambda>i. a^n$i * a $ (Suc n - i)) {0.. Suc n}"
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1769	by (simp add: fps_mult_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1770	also have "\<dots> = setsum (\<lambda>i. a^n$i * a $ (Suc n - i)) {n .. Suc n}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1771	apply (rule setsum.mono_neutral_right)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1772	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1773	apply clarsimp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1774	apply clarsimp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1775	apply (rule startsby_zero_power_prefix[rule_format, OF a0])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1776	apply arith
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1777	done
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1778	also have "\<dots> = a^n $ n * a$1"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1779	using a0 by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1780	finally show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1781	using Suc.hyps by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1782	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1783
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1784	lemma fps_inverse_power:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1785	fixes a :: "'a::field fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1786	shows "inverse (a^n) = inverse a ^ n"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1787	by (induction n) (simp_all add: fps_inverse_mult)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1788
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1789	lemma fps_deriv_power:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1790	"fps_deriv (a ^ n) = fps_const (of_nat n :: 'a::comm_ring_1) * fps_deriv a * a ^ (n - 1)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1791	apply (induct n)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1792	apply (auto simp add: field_simps fps_const_add[symmetric] simp del: fps_const_add)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1793	apply (case_tac n)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	1794	apply (auto simp add: field_simps)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1795	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1796
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1797	lemma fps_inverse_deriv:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1798	fixes a :: "'a::field fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1799	assumes a0: "a$0 \<noteq> 0"
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1800	shows "fps_deriv (inverse a) = - fps_deriv a * (inverse a)\<^sup>2"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1801	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1802	from inverse_mult_eq_1[OF a0]
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1803	have "fps_deriv (inverse a * a) = 0" by simp
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	1804	then have "inverse a * fps_deriv a + fps_deriv (inverse a) * a = 0"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	1805	by simp
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	1806	then have "inverse a * (inverse a * fps_deriv a + fps_deriv (inverse a) * a) = 0"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	1807	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1808	with inverse_mult_eq_1[OF a0]
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1809	have "(inverse a)\<^sup>2 * fps_deriv a + fps_deriv (inverse a) = 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1810	unfolding power2_eq_square
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1811	apply (simp add: field_simps)
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	1812	apply (simp add: mult.assoc[symmetric])
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1813	done
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1814	then have "(inverse a)\<^sup>2 * fps_deriv a + fps_deriv (inverse a) - fps_deriv a * (inverse a)\<^sup>2 =
a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1815	0 - fps_deriv a * (inverse a)\<^sup>2"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1816	by simp
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1817	then show "fps_deriv (inverse a) = - fps_deriv a * (inverse a)\<^sup>2"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1818	by (simp add: field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1819	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1820
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1821	lemma fps_inverse_deriv':
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1822	fixes a :: "'a::field fps"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1823	assumes a0: "a $ 0 \<noteq> 0"
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	1824	shows "fps_deriv (inverse a) = - fps_deriv a / a\<^sup>2"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1825	using fps_inverse_deriv[OF a0] a0
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1826	by (simp add: fps_divide_unit power2_eq_square fps_inverse_mult)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1827
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1828	lemma inverse_mult_eq_1':
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1829	assumes f0: "f$0 \<noteq> (0::'a::field)"
60567 19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	1830	shows "f * inverse f = 1"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	1831	by (metis mult.commute inverse_mult_eq_1 f0)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1832
61804 67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1833	(* FIXME: The last part of this proof should go through by simp once we have a proper
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1834	theorem collection for simplifying division on rings *)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1835	lemma fps_divide_deriv:
61804 67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1836	assumes "b dvd (a :: 'a :: field fps)"
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1837	shows "fps_deriv (a / b) = (fps_deriv a * b - a * fps_deriv b) / b^2"
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1838	proof -
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1839	have eq_divide_imp: "c \<noteq> 0 \<Longrightarrow> a * c = b \<Longrightarrow> a = b div c" for a b c :: "'a :: field fps"
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1840	by (drule sym) (simp add: mult.assoc)
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1841	from assms have "a = a / b * b" by simp
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1842	also have "fps_deriv (a / b * b) = fps_deriv (a / b) * b + a / b * fps_deriv b" by simp
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1843	finally have "fps_deriv (a / b) * b^2 = fps_deriv a * b - a * fps_deriv b" using assms
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1844	by (simp add: power2_eq_square algebra_simps)
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1845	thus ?thesis by (cases "b = 0") (auto simp: eq_divide_imp)
67381557cee8 Generalised derivative rule for division on formal power series eberlm parents: 61799 diff changeset	1846	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1847
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1848	lemma fps_inverse_gp': "inverse (Abs_fps (\<lambda>n. 1::'a::field)) = 1 - X"
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	1849	by (simp add: fps_inverse_gp fps_eq_iff X_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1850
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1851	lemma fps_nth_deriv_X[simp]: "fps_nth_deriv n X = (if n = 0 then X else if n=1 then 1 else 0)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1852	by (cases n) simp_all
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1853
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1854	lemma fps_inverse_X_plus1: "inverse (1 + X) = Abs_fps (\<lambda>n. (- (1::'a::field)) ^ n)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1855	(is "_ = ?r")
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1856	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1857	have eq: "(1 + X) * ?r = 1"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1858	unfolding minus_one_power_iff
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1859	by (auto simp add: field_simps fps_eq_iff)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1860	show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1861	by (auto simp add: eq intro: fps_inverse_unique)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1862	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1863
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1864
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1865	subsection \<open>Integration\<close>
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1866
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1867	definition fps_integral :: "'a::field_char_0 fps \<Rightarrow> 'a \<Rightarrow> 'a fps"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	1868	where "fps_integral a a0 = Abs_fps (\<lambda>n. if n = 0 then a0 else (a$(n - 1) / of_nat n))"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1869
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1870	lemma fps_deriv_fps_integral: "fps_deriv (fps_integral a a0) = a"
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1871	unfolding fps_integral_def fps_deriv_def
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1872	by (simp add: fps_eq_iff del: of_nat_Suc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1873
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1874	lemma fps_integral_linear:
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1875	"fps_integral (fps_const a * f + fps_const b * g) (aa0 + bb0) =
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1876	fps_const a * fps_integral f a0 + fps_const b * fps_integral g b0"
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	1877	(is "?l = ?r")
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1878	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1879	have "fps_deriv ?l = fps_deriv ?r"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1880	by (simp add: fps_deriv_fps_integral)
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1881	moreover have "?l$0 = ?r$0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1882	by (simp add: fps_integral_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1883	ultimately show ?thesis
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1884	unfolding fps_deriv_eq_iff by auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1885	qed
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1886
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1887
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1888	subsection \<open>Composition of FPSs\<close>
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1889
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1890	definition fps_compose :: "'a::semiring_1 fps \<Rightarrow> 'a fps \<Rightarrow> 'a fps" (infixl "oo" 55)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1891	where "a oo b = Abs_fps (\<lambda>n. setsum (\<lambda>i. a$i * (b^i$n)) {0..n})"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1892
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1893	lemma fps_compose_nth: "(a oo b)$n = setsum (\<lambda>i. a$i * (b^i$n)) {0..n}"
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1894	by (simp add: fps_compose_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1895
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1896	lemma fps_compose_nth_0 [simp]: "(f oo g) $ 0 = f $ 0"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1897	by (simp add: fps_compose_nth)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	1898
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1899	lemma fps_compose_X[simp]: "a oo X = (a :: 'a::comm_ring_1 fps)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1900	by (simp add: fps_ext fps_compose_def mult_delta_right setsum.delta')
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1901
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1902	lemma fps_const_compose[simp]: "fps_const (a::'a::comm_ring_1) oo b = fps_const a"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1903	by (simp add: fps_eq_iff fps_compose_nth mult_delta_left setsum.delta)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1904
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1905	lemma numeral_compose[simp]: "(numeral k :: 'a::comm_ring_1 fps) oo b = numeral k"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	1906	unfolding numeral_fps_const by simp
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	1907
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1908	lemma neg_numeral_compose[simp]: "(- numeral k :: 'a::comm_ring_1 fps) oo b = - numeral k"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	1909	unfolding neg_numeral_fps_const by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	1910
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1911	lemma X_fps_compose_startby0[simp]: "a$0 = 0 \<Longrightarrow> X oo a = (a :: 'a::comm_ring_1 fps)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	1912	by (simp add: fps_eq_iff fps_compose_def mult_delta_left setsum.delta not_le)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1913
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1914
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1915	subsection \<open>Rules from Herbert Wilf's Generatingfunctionology\<close>
903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1916
903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1917	subsubsection \<open>Rule 1\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1918	(* {a_{n+k}}_0^infty Corresponds to (f - setsum (\<lambda>i. a_i * x^i))/x^h, for h>0*)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1919
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1920	lemma fps_power_mult_eq_shift:
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1921	"X^Suc k * Abs_fps (\<lambda>n. a (n + Suc k)) =
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1922	Abs_fps a - setsum (\<lambda>i. fps_const (a i :: 'a::comm_ring_1) * X^i) {0 .. k}"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1923	(is "?lhs = ?rhs")
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1924	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1925	have "?lhs $ n = ?rhs $ n" for n :: nat
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1926	proof -
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1927	have "?lhs $ n = (if n < Suc k then 0 else a n)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1928	unfolding X_power_mult_nth by auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1929	also have "\<dots> = ?rhs $ n"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1930	proof (induct k)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1931	case 0
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1932	then show ?case
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1933	by (simp add: fps_setsum_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1934	next
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1935	case (Suc k)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1936	have "(Abs_fps a - setsum (\<lambda>i. fps_const (a i :: 'a) * X^i) {0 .. Suc k})$n =
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	1937	(Abs_fps a - setsum (\<lambda>i. fps_const (a i :: 'a) * X^i) {0 .. k} -
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	1938	fps_const (a (Suc k)) * X^ Suc k) $ n"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1939	by (simp add: field_simps)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1940	also have "\<dots> = (if n < Suc k then 0 else a n) - (fps_const (a (Suc k)) * X^ Suc k)$n"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1941	using Suc.hyps[symmetric] unfolding fps_sub_nth by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1942	also have "\<dots> = (if n < Suc (Suc k) then 0 else a n)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	1943	unfolding X_power_mult_right_nth
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	1944	apply (auto simp add: not_less fps_const_def)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	1945	apply (rule cong[of a a, OF refl])
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1946	apply arith
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1947	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1948	finally show ?case
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1949	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1950	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1951	finally show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1952	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1953	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1954	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1955	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1956
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1957
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1958	subsubsection \<open>Rule 2\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1959
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1960	(* We can not reach the form of Wilf, but still near to it using rewrite rules*)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	1961	(* If f reprents {a_n} and P is a polynomial, then
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1962	P(xD) f represents {P(n) a_n}*)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1963
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1964	definition "XD = op * X \<circ> fps_deriv"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1965
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1966	lemma XD_add[simp]:"XD (a + b) = XD a + XD (b :: 'a::comm_ring_1 fps)"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1967	by (simp add: XD_def field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1968
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1969	lemma XD_mult_const[simp]:"XD (fps_const (c::'a::comm_ring_1) * a) = fps_const c * XD a"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	1970	by (simp add: XD_def field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1971
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1972	lemma XD_linear[simp]: "XD (fps_const c * a + fps_const d * b) =
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1973	fps_const c * XD a + fps_const d * XD (b :: 'a::comm_ring_1 fps)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1974	by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1975
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 30837 diff changeset	1976	lemma XDN_linear:
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1977	"(XD ^^ n) (fps_const c * a + fps_const d * b) =
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1978	fps_const c * (XD ^^ n) a + fps_const d * (XD ^^ n) (b :: 'a::comm_ring_1 fps)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	1979	by (induct n) simp_all
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1980
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1981	lemma fps_mult_X_deriv_shift: "X* fps_deriv a = Abs_fps (\<lambda>n. of_nat n* a$n)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1982	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1983
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 30837 diff changeset	1984	lemma fps_mult_XD_shift:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1985	"(XD ^^ k) (a :: 'a::comm_ring_1 fps) = Abs_fps (\<lambda>n. (of_nat n ^ k) * a$n)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	1986	by (induct k arbitrary: a) (simp_all add: XD_def fps_eq_iff field_simps del: One_nat_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1987
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1988
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1989	subsubsection \<open>Rule 3\<close>
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1990
61585 a9599d3d7610 isabelle update_cartouches -c -t; wenzelm parents: 61552 diff changeset	1991	text \<open>Rule 3 is trivial and is given by \<open>fps_times_def\<close>.\<close>
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	1992
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1993
903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	1994	subsubsection \<open>Rule 5 --- summation and "division" by (1 - X)\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1995
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1996	lemma fps_divide_X_minus1_setsum_lemma:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	1997	"a = ((1::'a::comm_ring_1 fps) - X) * Abs_fps (\<lambda>n. setsum (\<lambda>i. a $ i) {0..n})"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	1998	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	1999	let ?sa = "Abs_fps (\<lambda>n. setsum (\<lambda>i. a $ i) {0..n})"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2000	have th0: "\<And>i. (1 - (X::'a fps)) $ i = (if i = 0 then 1 else if i = 1 then - 1 else 0)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2001	by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2002	have "a$n = ((1 - X) * ?sa) $ n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2003	proof (cases "n = 0")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2004	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2005	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2006	by (simp add: fps_mult_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2007	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2008	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2009	then have u: "{0} \<union> ({1} \<union> {2..n}) = {0..n}" "{1} \<union> {2..n} = {1..n}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2010	"{0..n - 1} \<union> {n} = {0..n}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2011	by (auto simp: set_eq_iff)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2012	have d: "{0} \<inter> ({1} \<union> {2..n}) = {}" "{1} \<inter> {2..n} = {}" "{0..n - 1} \<inter> {n} = {}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2013	using False by simp_all
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2014	have f: "finite {0}" "finite {1}" "finite {2 .. n}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2015	"finite {0 .. n - 1}" "finite {n}" by simp_all
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2016	have "((1 - X) * ?sa) $ n = setsum (\<lambda>i. (1 - X)$ i * ?sa $ (n - i)) {0 .. n}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2017	by (simp add: fps_mult_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2018	also have "\<dots> = a$n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2019	unfolding th0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2020	unfolding setsum.union_disjoint[OF f(1) finite_UnI[OF f(2,3)] d(1), unfolded u(1)]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2021	unfolding setsum.union_disjoint[OF f(2) f(3) d(2)]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2022	apply (simp)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2023	unfolding setsum.union_disjoint[OF f(4,5) d(3), unfolded u(3)]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2024	apply simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2025	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2026	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2027	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2028	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2029	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2030	unfolding fps_eq_iff by blast
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2031	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2032
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2033	lemma fps_divide_X_minus1_setsum:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2034	"a /((1::'a::field fps) - X) = Abs_fps (\<lambda>n. setsum (\<lambda>i. a $ i) {0..n})"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2035	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2036	let ?X = "1 - (X::'a fps)"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2037	have th0: "?X $ 0 \<noteq> 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2038	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2039	have "a /?X = ?X * Abs_fps (\<lambda>n::nat. setsum (op $ a) {0..n}) * inverse ?X"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2040	using fps_divide_X_minus1_setsum_lemma[of a, symmetric] th0
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	2041	by (simp add: fps_divide_def mult.assoc)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2042	also have "\<dots> = (inverse ?X * ?X) * Abs_fps (\<lambda>n::nat. setsum (op $ a) {0..n}) "
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	2043	by (simp add: ac_simps)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2044	finally show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2045	by (simp add: inverse_mult_eq_1[OF th0])
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2046	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2047
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2048
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2049	subsubsection \<open>Rule 4 in its more general form: generalizes Rule 3 for an arbitrary
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	2050	finite product of FPS, also the relvant instance of powers of a FPS\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2051
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2052	definition "natpermute n k = {l :: nat list. length l = k \<and> listsum l = n}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2053
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2054	lemma natlist_trivial_1: "natpermute n 1 = {[n]}"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2055	apply (auto simp add: natpermute_def)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2056	apply (case_tac x)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2057	apply auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2058	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2059
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2060	lemma append_natpermute_less_eq:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2061	assumes "xs @ ys \<in> natpermute n k"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2062	shows "listsum xs \<le> n"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2063	and "listsum ys \<le> n"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2064	proof -
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2065	from assms have "listsum (xs @ ys) = n"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2066	by (simp add: natpermute_def)
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2067	then have "listsum xs + listsum ys = n"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2068	by simp
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2069	then show "listsum xs \<le> n" and "listsum ys \<le> n"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2070	by simp_all
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2071	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2072
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2073	lemma natpermute_split:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2074	assumes "h \<le> k"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2075	shows "natpermute n k =
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2076	(\<Union>m \<in>{0..n}. {l1 @ l2 \|l1 l2. l1 \<in> natpermute m h \<and> l2 \<in> natpermute (n - m) (k - h)})"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2077	(is "?L = ?R" is "_ = (\<Union>m \<in>{0..n}. ?S m)")
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2078	proof
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2079	show "?R \<subseteq> ?L"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2080	proof
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2081	fix l
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2082	assume l: "l \<in> ?R"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2083	from l obtain m xs ys where h: "m \<in> {0..n}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2084	and xs: "xs \<in> natpermute m h"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2085	and ys: "ys \<in> natpermute (n - m) (k - h)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2086	and leq: "l = xs@ys" by blast
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2087	from xs have xs': "listsum xs = m"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2088	by (simp add: natpermute_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2089	from ys have ys': "listsum ys = n - m"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2090	by (simp add: natpermute_def)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2091	show "l \<in> ?L" using leq xs ys h
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2092	apply (clarsimp simp add: natpermute_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2093	unfolding xs' ys'
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2094	using assms xs ys
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2095	unfolding natpermute_def
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2096	apply simp
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2097	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2098	qed
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2099	show "?L \<subseteq> ?R"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2100	proof
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2101	fix l
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2102	assume l: "l \<in> natpermute n k"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2103	let ?xs = "take h l"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2104	let ?ys = "drop h l"
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2105	let ?m = "listsum ?xs"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2106	from l have ls: "listsum (?xs @ ?ys) = n"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2107	by (simp add: natpermute_def)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2108	have xs: "?xs \<in> natpermute ?m h" using l assms
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2109	by (simp add: natpermute_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2110	have l_take_drop: "listsum l = listsum (take h l @ drop h l)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2111	by simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2112	then have ys: "?ys \<in> natpermute (n - ?m) (k - h)"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2113	using l assms ls by (auto simp add: natpermute_def simp del: append_take_drop_id)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2114	from ls have m: "?m \<in> {0..n}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2115	by (simp add: l_take_drop del: append_take_drop_id)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2116	from xs ys ls show "l \<in> ?R"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2117	apply auto
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2118	apply (rule bexI [where x = "?m"])
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2119	apply (rule exI [where x = "?xs"])
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2120	apply (rule exI [where x = "?ys"])
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	2121	using ls l
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2122	apply (auto simp add: natpermute_def l_take_drop simp del: append_take_drop_id)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2123	apply simp
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2124	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2125	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2126	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2127
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2128	lemma natpermute_0: "natpermute n 0 = (if n = 0 then {[]} else {})"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2129	by (auto simp add: natpermute_def)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2130
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2131	lemma natpermute_0'[simp]: "natpermute 0 k = (if k = 0 then {[]} else {replicate k 0})"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2132	apply (auto simp add: set_replicate_conv_if natpermute_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2133	apply (rule nth_equalityI)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2134	apply simp_all
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2135	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2136
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2137	lemma natpermute_finite: "finite (natpermute n k)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2138	proof (induct k arbitrary: n)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2139	case 0
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2140	then show ?case
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2141	apply (subst natpermute_split[of 0 0, simplified])
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2142	apply (simp add: natpermute_0)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2143	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2144	next
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2145	case (Suc k)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2146	then show ?case unfolding natpermute_split [of k "Suc k", simplified]
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2147	apply -
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2148	apply (rule finite_UN_I)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2149	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2150	unfolding One_nat_def[symmetric] natlist_trivial_1
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2151	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2152	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2153	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2154
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2155	lemma natpermute_contain_maximal:
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2156	"{xs \<in> natpermute n (k + 1). n \<in> set xs} = (\<Union>i\<in>{0 .. k}. {(replicate (k + 1) 0) [i:=n]})"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2157	(is "?A = ?B")
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2158	proof
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2159	show "?A \<subseteq> ?B"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2160	proof
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2161	fix xs
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2162	assume "xs \<in> ?A"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2163	then have H: "xs \<in> natpermute n (k + 1)" and n: "n \<in> set xs"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2164	by blast+
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2165	then obtain i where i: "i \<in> {0.. k}" "xs!i = n"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2166	unfolding in_set_conv_nth by (auto simp add: less_Suc_eq_le natpermute_def)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2167	have eqs: "({0..k} - {i}) \<union> {i} = {0..k}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2168	using i by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2169	have f: "finite({0..k} - {i})" "finite {i}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2170	by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2171	have d: "({0..k} - {i}) \<inter> {i} = {}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2172	using i by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2173	from H have "n = setsum (nth xs) {0..k}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2174	apply (simp add: natpermute_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2175	apply (auto simp add: atLeastLessThanSuc_atLeastAtMost listsum_setsum_nth)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2176	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2177	also have "\<dots> = n + setsum (nth xs) ({0..k} - {i})"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2178	unfolding setsum.union_disjoint[OF f d, unfolded eqs] using i by simp
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2179	finally have zxs: "\<forall> j\<in> {0..k} - {i}. xs!j = 0"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2180	by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2181	from H have xsl: "length xs = k+1"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2182	by (simp add: natpermute_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2183	from i have i': "i < length (replicate (k+1) 0)" "i < k+1"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2184	unfolding length_replicate by presburger+
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2185	have "xs = replicate (k+1) 0 [i := n]"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2186	apply (rule nth_equalityI)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2187	unfolding xsl length_list_update length_replicate
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2188	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2189	apply clarify
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2190	unfolding nth_list_update[OF i'(1)]
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2191	using i zxs
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2192	apply (case_tac "ia = i")
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2193	apply (auto simp del: replicate.simps)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2194	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2195	then show "xs \<in> ?B" using i by blast
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2196	qed
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2197	show "?B \<subseteq> ?A"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2198	proof
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2199	fix xs
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2200	assume "xs \<in> ?B"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2201	then obtain i where i: "i \<in> {0..k}" and xs: "xs = replicate (k + 1) 0 [i:=n]"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2202	by auto
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2203	have nxs: "n \<in> set xs"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2204	unfolding xs
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2205	apply (rule set_update_memI)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2206	using i apply simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2207	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2208	have xsl: "length xs = k + 1"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2209	by (simp only: xs length_replicate length_list_update)
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2210	have "listsum xs = setsum (nth xs) {0..<k+1}"
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2211	unfolding listsum_setsum_nth xsl ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2212	also have "\<dots> = setsum (\<lambda>j. if j = i then n else 0) {0..< k+1}"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2213	by (rule setsum.cong) (simp_all add: xs del: replicate.simps)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2214	also have "\<dots> = n" using i by (simp add: setsum.delta)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2215	finally have "xs \<in> natpermute n (k + 1)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2216	using xsl unfolding natpermute_def mem_Collect_eq by blast
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2217	then show "xs \<in> ?A"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2218	using nxs by blast
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2219	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2220	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2221
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2222	text \<open>The general form.\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2223	lemma fps_setprod_nth:
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2224	fixes m :: nat
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2225	and a :: "nat \<Rightarrow> 'a::comm_ring_1 fps"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2226	shows "(setprod a {0 .. m}) $ n =
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2227	setsum (\<lambda>v. setprod (\<lambda>j. (a j) $ (v!j)) {0..m}) (natpermute n (m+1))"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2228	(is "?P m n")
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2229	proof (induct m arbitrary: n rule: nat_less_induct)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2230	fix m n assume H: "\<forall>m' < m. \<forall>n. ?P m' n"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2231	show "?P m n"
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2232	proof (cases m)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2233	case 0
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2234	then show ?thesis
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2235	apply simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2236	unfolding natlist_trivial_1[where n = n, unfolded One_nat_def]
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2237	apply simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2238	done
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2239	next
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2240	case (Suc k)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2241	then have km: "k < m" by arith
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2242	have u0: "{0 .. k} \<union> {m} = {0..m}"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2243	using Suc by (simp add: set_eq_iff) presburger
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2244	have f0: "finite {0 .. k}" "finite {m}" by auto
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2245	have d0: "{0 .. k} \<inter> {m} = {}" using Suc by auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2246	have "(setprod a {0 .. m}) $ n = (setprod a {0 .. k} * a m) $ n"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2247	unfolding setprod.union_disjoint[OF f0 d0, unfolded u0] by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2248	also have "\<dots> = (\<Sum>i = 0..n. (\<Sum>v\<in>natpermute i (k + 1). \<Prod>j\<in>{0..k}. a j $ v ! j) * a m $ (n - i))"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2249	unfolding fps_mult_nth H[rule_format, OF km] ..
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2250	also have "\<dots> = (\<Sum>v\<in>natpermute n (m + 1). \<Prod>j\<in>{0..m}. a j $ v ! j)"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2251	apply (simp add: Suc)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2252	unfolding natpermute_split[of m "m + 1", simplified, of n,
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2253	unfolded natlist_trivial_1[unfolded One_nat_def] Suc]
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2254	apply (subst setsum.UNION_disjoint)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2255	apply simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2256	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2257	unfolding image_Collect[symmetric]
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2258	apply clarsimp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2259	apply (rule finite_imageI)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2260	apply (rule natpermute_finite)
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	2261	apply (clarsimp simp add: set_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2262	apply auto
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2263	apply (rule setsum.cong)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2264	apply (rule refl)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2265	unfolding setsum_left_distrib
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2266	apply (rule sym)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2267	apply (rule_tac l = "\<lambda>xs. xs @ [n - x]" in setsum.reindex_cong)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2268	apply (simp add: inj_on_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2269	apply auto
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2270	unfolding setprod.union_disjoint[OF f0 d0, unfolded u0, unfolded Suc]
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2271	apply (clarsimp simp add: natpermute_def nth_append)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2272	done
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2273	finally show ?thesis .
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2274	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2275	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2276
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2277	text \<open>The special form for powers.\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2278	lemma fps_power_nth_Suc:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2279	fixes m :: nat
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2280	and a :: "'a::comm_ring_1 fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2281	shows "(a ^ Suc m)$n = setsum (\<lambda>v. setprod (\<lambda>j. a $ (v!j)) {0..m}) (natpermute n (m+1))"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2282	proof -
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2283	have th0: "a^Suc m = setprod (\<lambda>i. a) {0..m}"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2284	by (simp add: setprod_constant)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2285	show ?thesis unfolding th0 fps_setprod_nth ..
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2286	qed
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2287
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2288	lemma fps_power_nth:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2289	fixes m :: nat
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2290	and a :: "'a::comm_ring_1 fps"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2291	shows "(a ^m)$n =
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2292	(if m=0 then 1$n else setsum (\<lambda>v. setprod (\<lambda>j. a $ (v!j)) {0..m - 1}) (natpermute n m))"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2293	by (cases m) (simp_all add: fps_power_nth_Suc del: power_Suc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2294
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2295	lemma fps_nth_power_0:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2296	fixes m :: nat
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2297	and a :: "'a::comm_ring_1 fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2298	shows "(a ^m)$0 = (a$0) ^ m"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2299	proof (cases m)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2300	case 0
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2301	then show ?thesis by simp
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2302	next
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2303	case (Suc n)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2304	then have c: "m = card {0..n}" by simp
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2305	have "(a ^m)$0 = setprod (\<lambda>i. a$0) {0..n}"
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2306	by (simp add: Suc fps_power_nth del: replicate.simps power_Suc)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2307	also have "\<dots> = (a$0) ^ m"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62422 diff changeset	2308	unfolding c by (rule setprod_constant)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	2309	finally show ?thesis .
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2310	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2311
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2312	lemma fps_compose_inj_right:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2313	assumes a0: "a$0 = (0::'a::idom)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2314	and a1: "a$1 \<noteq> 0"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2315	shows "(b oo a = c oo a) \<longleftrightarrow> b = c"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2316	(is "?lhs \<longleftrightarrow>?rhs")
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2317	proof
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2318	show ?lhs if ?rhs using that by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2319	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2320	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2321	have "b$n = c$n" for n
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2322	proof (induct n rule: nat_less_induct)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2323	fix n
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2324	assume H: "\<forall>m<n. b$m = c$m"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2325	show "b$n = c$n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2326	proof (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2327	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2328	from \<open>?lhs\<close> have "(b oo a)$n = (c oo a)$n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2329	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2330	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2331	using 0 by (simp add: fps_compose_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2332	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2333	case (Suc n1)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2334	have f: "finite {0 .. n1}" "finite {n}" by simp_all
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2335	have eq: "{0 .. n1} \<union> {n} = {0 .. n}" using Suc by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2336	have d: "{0 .. n1} \<inter> {n} = {}" using Suc by auto
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2337	have seq: "(\<Sum>i = 0..n1. b $ i * a ^ i $ n) = (\<Sum>i = 0..n1. c $ i * a ^ i $ n)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2338	apply (rule setsum.cong)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2339	using H Suc
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2340	apply auto
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2341	done
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2342	have th0: "(b oo a) $n = (\<Sum>i = 0..n1. c $ i * a ^ i $ n) + b$n * (a$1)^n"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2343	unfolding fps_compose_nth setsum.union_disjoint[OF f d, unfolded eq] seq
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2344	using startsby_zero_power_nth_same[OF a0]
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2345	by simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2346	have th1: "(c oo a) $n = (\<Sum>i = 0..n1. c $ i * a ^ i $ n) + c$n * (a$1)^n"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2347	unfolding fps_compose_nth setsum.union_disjoint[OF f d, unfolded eq]
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2348	using startsby_zero_power_nth_same[OF a0]
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2349	by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2350	from \<open>?lhs\<close>[unfolded fps_eq_iff, rule_format, of n] th0 th1 a1
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2351	show ?thesis by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2352	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2353	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2354	then show ?rhs by (simp add: fps_eq_iff)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2355	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2356	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2357
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2358
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	2359	subsection \<open>Radicals\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2360
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2361	declare setprod.cong [fundef_cong]
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2362
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2363	function radical :: "(nat \<Rightarrow> 'a \<Rightarrow> 'a) \<Rightarrow> nat \<Rightarrow> 'a::field fps \<Rightarrow> nat \<Rightarrow> 'a"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2364	where
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2365	"radical r 0 a 0 = 1"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2366	\| "radical r 0 a (Suc n) = 0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2367	\| "radical r (Suc k) a 0 = r (Suc k) (a$0)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2368	\| "radical r (Suc k) a (Suc n) =
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2369	(a$ Suc n - setsum (\<lambda>xs. setprod (\<lambda>j. radical r (Suc k) a (xs ! j)) {0..k})
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2370	{xs. xs \<in> natpermute (Suc n) (Suc k) \<and> Suc n \<notin> set xs}) /
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2371	(of_nat (Suc k) * (radical r (Suc k) a 0)^k)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2372	by pat_completeness auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2373
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2374	termination radical
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2375	proof
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2376	let ?R = "measure (\<lambda>(r, k, a, n). n)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2377	{
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2378	show "wf ?R" by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2379	next
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2380	fix r k a n xs i
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2381	assume xs: "xs \<in> {xs \<in> natpermute (Suc n) (Suc k). Suc n \<notin> set xs}" and i: "i \<in> {0..k}"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2382	have False if c: "Suc n \<le> xs ! i"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2383	proof -
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2384	from xs i have "xs !i \<noteq> Suc n"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2385	by (auto simp add: in_set_conv_nth natpermute_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2386	with c have c': "Suc n < xs!i" by arith
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2387	have fths: "finite {0 ..< i}" "finite {i}" "finite {i+1..<Suc k}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2388	by simp_all
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2389	have d: "{0 ..< i} \<inter> ({i} \<union> {i+1 ..< Suc k}) = {}" "{i} \<inter> {i+1..< Suc k} = {}"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2390	by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2391	have eqs: "{0..<Suc k} = {0 ..< i} \<union> ({i} \<union> {i+1 ..< Suc k})"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2392	using i by auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2393	from xs have "Suc n = listsum xs"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2394	by (simp add: natpermute_def)
46131 ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2395	also have "\<dots> = setsum (nth xs) {0..<Suc k}" using xs
ab07a3ef821c prefer listsum over foldl plus 0 haftmann parents: 44174 diff changeset	2396	by (simp add: natpermute_def listsum_setsum_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2397	also have "\<dots> = xs!i + setsum (nth xs) {0..<i} + setsum (nth xs) {i+1..<Suc k}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2398	unfolding eqs setsum.union_disjoint[OF fths(1) finite_UnI[OF fths(2,3)] d(1)]
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2399	unfolding setsum.union_disjoint[OF fths(2) fths(3) d(2)]
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2400	by simp
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2401	finally show ?thesis using c' by simp
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2402	qed
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2403	then show "((r, Suc k, a, xs!i), r, Suc k, a, Suc n) \<in> ?R"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2404	apply auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2405	apply (metis not_less)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2406	done
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2407	next
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2408	fix r k a n
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2409	show "((r, Suc k, a, 0), r, Suc k, a, Suc n) \<in> ?R" by simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2410	}
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2411	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2412
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2413	definition "fps_radical r n a = Abs_fps (radical r n a)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2414
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2415	lemma fps_radical0[simp]: "fps_radical r 0 a = 1"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2416	apply (auto simp add: fps_eq_iff fps_radical_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2417	apply (case_tac n)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2418	apply auto
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2419	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2420
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2421	lemma fps_radical_nth_0[simp]: "fps_radical r n a $ 0 = (if n = 0 then 1 else r n (a$0))"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2422	by (cases n) (simp_all add: fps_radical_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2423
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2424	lemma fps_radical_power_nth[simp]:
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2425	assumes r: "(r k (a$0)) ^ k = a$0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2426	shows "fps_radical r k a ^ k $ 0 = (if k = 0 then 1 else a$0)"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2427	proof (cases k)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2428	case 0
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2429	then show ?thesis by simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2430	next
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2431	case (Suc h)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2432	have eq1: "fps_radical r k a ^ k $ 0 = (\<Prod>j\<in>{0..h}. fps_radical r k a $ (replicate k 0) ! j)"
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2433	unfolding fps_power_nth Suc by simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2434	also have "\<dots> = (\<Prod>j\<in>{0..h}. r k (a$0))"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2435	apply (rule setprod.cong)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2436	apply simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2437	using Suc
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2438	apply (subgoal_tac "replicate k 0 ! x = 0")
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2439	apply (auto intro: nth_replicate simp del: replicate.simps)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2440	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2441	also have "\<dots> = a$0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2442	using r Suc by (simp add: setprod_constant)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2443	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2444	using Suc by simp
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2445	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2446
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2447	lemma natpermute_max_card:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2448	assumes n0: "n \<noteq> 0"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2449	shows "card {xs \<in> natpermute n (k + 1). n \<in> set xs} = k + 1"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2450	unfolding natpermute_contain_maximal
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2451	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2452	let ?A = "\<lambda>i. {replicate (k + 1) 0[i := n]}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2453	let ?K = "{0 ..k}"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2454	have fK: "finite ?K"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2455	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2456	have fAK: "\<forall>i\<in>?K. finite (?A i)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2457	by auto
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2458	have d: "\<forall>i\<in> ?K. \<forall>j\<in> ?K. i \<noteq> j \<longrightarrow>
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2459	{replicate (k + 1) 0[i := n]} \<inter> {replicate (k + 1) 0[j := n]} = {}"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2460	proof clarify
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2461	fix i j
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2462	assume i: "i \<in> ?K" and j: "j \<in> ?K" and ij: "i \<noteq> j"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2463	have False if eq: "replicate (k+1) 0 [i:=n] = replicate (k+1) 0 [j:= n]"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2464	proof -
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2465	have "(replicate (k+1) 0 [i:=n] ! i) = n"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2466	using i by (simp del: replicate.simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2467	moreover
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2468	have "(replicate (k+1) 0 [j:=n] ! i) = 0"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2469	using i ij by (simp del: replicate.simps)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2470	ultimately show ?thesis
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2471	using eq n0 by (simp del: replicate.simps)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2472	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2473	then show "{replicate (k + 1) 0[i := n]} \<inter> {replicate (k + 1) 0[j := n]} = {}"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2474	by auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2475	qed
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2476	from card_UN_disjoint[OF fK fAK d]
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2477	show "card (\<Union>i\<in>{0..k}. {replicate (k + 1) 0[i := n]}) = k + 1"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2478	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2479	qed
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2480
5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2481	lemma power_radical:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	2482	fixes a:: "'a::field_char_0 fps"
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2483	assumes a0: "a$0 \<noteq> 0"
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2484	shows "(r (Suc k) (a$0)) ^ Suc k = a$0 \<longleftrightarrow> (fps_radical r (Suc k) a) ^ (Suc k) = a"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2485	(is "?lhs \<longleftrightarrow> ?rhs")
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2486	proof
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2487	let ?r = "fps_radical r (Suc k) a"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2488	show ?rhs if r0: ?lhs
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2489	proof -
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2490	from a0 r0 have r00: "r (Suc k) (a$0) \<noteq> 0" by auto
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2491	have "?r ^ Suc k $ z = a$z" for z
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2492	proof (induct z rule: nat_less_induct)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2493	fix n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2494	assume H: "\<forall>m<n. ?r ^ Suc k $ m = a$m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2495	show "?r ^ Suc k $ n = a $n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2496	proof (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2497	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2498	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2499	using fps_radical_power_nth[of r "Suc k" a, OF r0] by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2500	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2501	case (Suc n1)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2502	then have "n \<noteq> 0" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2503	let ?Pnk = "natpermute n (k + 1)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2504	let ?Pnkn = "{xs \<in> ?Pnk. n \<in> set xs}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2505	let ?Pnknn = "{xs \<in> ?Pnk. n \<notin> set xs}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2506	have eq: "?Pnkn \<union> ?Pnknn = ?Pnk" by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2507	have d: "?Pnkn \<inter> ?Pnknn = {}" by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2508	have f: "finite ?Pnkn" "finite ?Pnknn"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2509	using finite_Un[of ?Pnkn ?Pnknn, unfolded eq]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2510	by (metis natpermute_finite)+
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2511	let ?f = "\<lambda>v. \<Prod>j\<in>{0..k}. ?r $ v ! j"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2512	have "setsum ?f ?Pnkn = setsum (\<lambda>v. ?r $ n * r (Suc k) (a $ 0) ^ k) ?Pnkn"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2513	proof (rule setsum.cong)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2514	fix v assume v: "v \<in> {xs \<in> natpermute n (k + 1). n \<in> set xs}"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2515	let ?ths = "(\<Prod>j\<in>{0..k}. fps_radical r (Suc k) a $ v ! j) =
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2516	fps_radical r (Suc k) a $ n * r (Suc k) (a $ 0) ^ k"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2517	from v obtain i where i: "i \<in> {0..k}" "v = replicate (k+1) 0 [i:= n]"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2518	unfolding natpermute_contain_maximal by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2519	have "(\<Prod>j\<in>{0..k}. fps_radical r (Suc k) a $ v ! j) =
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2520	(\<Prod>j\<in>{0..k}. if j = i then fps_radical r (Suc k) a $ n else r (Suc k) (a$0))"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2521	apply (rule setprod.cong, simp)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2522	using i r0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2523	apply (simp del: replicate.simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2524	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2525	also have "\<dots> = (fps_radical r (Suc k) a $ n) * r (Suc k) (a$0) ^ k"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2526	using i r0 by (simp add: setprod_gen_delta)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2527	finally show ?ths .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2528	qed rule
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2529	then have "setsum ?f ?Pnkn = of_nat (k+1) * ?r $ n * r (Suc k) (a $ 0) ^ k"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2530	by (simp add: natpermute_max_card[OF \<open>n \<noteq> 0\<close>, simplified])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2531	also have "\<dots> = a$n - setsum ?f ?Pnknn"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2532	unfolding Suc using r00 a0 by (simp add: field_simps fps_radical_def del: of_nat_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2533	finally have fn: "setsum ?f ?Pnkn = a$n - setsum ?f ?Pnknn" .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2534	have "(?r ^ Suc k)$n = setsum ?f ?Pnkn + setsum ?f ?Pnknn"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2535	unfolding fps_power_nth_Suc setsum.union_disjoint[OF f d, unfolded eq] ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2536	also have "\<dots> = a$n" unfolding fn by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2537	finally show ?thesis .
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2538	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2539	qed
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2540	then show ?thesis using r0 by (simp add: fps_eq_iff)
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2541	qed
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2542	show ?lhs if ?rhs
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2543	proof -
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2544	from that have "((fps_radical r (Suc k) a) ^ (Suc k))$0 = a$0"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2545	by simp
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2546	then show ?thesis
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2547	unfolding fps_power_nth_Suc
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2548	by (simp add: setprod_constant del: replicate.simps)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2549	qed
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2550	qed
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2551
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2552	(*
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2553	lemma power_radical:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	2554	fixes a:: "'a::field_char_0 fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2555	assumes r0: "(r (Suc k) (a$0)) ^ Suc k = a$0" and a0: "a$0 \<noteq> 0"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2556	shows "(fps_radical r (Suc k) a) ^ (Suc k) = a"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2557	proof-
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2558	let ?r = "fps_radical r (Suc k) a"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2559	from a0 r0 have r00: "r (Suc k) (a$0) \<noteq> 0" by auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2560	{fix z have "?r ^ Suc k $ z = a$z"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2561	proof(induct z rule: nat_less_induct)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2562	fix n assume H: "\<forall>m<n. ?r ^ Suc k $ m = a$m"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2563	{assume "n = 0" then have "?r ^ Suc k $ n = a $n"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2564	using fps_radical_power_nth[of r "Suc k" a, OF r0] by simp}
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2565	moreover
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2566	{fix n1 assume n1: "n = Suc n1"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2567	have fK: "finite {0..k}" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2568	have nz: "n \<noteq> 0" using n1 by arith
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2569	let ?Pnk = "natpermute n (k + 1)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2570	let ?Pnkn = "{xs \<in> ?Pnk. n \<in> set xs}"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2571	let ?Pnknn = "{xs \<in> ?Pnk. n \<notin> set xs}"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2572	have eq: "?Pnkn \<union> ?Pnknn = ?Pnk" by blast
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2573	have d: "?Pnkn \<inter> ?Pnknn = {}" by blast
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2574	have f: "finite ?Pnkn" "finite ?Pnknn"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2575	using finite_Un[of ?Pnkn ?Pnknn, unfolded eq]
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2576	by (metis natpermute_finite)+
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2577	let ?f = "\<lambda>v. \<Prod>j\<in>{0..k}. ?r $ v ! j"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2578	have "setsum ?f ?Pnkn = setsum (\<lambda>v. ?r $ n * r (Suc k) (a $ 0) ^ k) ?Pnkn"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2579	proof(rule setsum.cong2)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2580	fix v assume v: "v \<in> {xs \<in> natpermute n (k + 1). n \<in> set xs}"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2581	let ?ths = "(\<Prod>j\<in>{0..k}. fps_radical r (Suc k) a $ v ! j) = fps_radical r (Suc k) a $ n * r (Suc k) (a $ 0) ^ k"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2582	from v obtain i where i: "i \<in> {0..k}" "v = replicate (k+1) 0 [i:= n]"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2583	unfolding natpermute_contain_maximal by auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2584	have "(\<Prod>j\<in>{0..k}. fps_radical r (Suc k) a $ v ! j) = (\<Prod>j\<in>{0..k}. if j = i then fps_radical r (Suc k) a $ n else r (Suc k) (a$0))"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2585	apply (rule setprod.cong, simp)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2586	using i r0 by (simp del: replicate.simps)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2587	also have "\<dots> = (fps_radical r (Suc k) a $ n) * r (Suc k) (a$0) ^ k"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2588	unfolding setprod_gen_delta[OF fK] using i r0 by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2589	finally show ?ths .
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2590	qed
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2591	then have "setsum ?f ?Pnkn = of_nat (k+1) * ?r $ n * r (Suc k) (a $ 0) ^ k"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2592	by (simp add: natpermute_max_card[OF nz, simplified])
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2593	also have "\<dots> = a$n - setsum ?f ?Pnknn"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2594	unfolding n1 using r00 a0 by (simp add: field_simps fps_radical_def del: of_nat_Suc )
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2595	finally have fn: "setsum ?f ?Pnkn = a$n - setsum ?f ?Pnknn" .
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2596	have "(?r ^ Suc k)$n = setsum ?f ?Pnkn + setsum ?f ?Pnknn"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2597	unfolding fps_power_nth_Suc setsum.union_disjoint[OF f d, unfolded eq] ..
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2598	also have "\<dots> = a$n" unfolding fn by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2599	finally have "?r ^ Suc k $ n = a $n" .}
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2600	ultimately show "?r ^ Suc k $ n = a $n" by (cases n, auto)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2601	qed }
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2602	then show ?thesis by (simp add: fps_eq_iff)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2603	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2604
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2605	*)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2606	lemma eq_divide_imp':
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2607	fixes c :: "'a::field"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2608	shows "c \<noteq> 0 \<Longrightarrow> a * c = b \<Longrightarrow> a = b / c"
56480 093ea91498e6 field_simps: better support for negation and division, and power hoelzl parents: 56479 diff changeset	2609	by (simp add: field_simps)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2610
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2611	lemma radical_unique:
5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2612	assumes r0: "(r (Suc k) (b$0)) ^ Suc k = b$0"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2613	and a0: "r (Suc k) (b$0 ::'a::field_char_0) = a$0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2614	and b0: "b$0 \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2615	shows "a^(Suc k) = b \<longleftrightarrow> a = fps_radical r (Suc k) b"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2616	(is "?lhs \<longleftrightarrow> ?rhs" is "_ \<longleftrightarrow> a = ?r")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2617	proof
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2618	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2619	using that using power_radical[OF b0, of r k, unfolded r0] by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2620	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2621	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2622	have r00: "r (Suc k) (b$0) \<noteq> 0" using b0 r0 by auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2623	have ceq: "card {0..k} = Suc k" by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2624	from a0 have a0r0: "a$0 = ?r$0" by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2625	have "a $ n = ?r $ n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2626	proof (induct n rule: nat_less_induct)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2627	fix n
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2628	assume h: "\<forall>m<n. a$m = ?r $m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2629	show "a$n = ?r $ n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2630	proof (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2631	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2632	then show ?thesis using a0 by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2633	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2634	case (Suc n1)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2635	have fK: "finite {0..k}" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2636	have nz: "n \<noteq> 0" using Suc by simp
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2637	let ?Pnk = "natpermute n (Suc k)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2638	let ?Pnkn = "{xs \<in> ?Pnk. n \<in> set xs}"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2639	let ?Pnknn = "{xs \<in> ?Pnk. n \<notin> set xs}"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2640	have eq: "?Pnkn \<union> ?Pnknn = ?Pnk" by blast
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2641	have d: "?Pnkn \<inter> ?Pnknn = {}" by blast
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2642	have f: "finite ?Pnkn" "finite ?Pnknn"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2643	using finite_Un[of ?Pnkn ?Pnknn, unfolded eq]
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2644	by (metis natpermute_finite)+
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2645	let ?f = "\<lambda>v. \<Prod>j\<in>{0..k}. ?r $ v ! j"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2646	let ?g = "\<lambda>v. \<Prod>j\<in>{0..k}. a $ v ! j"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2647	have "setsum ?g ?Pnkn = setsum (\<lambda>v. a $ n * (?r$0)^k) ?Pnkn"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2648	proof (rule setsum.cong)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2649	fix v
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2650	assume v: "v \<in> {xs \<in> natpermute n (Suc k). n \<in> set xs}"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2651	let ?ths = "(\<Prod>j\<in>{0..k}. a $ v ! j) = a $ n * (?r$0)^k"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2652	from v obtain i where i: "i \<in> {0..k}" "v = replicate (k+1) 0 [i:= n]"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2653	unfolding Suc_eq_plus1 natpermute_contain_maximal
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2654	by (auto simp del: replicate.simps)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2655	have "(\<Prod>j\<in>{0..k}. a $ v ! j) = (\<Prod>j\<in>{0..k}. if j = i then a $ n else r (Suc k) (b$0))"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2656	apply (rule setprod.cong, simp)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2657	using i a0
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2658	apply (simp del: replicate.simps)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2659	done
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2660	also have "\<dots> = a $ n * (?r $ 0)^k"
46757 ad878aff9c15 removing finiteness goals bulwahn parents: 46131 diff changeset	2661	using i by (simp add: setprod_gen_delta)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2662	finally show ?ths .
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2663	qed rule
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2664	then have th0: "setsum ?g ?Pnkn = of_nat (k+1) * a $ n * (?r $ 0)^k"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2665	by (simp add: natpermute_max_card[OF nz, simplified])
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2666	have th1: "setsum ?g ?Pnknn = setsum ?f ?Pnknn"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2667	proof (rule setsum.cong, rule refl, rule setprod.cong, simp)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2668	fix xs i
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2669	assume xs: "xs \<in> ?Pnknn" and i: "i \<in> {0..k}"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2670	have False if c: "n \<le> xs ! i"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2671	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2672	from xs i have "xs ! i \<noteq> n"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2673	by (auto simp add: in_set_conv_nth natpermute_def)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2674	with c have c': "n < xs!i" by arith
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2675	have fths: "finite {0 ..< i}" "finite {i}" "finite {i+1..<Suc k}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2676	by simp_all
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2677	have d: "{0 ..< i} \<inter> ({i} \<union> {i+1 ..< Suc k}) = {}" "{i} \<inter> {i+1..< Suc k} = {}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2678	by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2679	have eqs: "{0..<Suc k} = {0 ..< i} \<union> ({i} \<union> {i+1 ..< Suc k})"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2680	using i by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2681	from xs have "n = listsum xs"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2682	by (simp add: natpermute_def)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2683	also have "\<dots> = setsum (nth xs) {0..<Suc k}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2684	using xs by (simp add: natpermute_def listsum_setsum_nth)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2685	also have "\<dots> = xs!i + setsum (nth xs) {0..<i} + setsum (nth xs) {i+1..<Suc k}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2686	unfolding eqs setsum.union_disjoint[OF fths(1) finite_UnI[OF fths(2,3)] d(1)]
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2687	unfolding setsum.union_disjoint[OF fths(2) fths(3) d(2)]
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2688	by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2689	finally show ?thesis using c' by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2690	qed
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2691	then have thn: "xs!i < n" by presburger
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2692	from h[rule_format, OF thn] show "a$(xs !i) = ?r$(xs!i)" .
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2693	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2694	have th00: "\<And>x::'a. of_nat (Suc k) * (x * inverse (of_nat (Suc k))) = x"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	2695	by (simp add: field_simps del: of_nat_Suc)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2696	from \<open>?lhs\<close> have "b$n = a^Suc k $ n"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2697	by (simp add: fps_eq_iff)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2698	also have "a ^ Suc k$n = setsum ?g ?Pnkn + setsum ?g ?Pnknn"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2699	unfolding fps_power_nth_Suc
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2700	using setsum.union_disjoint[OF f d, unfolded Suc_eq_plus1[symmetric],
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2701	unfolded eq, of ?g] by simp
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2702	also have "\<dots> = of_nat (k+1) * a $ n * (?r $ 0)^k + setsum ?f ?Pnknn"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2703	unfolding th0 th1 ..
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2704	finally have "of_nat (k+1) * a $ n * (?r $ 0)^k = b$n - setsum ?f ?Pnknn"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2705	by simp
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2706	then have "a$n = (b$n - setsum ?f ?Pnknn) / (of_nat (k+1) * (?r $ 0)^k)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2707	apply -
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2708	apply (rule eq_divide_imp')
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2709	using r00
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2710	apply (simp del: of_nat_Suc)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	2711	apply (simp add: ac_simps)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2712	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2713	then show ?thesis
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	2714	apply (simp del: of_nat_Suc)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2715	unfolding fps_radical_def Suc
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2716	apply (simp add: field_simps Suc th00 del: of_nat_Suc)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2717	done
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2718	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2719	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2720	then show ?rhs by (simp add: fps_eq_iff)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2721	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2722	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2723
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2724
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2725	lemma radical_power:
5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2726	assumes r0: "r (Suc k) ((a$0) ^ Suc k) = a$0"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2727	and a0: "(a$0 :: 'a::field_char_0) \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2728	shows "(fps_radical r (Suc k) (a ^ Suc k)) = a"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2729	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2730	let ?ak = "a^ Suc k"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2731	have ak0: "?ak $ 0 = (a$0) ^ Suc k"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2732	by (simp add: fps_nth_power_0 del: power_Suc)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2733	from r0 have th0: "r (Suc k) (a ^ Suc k $ 0) ^ Suc k = a ^ Suc k $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2734	using ak0 by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2735	from r0 ak0 have th1: "r (Suc k) (a ^ Suc k $ 0) = a $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2736	by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2737	from ak0 a0 have ak00: "?ak $ 0 \<noteq>0 "
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2738	by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2739	from radical_unique[of r k ?ak a, OF th0 th1 ak00] show ?thesis
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2740	by metis
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2741	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2742
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2743	lemma fps_deriv_radical:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2744	fixes a :: "'a::field_char_0 fps"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2745	assumes r0: "(r (Suc k) (a$0)) ^ Suc k = a$0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2746	and a0: "a$0 \<noteq> 0"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2747	shows "fps_deriv (fps_radical r (Suc k) a) =
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2748	fps_deriv a / (fps_const (of_nat (Suc k)) * (fps_radical r (Suc k) a) ^ k)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2749	proof -
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2750	let ?r = "fps_radical r (Suc k) a"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2751	let ?w = "(fps_const (of_nat (Suc k)) * ?r ^ k)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2752	from a0 r0 have r0': "r (Suc k) (a$0) \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2753	by auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2754	from r0' have w0: "?w $ 0 \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2755	by (simp del: of_nat_Suc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2756	note th0 = inverse_mult_eq_1[OF w0]
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2757	let ?iw = "inverse ?w"
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2758	from iffD1[OF power_radical[of a r], OF a0 r0]
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2759	have "fps_deriv (?r ^ Suc k) = fps_deriv a"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2760	by simp
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2761	then have "fps_deriv ?r * ?w = fps_deriv a"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	2762	by (simp add: fps_deriv_power ac_simps del: power_Suc)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2763	then have "?iw * fps_deriv ?r * ?w = ?iw * fps_deriv a"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2764	by simp
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2765	with a0 r0 have "fps_deriv ?r * (?iw * ?w) = fps_deriv a / ?w"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2766	by (subst fps_divide_unit) (auto simp del: of_nat_Suc)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2767	then show ?thesis unfolding th0 by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2768	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2769
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2770	lemma radical_mult_distrib:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2771	fixes a :: "'a::field_char_0 fps"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2772	assumes k: "k > 0"
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2773	and ra0: "r k (a $ 0) ^ k = a $ 0"
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2774	and rb0: "r k (b $ 0) ^ k = b $ 0"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2775	and a0: "a $ 0 \<noteq> 0"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2776	and b0: "b $ 0 \<noteq> 0"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	2777	shows "r k ((a * b) $ 0) = r k (a $ 0) * r k (b $ 0) \<longleftrightarrow>
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2778	fps_radical r k (a * b) = fps_radical r k a * fps_radical r k b"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2779	(is "?lhs \<longleftrightarrow> ?rhs")
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2780	proof
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2781	show ?rhs if r0': ?lhs
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2782	proof -
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2783	from r0' have r0: "(r k ((a * b) $ 0)) ^ k = (a * b) $ 0"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2784	by (simp add: fps_mult_nth ra0 rb0 power_mult_distrib)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2785	show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2786	proof (cases k)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2787	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2788	then show ?thesis using r0' by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2789	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2790	case (Suc h)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2791	let ?ra = "fps_radical r (Suc h) a"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2792	let ?rb = "fps_radical r (Suc h) b"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2793	have th0: "r (Suc h) ((a * b) $ 0) = (fps_radical r (Suc h) a * fps_radical r (Suc h) b) $ 0"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2794	using r0' Suc by (simp add: fps_mult_nth)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2795	have ab0: "(a*b) $ 0 \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2796	using a0 b0 by (simp add: fps_mult_nth)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2797	from radical_unique[of r h "ab" "fps_radical r (Suc h) a fps_radical r (Suc h) b", OF r0[unfolded Suc] th0 ab0, symmetric]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2798	iffD1[OF power_radical[of _ r], OF a0 ra0[unfolded Suc]] iffD1[OF power_radical[of _ r], OF b0 rb0[unfolded Suc]] Suc r0'
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2799	show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2800	by (auto simp add: power_mult_distrib simp del: power_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2801	qed
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2802	qed
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2803	show ?lhs if ?rhs
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2804	proof -
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2805	from that have "(fps_radical r k (a * b)) $ 0 = (fps_radical r k a * fps_radical r k b) $ 0"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2806	by simp
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2807	then show ?thesis
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2808	using k by (simp add: fps_mult_nth)
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2809	qed
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2810	qed
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2811
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2812	(*
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2813	lemma radical_mult_distrib:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	2814	fixes a:: "'a::field_char_0 fps"
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2815	assumes
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2816	ra0: "r k (a $ 0) ^ k = a $ 0"
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2817	and rb0: "r k (b $ 0) ^ k = b $ 0"
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2818	and r0': "r k ((a * b) $ 0) = r k (a $ 0) * r k (b $ 0)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2819	and a0: "a$0 \<noteq> 0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2820	and b0: "b$0 \<noteq> 0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2821	shows "fps_radical r (k) (ab) = fps_radical r (k) a fps_radical r (k) (b)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2822	proof-
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2823	from r0' have r0: "(r (k) ((ab)$0)) ^ k = (ab)$0"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2824	by (simp add: fps_mult_nth ra0 rb0 power_mult_distrib)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	2825	{assume "k=0" then have ?thesis by simp}
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2826	moreover
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2827	{fix h assume k: "k = Suc h"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2828	let ?ra = "fps_radical r (Suc h) a"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2829	let ?rb = "fps_radical r (Suc h) b"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2830	have th0: "r (Suc h) ((a * b) $ 0) = (fps_radical r (Suc h) a * fps_radical r (Suc h) b) $ 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2831	using r0' k by (simp add: fps_mult_nth)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2832	have ab0: "(a*b) $ 0 \<noteq> 0" using a0 b0 by (simp add: fps_mult_nth)
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2833	from radical_unique[of r h "ab" "fps_radical r (Suc h) a fps_radical r (Suc h) b", OF r0[unfolded k] th0 ab0, symmetric]
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2834	power_radical[of r, OF ra0[unfolded k] a0] power_radical[of r, OF rb0[unfolded k] b0] k
30273 ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc huffman parents: 29915 diff changeset	2835	have ?thesis by (auto simp add: power_mult_distrib simp del: power_Suc)}
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2836	ultimately show ?thesis by (cases k, auto)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2837	qed
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2838	*)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2839
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2840	lemma fps_divide_1 [simp]: "(a :: 'a::field fps) / 1 = a"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2841	by (fact divide_1)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2842
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2843	lemma radical_divide:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	2844	fixes a :: "'a::field_char_0 fps"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2845	assumes kp: "k > 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2846	and ra0: "(r k (a $ 0)) ^ k = a $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2847	and rb0: "(r k (b $ 0)) ^ k = b $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2848	and a0: "a$0 \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2849	and b0: "b$0 \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2850	shows "r k ((a $ 0) / (b$0)) = r k (a$0) / r k (b $ 0) \<longleftrightarrow>
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2851	fps_radical r k (a/b) = fps_radical r k a / fps_radical r k b"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2852	(is "?lhs = ?rhs")
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2853	proof
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2854	let ?r = "fps_radical r k"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2855	from kp obtain h where k: "k = Suc h"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	2856	by (cases k) auto
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2857	have ra0': "r k (a$0) \<noteq> 0" using a0 ra0 k by auto
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2858	have rb0': "r k (b$0) \<noteq> 0" using b0 rb0 k by auto
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2859
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2860	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2861	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2862	from that have "?r (a/b) $ 0 = (?r a / ?r b)$0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2863	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2864	then show ?thesis
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2865	using k a0 b0 rb0' by (simp add: fps_divide_unit fps_mult_nth fps_inverse_def divide_inverse)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2866	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2867	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2868	proof -
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	2869	from a0 b0 have ab0[simp]: "(a/b)$0 = a$0 / b$0"
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2870	by (simp add: fps_divide_def fps_mult_nth divide_inverse fps_inverse_def)
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2871	have th0: "r k ((a/b)$0) ^ k = (a/b)$0"
60867 86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	2872	by (simp add: \<open>?lhs\<close> power_divide ra0 rb0)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2873	from a0 b0 ra0' rb0' kp \<open>?lhs\<close>
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2874	have th1: "r k ((a / b) $ 0) = (fps_radical r k a / fps_radical r k b) $ 0"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2875	by (simp add: fps_divide_unit fps_mult_nth fps_inverse_def divide_inverse)
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2876	from a0 b0 ra0' rb0' kp have ab0': "(a / b) $ 0 \<noteq> 0"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2877	by (simp add: fps_divide_unit fps_mult_nth fps_inverse_def nonzero_imp_inverse_nonzero)
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2878	note tha[simp] = iffD1[OF power_radical[where r=r and k=h], OF a0 ra0[unfolded k], unfolded k[symmetric]]
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2879	note thb[simp] = iffD1[OF power_radical[where r=r and k=h], OF b0 rb0[unfolded k], unfolded k[symmetric]]
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2880	from b0 rb0' have th2: "(?r a / ?r b)^k = a/b"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	2881	by (simp add: fps_divide_unit power_mult_distrib fps_inverse_power[symmetric])
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	2882
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	2883	from iffD1[OF radical_unique[where r=r and a="?r a / ?r b" and b="a/b" and k=h], symmetric, unfolded k[symmetric], OF th0 th1 ab0' th2]
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2884	show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2885	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2886	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2887
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2888	lemma radical_inverse:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	2889	fixes a :: "'a::field_char_0 fps"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2890	assumes k: "k > 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2891	and ra0: "r k (a $ 0) ^ k = a $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2892	and r1: "(r k 1)^k = 1"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2893	and a0: "a$0 \<noteq> 0"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2894	shows "r k (inverse (a $ 0)) = r k 1 / (r k (a $ 0)) \<longleftrightarrow>
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	2895	fps_radical r k (inverse a) = fps_radical r k 1 / fps_radical r k a"
31073 4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2896	using radical_divide[where k=k and r=r and a=1 and b=a, OF k ] ra0 r1 a0
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2897	by (simp add: divide_inverse fps_divide_def)
4b44c4d08aa6 Generalized distributivity theorems of radicals over multiplication, division and inverses chaieb parents: 31021 diff changeset	2898
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2899
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2900	subsection \<open>Derivative of composition\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2901
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	2902	lemma fps_compose_deriv:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2903	fixes a :: "'a::idom fps"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2904	assumes b0: "b$0 = 0"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2905	shows "fps_deriv (a oo b) = ((fps_deriv a) oo b) * fps_deriv b"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2906	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2907	have "(fps_deriv (a oo b))$n = (((fps_deriv a) oo b) * (fps_deriv b)) $n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2908	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2909	have "(fps_deriv (a oo b))$n = setsum (\<lambda>i. a $ i * (fps_deriv (b^i))$n) {0.. Suc n}"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	2910	by (simp add: fps_compose_def field_simps setsum_right_distrib del: of_nat_Suc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2911	also have "\<dots> = setsum (\<lambda>i. a$i * ((fps_const (of_nat i)) * (fps_deriv b * (b^(i - 1))))$n) {0.. Suc n}"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	2912	by (simp add: field_simps fps_deriv_power del: fps_mult_left_const_nth of_nat_Suc)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2913	also have "\<dots> = setsum (\<lambda>i. of_nat i * a$i * (((b^(i - 1)) * fps_deriv b))$n) {0.. Suc n}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2914	unfolding fps_mult_left_const_nth by (simp add: field_simps)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2915	also have "\<dots> = setsum (\<lambda>i. of_nat i * a$i * (setsum (\<lambda>j. (b^ (i - 1))$j * (fps_deriv b)$(n - j)) {0..n})) {0.. Suc n}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2916	unfolding fps_mult_nth ..
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2917	also have "\<dots> = setsum (\<lambda>i. of_nat i * a$i * (setsum (\<lambda>j. (b^ (i - 1))$j * (fps_deriv b)$(n - j)) {0..n})) {1.. Suc n}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2918	apply (rule setsum.mono_neutral_right)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2919	apply (auto simp add: mult_delta_left setsum.delta not_le)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2920	done
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2921	also have "\<dots> = setsum (\<lambda>i. of_nat (i + 1) * a$(i+1) * (setsum (\<lambda>j. (b^ i)$j * of_nat (n - j + 1) * b$(n - j + 1)) {0..n})) {0.. n}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2922	unfolding fps_deriv_nth
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	2923	by (rule setsum.reindex_cong [of Suc]) (auto simp add: mult.assoc)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2924	finally have th0: "(fps_deriv (a oo b))$n =
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2925	setsum (\<lambda>i. of_nat (i + 1) * a$(i+1) * (setsum (\<lambda>j. (b^ i)$j * of_nat (n - j + 1) * b$(n - j + 1)) {0..n})) {0.. n}" .
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2926
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2927	have "(((fps_deriv a) oo b) * (fps_deriv b))$n = setsum (\<lambda>i. (fps_deriv b)$ (n - i) * ((fps_deriv a) oo b)$i) {0..n}"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	2928	unfolding fps_mult_nth by (simp add: ac_simps)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2929	also have "\<dots> = setsum (\<lambda>i. setsum (\<lambda>j. of_nat (n - i +1) * b$(n - i + 1) * of_nat (j + 1) * a$(j+1) * (b^j)$i) {0..n}) {0..n}"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	2930	unfolding fps_deriv_nth fps_compose_nth setsum_right_distrib mult.assoc
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2931	apply (rule setsum.cong)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2932	apply (rule refl)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2933	apply (rule setsum.mono_neutral_left)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2934	apply (simp_all add: subset_eq)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2935	apply clarify
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2936	apply (subgoal_tac "b^i$x = 0")
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2937	apply simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2938	apply (rule startsby_zero_power_prefix[OF b0, rule_format])
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2939	apply simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2940	done
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2941	also have "\<dots> = setsum (\<lambda>i. of_nat (i + 1) * a$(i+1) * (setsum (\<lambda>j. (b^ i)$j * of_nat (n - j + 1) * b$(n - j + 1)) {0..n})) {0.. n}"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2942	unfolding setsum_right_distrib
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2943	apply (subst setsum.commute)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2944	apply (rule setsum.cong, rule refl)+
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2945	apply simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2946	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2947	finally show ?thesis
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2948	unfolding th0 by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2949	qed
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2950	then show ?thesis by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2951	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2952
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2953	lemma fps_mult_X_plus_1_nth:
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2954	"((1+X)*a) $n = (if n = 0 then (a$n :: 'a::comm_ring_1) else a$n + a$(n - 1))"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2955	proof (cases n)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2956	case 0
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2957	then show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2958	by (simp add: fps_mult_nth)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2959	next
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2960	case (Suc m)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2961	have "((1 + X)a) $ n = setsum (\<lambda>i. (1 + X) $ i a $ (n - i)) {0..n}"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2962	by (simp add: fps_mult_nth)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2963	also have "\<dots> = setsum (\<lambda>i. (1+X)$i * a$(n-i)) {0.. 1}"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	2964	unfolding Suc by (rule setsum.mono_neutral_right) auto
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2965	also have "\<dots> = (if n = 0 then (a$n :: 'a::comm_ring_1) else a$n + a$(n - 1))"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2966	by (simp add: Suc)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2967	finally show ?thesis .
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2968	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2969
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2970
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	2971	subsection \<open>Finite FPS (i.e. polynomials) and X\<close>
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2972
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2973	lemma fps_poly_sum_X:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2974	assumes "\<forall>i > n. a$i = (0::'a::comm_ring_1)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2975	shows "a = setsum (\<lambda>i. fps_const (a$i) * X^i) {0..n}" (is "a = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2976	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2977	have "a$i = ?r$i" for i
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2978	unfolding fps_setsum_nth fps_mult_left_const_nth X_power_nth
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2979	by (simp add: mult_delta_right setsum.delta' assms)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2980	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2981	unfolding fps_eq_iff by blast
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2982	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2983
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2984
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	2985	subsection \<open>Compositional inverses\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2986
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	2987	fun compinv :: "'a fps \<Rightarrow> nat \<Rightarrow> 'a::field"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2988	where
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2989	"compinv a 0 = X$0"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2990	\| "compinv a (Suc n) =
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2991	(X$ Suc n - setsum (\<lambda>i. (compinv a i) * (a^i)$Suc n) {0 .. n}) / (a$1) ^ Suc n"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2992
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2993	definition "fps_inv a = Abs_fps (compinv a)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2994
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2995	lemma fps_inv:
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2996	assumes a0: "a$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2997	and a1: "a$1 \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	2998	shows "fps_inv a oo a = X"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	2999	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3000	let ?i = "fps_inv a oo a"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3001	have "?i $n = X$n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3002	proof (induct n rule: nat_less_induct)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3003	fix n
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3004	assume h: "\<forall>m<n. ?i$m = X$m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3005	show "?i $ n = X$n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3006	proof (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3007	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3008	then show ?thesis using a0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3009	by (simp add: fps_compose_nth fps_inv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3010	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3011	case (Suc n1)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3012	have "?i $ n = setsum (\<lambda>i. (fps_inv a $ i) * (a^i)$n) {0 .. n1} + fps_inv a $ Suc n1 * (a $ 1)^ Suc n1"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3013	by (simp only: fps_compose_nth) (simp add: Suc startsby_zero_power_nth_same [OF a0] del: power_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3014	also have "\<dots> = setsum (\<lambda>i. (fps_inv a $ i) * (a^i)$n) {0 .. n1} +
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3015	(X$ Suc n1 - setsum (\<lambda>i. (fps_inv a $ i) * (a^i)$n) {0 .. n1})"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3016	using a0 a1 Suc by (simp add: fps_inv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3017	also have "\<dots> = X$n" using Suc by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3018	finally show ?thesis .
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3019	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3020	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3021	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3022	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3023	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3024
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3025
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3026	fun gcompinv :: "'a fps \<Rightarrow> 'a fps \<Rightarrow> nat \<Rightarrow> 'a::field"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3027	where
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3028	"gcompinv b a 0 = b$0"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3029	\| "gcompinv b a (Suc n) =
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3030	(b$ Suc n - setsum (\<lambda>i. (gcompinv b a i) * (a^i)$Suc n) {0 .. n}) / (a$1) ^ Suc n"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3031
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3032	definition "fps_ginv b a = Abs_fps (gcompinv b a)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3033
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3034	lemma fps_ginv:
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3035	assumes a0: "a$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3036	and a1: "a$1 \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3037	shows "fps_ginv b a oo a = b"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3038	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3039	let ?i = "fps_ginv b a oo a"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3040	have "?i $n = b$n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3041	proof (induct n rule: nat_less_induct)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3042	fix n
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3043	assume h: "\<forall>m<n. ?i$m = b$m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3044	show "?i $ n = b$n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3045	proof (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3046	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3047	then show ?thesis using a0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3048	by (simp add: fps_compose_nth fps_ginv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3049	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3050	case (Suc n1)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3051	have "?i $ n = setsum (\<lambda>i. (fps_ginv b a $ i) * (a^i)$n) {0 .. n1} + fps_ginv b a $ Suc n1 * (a $ 1)^ Suc n1"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3052	by (simp only: fps_compose_nth) (simp add: Suc startsby_zero_power_nth_same [OF a0] del: power_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3053	also have "\<dots> = setsum (\<lambda>i. (fps_ginv b a $ i) * (a^i)$n) {0 .. n1} +
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3054	(b$ Suc n1 - setsum (\<lambda>i. (fps_ginv b a $ i) * (a^i)$n) {0 .. n1})"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3055	using a0 a1 Suc by (simp add: fps_ginv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3056	also have "\<dots> = b$n" using Suc by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3057	finally show ?thesis .
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3058	qed
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3059	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3060	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3061	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3062	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3063
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3064	lemma fps_inv_ginv: "fps_inv = fps_ginv X"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3065	apply (auto simp add: fun_eq_iff fps_eq_iff fps_inv_def fps_ginv_def)
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	3066	apply (induct_tac n rule: nat_less_induct)
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	3067	apply auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3068	apply (case_tac na)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3069	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3070	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3071	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3072
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3073	lemma fps_compose_1[simp]: "1 oo a = 1"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3074	by (simp add: fps_eq_iff fps_compose_nth mult_delta_left setsum.delta)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3075
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3076	lemma fps_compose_0[simp]: "0 oo a = 0"
29913 89eadbe71e97 add mult_delta lemmas; simplify some proofs huffman parents: 29912 diff changeset	3077	by (simp add: fps_eq_iff fps_compose_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3078
60867 86e7560e07d0 slight cleanup of lemmas haftmann parents: 60679 diff changeset	3079	lemma fps_compose_0_right[simp]: "a oo 0 = fps_const (a $ 0)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3080	by (auto simp add: fps_eq_iff fps_compose_nth power_0_left setsum.neutral)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3081
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3082	lemma fps_compose_add_distrib: "(a + b) oo c = (a oo c) + (b oo c)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3083	by (simp add: fps_eq_iff fps_compose_nth field_simps setsum.distrib)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3084
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3085	lemma fps_compose_setsum_distrib: "(setsum f S) oo a = setsum (\<lambda>i. f i oo a) S"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3086	proof (cases "finite S")
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3087	case True
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3088	show ?thesis
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3089	proof (rule finite_induct[OF True])
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3090	show "setsum f {} oo a = (\<Sum>i\<in>{}. f i oo a)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3091	by simp
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3092	next
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3093	fix x F
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3094	assume fF: "finite F"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3095	and xF: "x \<notin> F"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3096	and h: "setsum f F oo a = setsum (\<lambda>i. f i oo a) F"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3097	show "setsum f (insert x F) oo a = setsum (\<lambda>i. f i oo a) (insert x F)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3098	using fF xF h by (simp add: fps_compose_add_distrib)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3099	qed
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3100	next
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3101	case False
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3102	then show ?thesis by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3103	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3104
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3105	lemma convolution_eq:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3106	"setsum (\<lambda>i. a (i :: nat) * b (n - i)) {0 .. n} =
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3107	setsum (\<lambda>(i,j). a i * b j) {(i,j). i \<le> n \<and> j \<le> n \<and> i + j = n}"
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3108	by (rule setsum.reindex_bij_witness[where i=fst and j="\<lambda>i. (i, n - i)"]) auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3109
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3110	lemma product_composition_lemma:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3111	assumes c0: "c$0 = (0::'a::idom)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3112	and d0: "d$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3113	shows "((a oo c) * (b oo d))$n =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3114	setsum (\<lambda>(k,m). a$k * b$m * (c^k * d^m) $ n) {(k,m). k + m \<le> n}" (is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3115	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3116	let ?S = "{(k::nat, m::nat). k + m \<le> n}"
61943 7fba644ed827 discontinued ASCII replacement syntax <>; wenzelm* parents: 61804 diff changeset	3117	have s: "?S \<subseteq> {0..n} \<times> {0..n}" by (auto simp add: subset_eq)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3118	have f: "finite {(k::nat, m::nat). k + m \<le> n}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3119	apply (rule finite_subset[OF s])
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3120	apply auto
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3121	done
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3122	have "?r = setsum (\<lambda>i. setsum (\<lambda>(k,m). a$k * (c^k)$i * b$m * (d^m) $ (n - i)) {(k,m). k + m \<le> n}) {0..n}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3123	apply (simp add: fps_mult_nth setsum_right_distrib)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3124	apply (subst setsum.commute)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3125	apply (rule setsum.cong)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3126	apply (auto simp add: field_simps)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3127	done
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3128	also have "\<dots> = ?l"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3129	apply (simp add: fps_mult_nth fps_compose_nth setsum_product)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3130	apply (rule setsum.cong)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3131	apply (rule refl)
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3132	apply (simp add: setsum.cartesian_product mult.assoc)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3133	apply (rule setsum.mono_neutral_right[OF f])
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3134	apply (simp add: subset_eq)
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3135	apply presburger
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3136	apply clarsimp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3137	apply (rule ccontr)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3138	apply (clarsimp simp add: not_le)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3139	apply (case_tac "x < aa")
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3140	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3141	apply (frule_tac startsby_zero_power_prefix[rule_format, OF c0])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3142	apply blast
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3143	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3144	apply (frule_tac startsby_zero_power_prefix[rule_format, OF d0])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3145	apply blast
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3146	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3147	finally show ?thesis by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3148	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3149
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3150	lemma product_composition_lemma':
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3151	assumes c0: "c$0 = (0::'a::idom)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3152	and d0: "d$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3153	shows "((a oo c) * (b oo d))$n =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3154	setsum (\<lambda>k. setsum (\<lambda>m. a$k * b$m * (c^k * d^m) $ n) {0..n}) {0..n}" (is "?l = ?r")
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3155	unfolding product_composition_lemma[OF c0 d0]
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3156	unfolding setsum.cartesian_product
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3157	apply (rule setsum.mono_neutral_left)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3158	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3159	apply (clarsimp simp add: subset_eq)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3160	apply clarsimp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3161	apply (rule ccontr)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3162	apply (subgoal_tac "(c^aa * d^ba) $ n = 0")
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3163	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3164	unfolding fps_mult_nth
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3165	apply (rule setsum.neutral)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3166	apply (clarsimp simp add: not_le)
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 51107 diff changeset	3167	apply (case_tac "x < aa")
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3168	apply (rule startsby_zero_power_prefix[OF c0, rule_format])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3169	apply simp
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 51107 diff changeset	3170	apply (subgoal_tac "n - x < ba")
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3171	apply (frule_tac k = "ba" in startsby_zero_power_prefix[OF d0, rule_format])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3172	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3173	apply arith
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3174	done
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3175
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3176
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3177	lemma setsum_pair_less_iff:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3178	"setsum (\<lambda>((k::nat),m). a k * b m * c (k + m)) {(k,m). k + m \<le> n} =
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3179	setsum (\<lambda>s. setsum (\<lambda>i. a i * b (s - i) * c s) {0..s}) {0..n}"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3180	(is "?l = ?r")
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3181	proof -
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3182	let ?KM = "{(k,m). k + m \<le> n}"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3183	let ?f = "\<lambda>s. UNION {(0::nat)..s} (\<lambda>i. {(i,s - i)})"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3184	have th0: "?KM = UNION {0..n} ?f"
62343 24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM haftmann parents: 62102 diff changeset	3185	by auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3186	show "?l = ?r "
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3187	unfolding th0
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3188	apply (subst setsum.UNION_disjoint)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3189	apply auto
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3190	apply (subst setsum.UNION_disjoint)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3191	apply auto
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3192	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3193	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3194
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3195	lemma fps_compose_mult_distrib_lemma:
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3196	assumes c0: "c$0 = (0::'a::idom)"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3197	shows "((a oo c) * (b oo c))$n = setsum (\<lambda>s. setsum (\<lambda>i. a$i * b$(s - i) * (c^s) $ n) {0..s}) {0..n}"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3198	unfolding product_composition_lemma[OF c0 c0] power_add[symmetric]
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3199	unfolding setsum_pair_less_iff[where a = "\<lambda>k. a$k" and b="\<lambda>m. b$m" and c="\<lambda>s. (c ^ s)$n" and n = n] ..
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3200
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3201	lemma fps_compose_mult_distrib:
54489 03ff4d1e6784 eliminiated neg_numeral in favour of - (numeral _) haftmann parents: 54452 diff changeset	3202	assumes c0: "c $ 0 = (0::'a::idom)"
03ff4d1e6784 eliminiated neg_numeral in favour of - (numeral _) haftmann parents: 54452 diff changeset	3203	shows "(a * b) oo c = (a oo c) * (b oo c)"
03ff4d1e6784 eliminiated neg_numeral in favour of - (numeral _) haftmann parents: 54452 diff changeset	3204	apply (simp add: fps_eq_iff fps_compose_mult_distrib_lemma [OF c0])
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3205	apply (simp add: fps_compose_nth fps_mult_nth setsum_left_distrib)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3206	done
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3207
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3208	lemma fps_compose_setprod_distrib:
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3209	assumes c0: "c$0 = (0::'a::idom)"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3210	shows "setprod a S oo c = setprod (\<lambda>k. a k oo c) S"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3211	apply (cases "finite S")
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3212	apply simp_all
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3213	apply (induct S rule: finite_induct)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3214	apply simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3215	apply (simp add: fps_compose_mult_distrib[OF c0])
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3216	done
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3217
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3218	lemma fps_compose_power:
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3219	assumes c0: "c$0 = (0::'a::idom)"
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3220	shows "(a oo c)^n = a^n oo c"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3221	proof (cases n)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3222	case 0
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3223	then show ?thesis by simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3224	next
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3225	case (Suc m)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3226	have th0: "a^n = setprod (\<lambda>k. a) {0..m}" "(a oo c) ^ n = setprod (\<lambda>k. a oo c) {0..m}"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3227	by (simp_all add: setprod_constant Suc)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3228	then show ?thesis
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3229	by (simp add: fps_compose_setprod_distrib[OF c0])
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3230	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3231
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3232	lemma fps_compose_uminus: "- (a::'a::ring_1 fps) oo c = - (a oo c)"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3233	by (simp add: fps_eq_iff fps_compose_nth field_simps setsum_negf[symmetric])
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3234
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3235	lemma fps_compose_sub_distrib: "(a - b) oo (c::'a::ring_1 fps) = (a oo c) - (b oo c)"
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53374 diff changeset	3236	using fps_compose_add_distrib [of a "- b" c] by (simp add: fps_compose_uminus)
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3237
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3238	lemma X_fps_compose: "X oo a = Abs_fps (\<lambda>n. if n = 0 then (0::'a::comm_ring_1) else a$n)"
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3239	by (simp add: fps_eq_iff fps_compose_nth mult_delta_left setsum.delta)
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3240
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3241	lemma fps_inverse_compose:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3242	assumes b0: "(b$0 :: 'a::field) = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3243	and a0: "a$0 \<noteq> 0"
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3244	shows "inverse a oo b = inverse (a oo b)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3245	proof -
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3246	let ?ia = "inverse a"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3247	let ?ab = "a oo b"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3248	let ?iab = "inverse ?ab"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3249
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3250	from a0 have ia0: "?ia $ 0 \<noteq> 0" by simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3251	from a0 have ab0: "?ab $ 0 \<noteq> 0" by (simp add: fps_compose_def)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3252	have "(?ia oo b) * (a oo b) = 1"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3253	unfolding fps_compose_mult_distrib[OF b0, symmetric]
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3254	unfolding inverse_mult_eq_1[OF a0]
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3255	fps_compose_1 ..
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3256
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3257	then have "(?ia oo b) * (a oo b) * ?iab = 1 * ?iab" by simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3258	then have "(?ia oo b) * (?iab * (a oo b)) = ?iab" by simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3259	then show ?thesis unfolding inverse_mult_eq_1[OF ab0] by simp
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3260	qed
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3261
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3262	lemma fps_divide_compose:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3263	assumes c0: "(c$0 :: 'a::field) = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3264	and b0: "b$0 \<noteq> 0"
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3265	shows "(a/b) oo c = (a oo c) / (b oo c)"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3266	using b0 c0 by (simp add: fps_divide_unit fps_inverse_compose fps_compose_mult_distrib)
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3267
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3268	lemma gp:
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3269	assumes a0: "a$0 = (0::'a::field)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3270	shows "(Abs_fps (\<lambda>n. 1)) oo a = 1/(1 - a)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3271	(is "?one oo a = _")
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3272	proof -
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3273	have o0: "?one $ 0 \<noteq> 0" by simp
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3274	have th0: "(1 - X) $ 0 \<noteq> (0::'a)" by simp
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3275	from fps_inverse_gp[where ?'a = 'a]
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3276	have "inverse ?one = 1 - X" by (simp add: fps_eq_iff)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3277	then have "inverse (inverse ?one) = inverse (1 - X)" by simp
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3278	then have th: "?one = 1/(1 - X)" unfolding fps_inverse_idempotent[OF o0]
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3279	by (simp add: fps_divide_def)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3280	show ?thesis
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3281	unfolding th
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3282	unfolding fps_divide_compose[OF a0 th0]
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3283	fps_compose_1 fps_compose_sub_distrib X_fps_compose_startby0[OF a0] ..
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3284	qed
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3285
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3286	lemma fps_const_power [simp]: "fps_const (c::'a::ring_1) ^ n = fps_const (c^n)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	3287	by (induct n) auto
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3288
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3289	lemma fps_compose_radical:
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3290	assumes b0: "b$0 = (0::'a::field_char_0)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3291	and ra0: "r (Suc k) (a$0) ^ Suc k = a$0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3292	and a0: "a$0 \<noteq> 0"
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3293	shows "fps_radical r (Suc k) a oo b = fps_radical r (Suc k) (a oo b)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3294	proof -
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3295	let ?r = "fps_radical r (Suc k)"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3296	let ?ab = "a oo b"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3297	have ab0: "?ab $ 0 = a$0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3298	by (simp add: fps_compose_def)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3299	from ab0 a0 ra0 have rab0: "?ab $ 0 \<noteq> 0" "r (Suc k) (?ab $ 0) ^ Suc k = ?ab $ 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3300	by simp_all
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3301	have th00: "r (Suc k) ((a oo b) $ 0) = (fps_radical r (Suc k) a oo b) $ 0"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3302	by (simp add: ab0 fps_compose_def)
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3303	have th0: "(?r a oo b) ^ (Suc k) = a oo b"
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3304	unfolding fps_compose_power[OF b0]
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3305	unfolding iffD1[OF power_radical[of a r k], OF a0 ra0] ..
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3306	from iffD1[OF radical_unique[where r=r and k=k and b= ?ab and a = "?r a oo b", OF rab0(2) th00 rab0(1)], OF th0]
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3307	show ?thesis .
31199 10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3308	qed
10d413b08fa7 FPS composition distributes over inverses, division and arbitrary nth roots. General geometric series theorem chaieb parents: 31148 diff changeset	3309
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3310	lemma fps_const_mult_apply_left: "fps_const c * (a oo b) = (fps_const c * a) oo b"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3311	by (simp add: fps_eq_iff fps_compose_nth setsum_right_distrib mult.assoc)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3312
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3313	lemma fps_const_mult_apply_right:
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3314	"(a oo b) * fps_const (c::'a::comm_semiring_1) = (fps_const c * a) oo b"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3315	by (auto simp add: fps_const_mult_apply_left mult.commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3316
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3317	lemma fps_compose_assoc:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3318	assumes c0: "c$0 = (0::'a::idom)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3319	and b0: "b$0 = 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3320	shows "a oo (b oo c) = a oo b oo c" (is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3321	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3322	have "?l$n = ?r$n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3323	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3324	have "?l$n = (setsum (\<lambda>i. (fps_const (a$i) * b^i) oo c) {0..n})$n"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3325	by (simp add: fps_compose_nth fps_compose_power[OF c0] fps_const_mult_apply_left
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3326	setsum_right_distrib mult.assoc fps_setsum_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3327	also have "\<dots> = ((setsum (\<lambda>i. fps_const (a$i) * b^i) {0..n}) oo c)$n"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3328	by (simp add: fps_compose_setsum_distrib)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3329	also have "\<dots> = ?r$n"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3330	apply (simp add: fps_compose_nth fps_setsum_nth setsum_left_distrib mult.assoc)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3331	apply (rule setsum.cong)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3332	apply (rule refl)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3333	apply (rule setsum.mono_neutral_right)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3334	apply (auto simp add: not_le)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3335	apply (erule startsby_zero_power_prefix[OF b0, rule_format])
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3336	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3337	finally show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3338	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3339	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3340	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3341	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3342
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3343
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3344	lemma fps_X_power_compose:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3345	assumes a0: "a$0=0"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3346	shows "X^k oo a = (a::'a::idom fps)^k"
8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3347	(is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3348	proof (cases k)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3349	case 0
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3350	then show ?thesis by simp
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3351	next
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3352	case (Suc h)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3353	have "?l $ n = ?r $n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3354	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3355	consider "k > n" \| "k \<le> n" by arith
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3356	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3357	proof cases
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3358	case 1
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3359	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3360	using a0 startsby_zero_power_prefix[OF a0] Suc
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3361	by (simp add: fps_compose_nth del: power_Suc)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3362	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3363	case 2
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3364	then show ?thesis
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3365	by (simp add: fps_compose_nth mult_delta_left setsum.delta)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3366	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3367	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3368	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3369	unfolding fps_eq_iff by blast
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3370	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3371
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3372	lemma fps_inv_right:
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3373	assumes a0: "a$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3374	and a1: "a$1 \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3375	shows "a oo fps_inv a = X"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3376	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3377	let ?ia = "fps_inv a"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3378	let ?iaa = "a oo fps_inv a"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3379	have th0: "?ia $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3380	by (simp add: fps_inv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3381	have th1: "?iaa $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3382	using a0 a1 by (simp add: fps_inv_def fps_compose_nth)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3383	have th2: "X$0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3384	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3385	from fps_inv[OF a0 a1] have "a oo (fps_inv a oo a) = a oo X"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3386	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3387	then have "(a oo fps_inv a) oo a = X oo a"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3388	by (simp add: fps_compose_assoc[OF a0 th0] X_fps_compose_startby0[OF a0])
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3389	with fps_compose_inj_right[OF a0 a1] show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3390	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3391	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3392
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3393	lemma fps_inv_deriv:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3394	assumes a0: "a$0 = (0::'a::field)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3395	and a1: "a$1 \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3396	shows "fps_deriv (fps_inv a) = inverse (fps_deriv a oo fps_inv a)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3397	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3398	let ?ia = "fps_inv a"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3399	let ?d = "fps_deriv a oo ?ia"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3400	let ?dia = "fps_deriv ?ia"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3401	have ia0: "?ia$0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3402	by (simp add: fps_inv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3403	have th0: "?d$0 \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3404	using a1 by (simp add: fps_compose_nth)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3405	from fps_inv_right[OF a0 a1] have "?d * ?dia = 1"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3406	by (simp add: fps_compose_deriv[OF ia0, of a, symmetric] )
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3407	then have "inverse ?d * ?d * ?dia = inverse ?d * 1"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3408	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3409	with inverse_mult_eq_1 [OF th0] show "?dia = inverse ?d"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3410	by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3411	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3412
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3413	lemma fps_inv_idempotent:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3414	assumes a0: "a$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3415	and a1: "a$1 \<noteq> 0"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3416	shows "fps_inv (fps_inv a) = a"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3417	proof -
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3418	let ?r = "fps_inv"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3419	have ra0: "?r a $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3420	by (simp add: fps_inv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3421	from a1 have ra1: "?r a $ 1 \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3422	by (simp add: fps_inv_def field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3423	have X0: "X$0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3424	by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3425	from fps_inv[OF ra0 ra1] have "?r (?r a) oo ?r a = X" .
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3426	then have "?r (?r a) oo ?r a oo a = X oo a"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3427	by simp
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3428	then have "?r (?r a) oo (?r a oo a) = a"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3429	unfolding X_fps_compose_startby0[OF a0]
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3430	unfolding fps_compose_assoc[OF a0 ra0, symmetric] .
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3431	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3432	unfolding fps_inv[OF a0 a1] by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3433	qed
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3434
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3435	lemma fps_ginv_ginv:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3436	assumes a0: "a$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3437	and a1: "a$1 \<noteq> 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3438	and c0: "c$0 = 0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3439	and c1: "c$1 \<noteq> 0"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3440	shows "fps_ginv b (fps_ginv c a) = b oo a oo fps_inv c"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3441	proof -
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3442	let ?r = "fps_ginv"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3443	from c0 have rca0: "?r c a $0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3444	by (simp add: fps_ginv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3445	from a1 c1 have rca1: "?r c a $ 1 \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3446	by (simp add: fps_ginv_def field_simps)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3447	from fps_ginv[OF rca0 rca1]
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3448	have "?r b (?r c a) oo ?r c a = b" .
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3449	then have "?r b (?r c a) oo ?r c a oo a = b oo a"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3450	by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3451	then have "?r b (?r c a) oo (?r c a oo a) = b oo a"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3452	apply (subst fps_compose_assoc)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3453	using a0 c0
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3454	apply (auto simp add: fps_ginv_def)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3455	done
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3456	then have "?r b (?r c a) oo c = b oo a"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3457	unfolding fps_ginv[OF a0 a1] .
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3458	then have "?r b (?r c a) oo c oo fps_inv c= b oo a oo fps_inv c"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3459	by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3460	then have "?r b (?r c a) oo (c oo fps_inv c) = b oo a oo fps_inv c"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3461	apply (subst fps_compose_assoc)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3462	using a0 c0
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3463	apply (auto simp add: fps_inv_def)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3464	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3465	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3466	unfolding fps_inv_right[OF c0 c1] by simp
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3467	qed
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3468
32410 624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3469	lemma fps_ginv_deriv:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3470	assumes a0:"a$0 = (0::'a::field)"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3471	and a1: "a$1 \<noteq> 0"
32410 624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3472	shows "fps_deriv (fps_ginv b a) = (fps_deriv b / fps_deriv a) oo fps_ginv X a"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3473	proof -
32410 624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3474	let ?ia = "fps_ginv b a"
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3475	let ?iXa = "fps_ginv X a"
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3476	let ?d = "fps_deriv"
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3477	let ?dia = "?d ?ia"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3478	have iXa0: "?iXa $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3479	by (simp add: fps_ginv_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3480	have da0: "?d a $ 0 \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3481	using a1 by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3482	from fps_ginv[OF a0 a1, of b] have "?d (?ia oo a) = fps_deriv b"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3483	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3484	then have "(?d ?ia oo a) * ?d a = ?d b"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3485	unfolding fps_compose_deriv[OF a0] .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3486	then have "(?d ?ia oo a) * ?d a * inverse (?d a) = ?d b * inverse (?d a)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3487	by simp
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3488	with a1 have "(?d ?ia oo a) * (inverse (?d a) * ?d a) = ?d b / ?d a"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3489	by (simp add: fps_divide_unit)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3490	then have "(?d ?ia oo a) oo ?iXa = (?d b / ?d a) oo ?iXa"
32410 624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3491	unfolding inverse_mult_eq_1[OF da0] by simp
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3492	then have "?d ?ia oo (a oo ?iXa) = (?d b / ?d a) oo ?iXa"
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3493	unfolding fps_compose_assoc[OF iXa0 a0] .
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3494	then show ?thesis unfolding fps_inv_ginv[symmetric]
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3495	unfolding fps_inv_right[OF a0 a1] by simp
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3496	qed
624bd2ea7c1e Derivative of general reverses chaieb parents: 31075 diff changeset	3497
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3498
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3499	subsection \<open>Elementary series\<close>
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3500
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3501	subsubsection \<open>Exponential series\<close>
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3502
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3503	definition "E x = Abs_fps (\<lambda>n. x^n / of_nat (fact n))"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3504
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3505	lemma E_deriv[simp]: "fps_deriv (E a) = fps_const (a::'a::field_char_0) * E a" (is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3506	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3507	have "?l$n = ?r $ n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3508	apply (auto simp add: E_def field_simps power_Suc[symmetric]
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3509	simp del: fact.simps of_nat_Suc power_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3510	apply (simp add: of_nat_mult field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3511	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3512	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3513	by (simp add: fps_eq_iff)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3514	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3515
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3516	lemma E_unique_ODE:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3517	"fps_deriv a = fps_const c * a \<longleftrightarrow> a = fps_const (a$0) * E (c::'a::field_char_0)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3518	(is "?lhs \<longleftrightarrow> ?rhs")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3519	proof
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3520	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3521	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3522	from that have th: "\<And>n. a $ Suc n = c * a$n / of_nat (Suc n)"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3523	by (simp add: fps_deriv_def fps_eq_iff field_simps del: of_nat_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3524	have th': "a$n = a$0 * c ^ n/ (fact n)" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3525	proof (induct n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3526	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3527	then show ?case by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3528	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3529	case Suc
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3530	then show ?case
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3531	unfolding th
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3532	using fact_gt_zero
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3533	apply (simp add: field_simps del: of_nat_Suc fact_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3534	apply simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3535	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3536	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3537	show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3538	by (auto simp add: fps_eq_iff fps_const_mult_left E_def intro: th')
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3539	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3540	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3541	using that by (metis E_deriv fps_deriv_mult_const_left mult.left_commute)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3542	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3543
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3544	lemma E_add_mult: "E (a + b) = E (a::'a::field_char_0) * E b" (is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3545	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3546	have "fps_deriv ?r = fps_const (a + b) * ?r"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3547	by (simp add: fps_const_add[symmetric] field_simps del: fps_const_add)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3548	then have "?r = ?l"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3549	by (simp only: E_unique_ODE) (simp add: fps_mult_nth E_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3550	then show ?thesis ..
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3551	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3552
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3553	lemma E_nth[simp]: "E a $ n = a^n / of_nat (fact n)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3554	by (simp add: E_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3555
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3556	lemma E0[simp]: "E (0::'a::field) = 1"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3557	by (simp add: fps_eq_iff power_0_left)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3558
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3559	lemma E_neg: "E (- a) = inverse (E (a::'a::field_char_0))"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3560	proof -
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3561	from E_add_mult[of a "- a"] have th0: "E a * E (- a) = 1" by simp
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3562	from fps_inverse_unique[OF th0] show ?thesis by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3563	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3564
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3565	lemma E_nth_deriv[simp]: "fps_nth_deriv n (E (a::'a::field_char_0)) = (fps_const a)^n * (E a)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	3566	by (induct n) auto
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3567
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3568	lemma X_compose_E[simp]: "X oo E (a::'a::field) = E a - 1"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3569	by (simp add: fps_eq_iff X_fps_compose)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3570
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	3571	lemma LE_compose:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3572	assumes a: "a \<noteq> 0"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3573	shows "fps_inv (E a - 1) oo (E a - 1) = X"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3574	and "(E a - 1) oo fps_inv (E a - 1) = X"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3575	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3576	let ?b = "E a - 1"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3577	have b0: "?b $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3578	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3579	have b1: "?b $ 1 \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3580	by (simp add: a)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3581	from fps_inv[OF b0 b1] show "fps_inv (E a - 1) oo (E a - 1) = X" .
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3582	from fps_inv_right[OF b0 b1] show "(E a - 1) oo fps_inv (E a - 1) = X" .
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3583	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3584
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3585	lemma E_power_mult: "(E (c::'a::field_char_0))^n = E (of_nat n * c)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	3586	by (induct n) (auto simp add: field_simps E_add_mult)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3587
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3588	lemma radical_E:
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3589	assumes r: "r (Suc k) 1 = 1"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3590	shows "fps_radical r (Suc k) (E (c::'a::field_char_0)) = E (c / of_nat (Suc k))"
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3591	proof -
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3592	let ?ck = "(c / of_nat (Suc k))"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3593	let ?r = "fps_radical r (Suc k)"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3594	have eq0[simp]: "?ck * of_nat (Suc k) = c" "of_nat (Suc k) * ?ck = c"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3595	by (simp_all del: of_nat_Suc)
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3596	have th0: "E ?ck ^ (Suc k) = E c" unfolding E_power_mult eq0 ..
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3597	have th: "r (Suc k) (E c $0) ^ Suc k = E c $ 0"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3598	"r (Suc k) (E c $ 0) = E ?ck $ 0" "E c $ 0 \<noteq> 0" using r by simp_all
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3599	from th0 radical_unique[where r=r and k=k, OF th] show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3600	by auto
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3601	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3602
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	3603	lemma Ec_E1_eq: "E (1::'a::field_char_0) oo (fps_const c * X) = E c"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3604	apply (auto simp add: fps_eq_iff E_def fps_compose_def power_mult_distrib)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3605	apply (simp add: cond_value_iff cond_application_beta setsum.delta' cong del: if_weak_cong)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	3606	done
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3607
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3608
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3609	subsubsection \<open>Logarithmic series\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3610
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3611	lemma Abs_fps_if_0:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3612	"Abs_fps (\<lambda>n. if n = 0 then (v::'a::ring_1) else f n) =
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3613	fps_const v + X * Abs_fps (\<lambda>n. f (Suc n))"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3614	by (auto simp add: fps_eq_iff)
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3615
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	3616	definition L :: "'a::field_char_0 \<Rightarrow> 'a fps"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	3617	where "L c = fps_const (1/c) * Abs_fps (\<lambda>n. if n = 0 then 0 else (- 1) ^ (n - 1) / of_nat n)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3618
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3619	lemma fps_deriv_L: "fps_deriv (L c) = fps_const (1/c) * inverse (1 + X)"
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	3620	unfolding fps_inverse_X_plus1
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3621	by (simp add: L_def fps_eq_iff del: of_nat_Suc)
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3622
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3623	lemma L_nth: "L c $ n = (if n = 0 then 0 else 1/c * ((- 1) ^ (n - 1) / of_nat n))"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3624	by (simp add: L_def field_simps)
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3625
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3626	lemma L_0[simp]: "L c $ 0 = 0" by (simp add: L_def)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3627
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3628	lemma L_E_inv:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3629	fixes a :: "'a::field_char_0"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3630	assumes a: "a \<noteq> 0"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3631	shows "L a = fps_inv (E a - 1)" (is "?l = ?r")
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3632	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3633	let ?b = "E a - 1"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3634	have b0: "?b $ 0 = 0" by simp
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3635	have b1: "?b $ 1 \<noteq> 0" by (simp add: a)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3636	have "fps_deriv (E a - 1) oo fps_inv (E a - 1) =
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3637	(fps_const a * (E a - 1) + fps_const a) oo fps_inv (E a - 1)"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3638	by (simp add: field_simps)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3639	also have "\<dots> = fps_const a * (X + 1)"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3640	apply (simp add: fps_compose_add_distrib fps_const_mult_apply_left[symmetric] fps_inv_right[OF b0 b1])
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3641	apply (simp add: field_simps)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3642	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3643	finally have eq: "fps_deriv (E a - 1) oo fps_inv (E a - 1) = fps_const a * (X + 1)" .
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3644	from fps_inv_deriv[OF b0 b1, unfolded eq]
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3645	have "fps_deriv (fps_inv ?b) = fps_const (inverse a) / (X + 1)"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3646	using a
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3647	by (simp add: fps_const_inverse eq fps_divide_def fps_inverse_mult)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3648	then have "fps_deriv ?l = fps_deriv ?r"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3649	by (simp add: fps_deriv_L add.commute fps_divide_def divide_inverse)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3650	then show ?thesis unfolding fps_deriv_eq_iff
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3651	by (simp add: L_nth fps_inv_def)
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3652	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3653
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3654	lemma L_mult_add:
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3655	assumes c0: "c\<noteq>0"
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3656	and d0: "d\<noteq>0"
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3657	shows "L c + L d = fps_const (c+d) * L (c*d)"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3658	(is "?r = ?l")
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3659	proof-
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3660	from c0 d0 have eq: "1/c + 1/d = (c+d)/(c*d)" by (simp add: field_simps)
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3661	have "fps_deriv ?r = fps_const (1/c + 1/d) * inverse (1 + X)"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3662	by (simp add: fps_deriv_L fps_const_add[symmetric] algebra_simps del: fps_const_add)
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3663	also have "\<dots> = fps_deriv ?l"
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3664	apply (simp add: fps_deriv_L)
52903 6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3665	apply (simp add: fps_eq_iff eq)
6c89225ddeba tuned proofs; wenzelm parents: 52902 diff changeset	3666	done
31369 8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3667	finally show ?thesis
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3668	unfolding fps_deriv_eq_iff by simp
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3669	qed
8b460fd12100 Reverses idempotent; radical of E; generalized logarithm; chaieb parents: 31199 diff changeset	3670
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3671
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3672	subsubsection \<open>Binomial series\<close>
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3673
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3674	definition "fps_binomial a = Abs_fps (\<lambda>n. a gchoose n)"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3675
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3676	lemma fps_binomial_nth[simp]: "fps_binomial a $ n = a gchoose n"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3677	by (simp add: fps_binomial_def)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3678
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3679	lemma fps_binomial_ODE_unique:
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3680	fixes c :: "'a::field_char_0"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3681	shows "fps_deriv a = (fps_const c * a) / (1 + X) \<longleftrightarrow> a = fps_const (a$0) * fps_binomial c"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3682	(is "?lhs \<longleftrightarrow> ?rhs")
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3683	proof
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3684	let ?da = "fps_deriv a"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3685	let ?x1 = "(1 + X):: 'a fps"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3686	let ?l = "?x1 * ?da"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3687	let ?r = "fps_const c * a"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3688
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3689	have eq: "?l = ?r \<longleftrightarrow> ?lhs"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3690	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3691	have x10: "?x1 $ 0 \<noteq> 0" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3692	have "?l = ?r \<longleftrightarrow> inverse ?x1 * ?l = inverse ?x1 * ?r" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3693	also have "\<dots> \<longleftrightarrow> ?da = (fps_const c * a) / ?x1"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3694	apply (simp only: fps_divide_def mult.assoc[symmetric] inverse_mult_eq_1[OF x10])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3695	apply (simp add: field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3696	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3697	finally show ?thesis .
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3698	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3699
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3700	show ?rhs if ?lhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3701	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3702	from eq that have h: "?l = ?r" ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3703	have th0: "a$ Suc n = ((c - of_nat n) / of_nat (Suc n)) * a $n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3704	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3705	from h have "?l $ n = ?r $ n" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3706	then show ?thesis
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3707	apply (simp add: field_simps del: of_nat_Suc)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3708	apply (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3709	apply (simp_all add: field_simps del: of_nat_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3710	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3711	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3712	have th1: "a $ n = (c gchoose n) * a $ 0" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3713	proof (induct n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3714	case 0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3715	then show ?case by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3716	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3717	case (Suc m)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3718	then show ?case
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3719	unfolding th0
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3720	apply (simp add: field_simps del: of_nat_Suc)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3721	unfolding mult.assoc[symmetric] gbinomial_mult_1
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3722	apply (simp add: field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3723	done
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3724	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3725	show ?thesis
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3726	apply (simp add: fps_eq_iff)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3727	apply (subst th1)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3728	apply (simp add: field_simps)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3729	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3730	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3731
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3732	show ?lhs if ?rhs
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3733	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3734	have th00: "x * (a $ 0 * y) = a $ 0 * (x * y)" for x y
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3735	by (simp add: mult.commute)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3736	have "?l = ?r"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3737	apply (subst \<open>?rhs\<close>)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3738	apply (subst (2) \<open>?rhs\<close>)
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3739	apply (clarsimp simp add: fps_eq_iff field_simps)
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3740	unfolding mult.assoc[symmetric] th00 gbinomial_mult_1
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3741	apply (simp add: field_simps gbinomial_mult_1)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3742	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3743	with eq show ?thesis ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3744	qed
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3745	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3746
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3747	lemma fps_binomial_deriv: "fps_deriv (fps_binomial c) = fps_const c * fps_binomial c / (1 + X)"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3748	proof -
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3749	let ?a = "fps_binomial c"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3750	have th0: "?a = fps_const (?a$0) * ?a" by (simp)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3751	from iffD2[OF fps_binomial_ODE_unique, OF th0] show ?thesis .
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3752	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3753
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3754	lemma fps_binomial_add_mult: "fps_binomial (c+d) = fps_binomial c * fps_binomial d" (is "?l = ?r")
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3755	proof -
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3756	let ?P = "?r - ?l"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3757	let ?b = "fps_binomial"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3758	let ?db = "\<lambda>x. fps_deriv (?b x)"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3759	have "fps_deriv ?P = ?db c * ?b d + ?b c * ?db d - ?db (c + d)" by simp
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3760	also have "\<dots> = inverse (1 + X) *
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3761	(fps_const c * ?b c * ?b d + fps_const d * ?b c * ?b d - fps_const (c+d) * ?b (c + d))"
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3762	unfolding fps_binomial_deriv
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3763	by (simp add: fps_divide_def field_simps)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3764	also have "\<dots> = (fps_const (c + d)/ (1 + X)) * ?P"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	3765	by (simp add: field_simps fps_divide_unit fps_const_add[symmetric] del: fps_const_add)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3766	finally have th0: "fps_deriv ?P = fps_const (c+d) * ?P / (1 + X)"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3767	by (simp add: fps_divide_def)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3768	have "?P = fps_const (?P$0) * ?b (c + d)"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3769	unfolding fps_binomial_ODE_unique[symmetric]
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3770	using th0 by simp
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3771	then have "?P = 0" by (simp add: fps_mult_nth)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3772	then show ?thesis by simp
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3773	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3774
61552 980dd46a03fb Added binomial identities to CONTRIBUTORS; small lemmas on of_int/pochhammer eberlm parents: 60867 diff changeset	3775	lemma fps_binomial_minus_one: "fps_binomial (- 1) = inverse (1 + X)"
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3776	(is "?l = inverse ?r")
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3777	proof-
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3778	have th: "?r$0 \<noteq> 0" by simp
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3779	have th': "fps_deriv (inverse ?r) = fps_const (- 1) * inverse ?r / (1 + X)"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3780	by (simp add: fps_inverse_deriv[OF th] fps_divide_def
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57418 diff changeset	3781	power2_eq_square mult.commute fps_const_neg[symmetric] del: fps_const_neg)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3782	have eq: "inverse ?r $ 0 = 1"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3783	by (simp add: fps_inverse_def)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3784	from iffD1[OF fps_binomial_ODE_unique[of "inverse (1 + X)" "- 1"] th'] eq
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3785	show ?thesis by (simp add: fps_inverse_def)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3786	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3787
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3788	text \<open>Vandermonde's Identity as a consequence.\<close>
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3789	lemma gbinomial_Vandermonde:
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3790	"setsum (\<lambda>k. (a gchoose k) * (b gchoose (n - k))) {0..n} = (a + b) gchoose n"
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3791	proof -
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3792	let ?ba = "fps_binomial a"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3793	let ?bb = "fps_binomial b"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3794	let ?bab = "fps_binomial (a + b)"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3795	from fps_binomial_add_mult[of a b] have "?bab $ n = (?ba * ?bb)$n" by simp
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3796	then show ?thesis by (simp add: fps_mult_nth)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3797	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3798
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3799	lemma binomial_Vandermonde:
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3800	"setsum (\<lambda>k. (a choose k) * (b choose (n - k))) {0..n} = (a + b) choose n"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3801	using gbinomial_Vandermonde[of "(of_nat a)" "of_nat b" n]
61649 268d88ec9087 Tweaks for "real": Removal of [iff] status for some lemmas, adding [simp] for others. Plus fixes. paulson <lp15@cam.ac.uk> parents: 61610 diff changeset	3802	by (simp only: binomial_gbinomial[symmetric] of_nat_mult[symmetric]
268d88ec9087 Tweaks for "real": Removal of [iff] status for some lemmas, adding [simp] for others. Plus fixes. paulson <lp15@cam.ac.uk> parents: 61610 diff changeset	3803	of_nat_setsum[symmetric] of_nat_add[symmetric] of_nat_eq_iff)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3804
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3805	lemma binomial_Vandermonde_same: "setsum (\<lambda>k. (n choose k)\<^sup>2) {0..n} = (2 * n) choose n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3806	using binomial_Vandermonde[of n n n, symmetric]
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3807	unfolding mult_2
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3808	apply (simp add: power2_eq_square)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3809	apply (rule setsum.cong)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3810	apply (auto intro: binomial_symmetric)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3811	done
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3812
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3813	lemma Vandermonde_pochhammer_lemma:
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3814	fixes a :: "'a::field_char_0"
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3815	assumes b: "\<forall>j\<in>{0 ..<n}. b \<noteq> of_nat j"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3816	shows "setsum (\<lambda>k. (pochhammer (- a) k * pochhammer (- (of_nat n)) k) /
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3817	(of_nat (fact k) * pochhammer (b - of_nat n + 1) k)) {0..n} =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3818	pochhammer (- (a + b)) n / pochhammer (- b) n"
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3819	(is "?l = ?r")
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3820	proof -
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3821	let ?m1 = "\<lambda>m. (- 1 :: 'a) ^ m"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3822	let ?f = "\<lambda>m. of_nat (fact m)"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3823	let ?p = "\<lambda>(x::'a). pochhammer (- x)"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3824	from b have bn0: "?p b n \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3825	unfolding pochhammer_eq_0_iff by simp
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3826	have th00:
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3827	"b gchoose (n - k) =
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3828	(?m1 n * ?p b n * ?m1 k * ?p (of_nat n) k) / (?f n * pochhammer (b - of_nat n + 1) k)"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3829	(is ?gchoose)
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3830	"pochhammer (1 + b - of_nat n) k \<noteq> 0"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3831	(is ?pochhammer)
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3832	if kn: "k \<in> {0..n}" for k
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3833	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3834	have nz: "pochhammer (1 + b - of_nat n) n \<noteq> 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3835	proof
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3836	assume "pochhammer (1 + b - of_nat n) n = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3837	then have c: "pochhammer (b - of_nat n + 1) n = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3838	by (simp add: algebra_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3839	then obtain j where j: "j < n" "b - of_nat n + 1 = - of_nat j"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3840	unfolding pochhammer_eq_0_iff by blast
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3841	from j have "b = of_nat n - of_nat j - of_nat 1"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3842	by (simp add: algebra_simps)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3843	then have "b = of_nat (n - j - 1)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3844	using j kn by (simp add: of_nat_diff)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3845	with b show False using j by auto
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3846	qed
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3847
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3848	from nz kn [simplified] have nz': "pochhammer (1 + b - of_nat n) k \<noteq> 0"
35175 61255c81da01 fix more looping simp rules huffman parents: 32960 diff changeset	3849	by (rule pochhammer_neq_0_mono)
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3850
60567 19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	3851	consider "k = 0 \<or> n = 0" \| "k \<noteq> 0" "n \<noteq> 0"
19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	3852	by blast
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3853	then have "b gchoose (n - k) =
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3854	(?m1 n * ?p b n * ?m1 k * ?p (of_nat n) k) / (?f n * pochhammer (b - of_nat n + 1) k)"
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3855	proof cases
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3856	case 1
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3857	then show ?thesis
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3858	using kn by (cases "k = 0") (simp_all add: gbinomial_pochhammer)
17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3859	next
60567 19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	3860	case neq: 2
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3861	then obtain m where m: "n = Suc m"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3862	by (cases n) auto
60567 19c277ea65ae tuned proofs -- less digits; wenzelm parents: 60558 diff changeset	3863	from neq(1) obtain h where h: "k = Suc h"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3864	by (cases k) auto
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3865	show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3866	proof (cases "k = n")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3867	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3868	then show ?thesis
59862 44b3f4fa33ca New material and binomial fix paulson <lp15@cam.ac.uk> parents: 59815 diff changeset	3869	using pochhammer_minus'[where k=k and b=b]
44b3f4fa33ca New material and binomial fix paulson <lp15@cam.ac.uk> parents: 59815 diff changeset	3870	apply (simp add: pochhammer_same)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3871	using bn0
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3872	apply (simp add: field_simps power_add[symmetric])
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3873	done
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3874	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3875	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3876	with kn have kn': "k < n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3877	by simp
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3878	have m1nk: "?m1 n = setprod (\<lambda>i. - 1) {0..m}" "?m1 k = setprod (\<lambda>i. - 1) {0..h}"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3879	by (simp_all add: setprod_constant m h)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3880	have bnz0: "pochhammer (b - of_nat n + 1) k \<noteq> 0"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3881	using bn0 kn
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3882	unfolding pochhammer_eq_0_iff
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3883	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3884	apply (erule_tac x= "n - ka - 1" in allE)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3885	apply (auto simp add: algebra_simps of_nat_diff)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3886	done
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3887	have eq1: "setprod (\<lambda>k. (1::'a) + of_nat m - of_nat k) {0 .. h} =
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3888	setprod of_nat {Suc (m - h) .. Suc m}"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3889	using kn' h m
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3890	by (intro setprod.reindex_bij_witness[where i="\<lambda>k. Suc m - k" and j="\<lambda>k. Suc m - k"])
7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3891	(auto simp: of_nat_diff)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3892
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3893	have th1: "(?m1 k * ?p (of_nat n) k) / ?f n = 1 / of_nat(fact (n - k))"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3894	unfolding m1nk
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3895	unfolding m h pochhammer_Suc_setprod
54489 03ff4d1e6784 eliminiated neg_numeral in favour of - (numeral _) haftmann parents: 54452 diff changeset	3896	apply (simp add: field_simps del: fact_Suc)
59730 b7c394c7a619 The factorial function, "fact", now has type "nat => 'a" paulson <lp15@cam.ac.uk> parents: 59667 diff changeset	3897	unfolding fact_altdef id_def
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3898	unfolding of_nat_setprod
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3899	unfolding setprod.distrib[symmetric]
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3900	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3901	unfolding eq1
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3902	apply (subst setprod.union_disjoint[symmetric])
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3903	apply (auto)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3904	apply (rule setprod.cong)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3905	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3906	done
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3907	have th20: "?m1 n * ?p b n = setprod (\<lambda>i. b - of_nat i) {0..m}"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3908	unfolding m1nk
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3909	unfolding m h pochhammer_Suc_setprod
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3910	unfolding setprod.distrib[symmetric]
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3911	apply (rule setprod.cong)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3912	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3913	done
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3914	have th21:"pochhammer (b - of_nat n + 1) k = setprod (\<lambda>i. b - of_nat i) {n - k .. n - 1}"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3915	unfolding h m
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3916	unfolding pochhammer_Suc_setprod
57129 7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3917	using kn m h
7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3918	by (intro setprod.reindex_bij_witness[where i="\<lambda>k. n - 1 - k" and j="\<lambda>i. m-i"])
7edb7550663e introduce more powerful reindexing rules for big operators hoelzl parents: 56480 diff changeset	3919	(auto simp: of_nat_diff)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3920
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3921	have "?m1 n * ?p b n =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3922	pochhammer (b - of_nat n + 1) k * setprod (\<lambda>i. b - of_nat i) {0.. n - k - 1}"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3923	unfolding th20 th21
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3924	unfolding h m
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3925	apply (subst setprod.union_disjoint[symmetric])
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3926	using kn' h m
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3927	apply auto
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3928	apply (rule setprod.cong)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3929	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3930	done
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3931	then have th2: "(?m1 n * ?p b n)/pochhammer (b - of_nat n + 1) k =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3932	setprod (\<lambda>i. b - of_nat i) {0.. n - k - 1}"
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3933	using nz' by (simp add: field_simps)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3934	have "(?m1 n * ?p b n * ?m1 k * ?p (of_nat n) k) / (?f n * pochhammer (b - of_nat n + 1) k) =
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3935	((?m1 k * ?p (of_nat n) k) / ?f n) * ((?m1 n * ?p b n)/pochhammer (b - of_nat n + 1) k)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3936	using bnz0
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3937	by (simp add: field_simps)
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3938	also have "\<dots> = b gchoose (n - k)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3939	unfolding th1 th2
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	3940	using kn' by (simp add: gbinomial_def)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3941	finally show ?thesis by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3942	qed
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3943	qed
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3944	then show ?gchoose and ?pochhammer
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3945	apply (cases "n = 0")
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3946	using nz'
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3947	apply auto
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3948	done
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3949	qed
60504 17741c71a731 tuned proofs; wenzelm parents: 60501 diff changeset	3950	have "?r = ((a + b) gchoose n) * (of_nat (fact n) / (?m1 n * pochhammer (- b) n))"
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3951	unfolding gbinomial_pochhammer
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36311 diff changeset	3952	using bn0 by (auto simp add: field_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3953	also have "\<dots> = ?l"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3954	unfolding gbinomial_Vandermonde[symmetric]
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3955	apply (simp add: th00)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3956	unfolding gbinomial_pochhammer
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3957	using bn0
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3958	apply (simp add: setsum_left_distrib setsum_right_distrib field_simps)
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3959	apply (rule setsum.cong)
6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	3960	apply (rule refl)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3961	apply (drule th00(2))
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3962	apply (simp add: field_simps power_add[symmetric])
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	3963	done
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3964	finally show ?thesis by simp
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3965	qed
b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	3966
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3967	lemma Vandermonde_pochhammer:
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3968	fixes a :: "'a::field_char_0"
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3969	assumes c: "\<forall>i \<in> {0..< n}. c \<noteq> - of_nat i"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	3970	shows "setsum (\<lambda>k. (pochhammer a k * pochhammer (- (of_nat n)) k) /
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3971	(of_nat (fact k) * pochhammer c k)) {0..n} = pochhammer (c - a) n / pochhammer c n"
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3972	proof -
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3973	let ?a = "- a"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3974	let ?b = "c + of_nat n - 1"
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3975	have h: "\<forall> j \<in>{0..< n}. ?b \<noteq> of_nat j"
4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	3976	using c
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3977	apply (auto simp add: algebra_simps of_nat_diff)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3978	apply (erule_tac x = "n - j - 1" in ballE)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3979	apply (auto simp add: of_nat_diff algebra_simps)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3980	done
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3981	have th0: "pochhammer (- (?a + ?b)) n = (- 1)^n * pochhammer (c - a) n"
59862 44b3f4fa33ca New material and binomial fix paulson <lp15@cam.ac.uk> parents: 59815 diff changeset	3982	unfolding pochhammer_minus
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3983	by (simp add: algebra_simps)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3984	have th1: "pochhammer (- ?b) n = (- 1)^n * pochhammer c n"
59862 44b3f4fa33ca New material and binomial fix paulson <lp15@cam.ac.uk> parents: 59815 diff changeset	3985	unfolding pochhammer_minus
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3986	by simp
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3987	have nz: "pochhammer c n \<noteq> 0" using c
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3988	by (simp add: pochhammer_eq_0_iff)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3989	from Vandermonde_pochhammer_lemma[where a = "?a" and b="?b" and n=n, OF h, unfolded th0 th1]
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3990	show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3991	using nz by (simp add: field_simps setsum_right_distrib)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	3992	qed
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	3993
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	3994
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	3995	subsubsection \<open>Formal trigonometric functions\<close>
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3996
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	3997	definition "fps_sin (c::'a::field_char_0) =
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3998	Abs_fps (\<lambda>n. if even n then 0 else (- 1) ^((n - 1) div 2) * c^n /(of_nat (fact n)))"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	3999
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	4000	definition "fps_cos (c::'a::field_char_0) =
da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	4001	Abs_fps (\<lambda>n. if even n then (- 1) ^ (n div 2) * c^n / (of_nat (fact n)) else 0)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4002
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30273 diff changeset	4003	lemma fps_sin_deriv:
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4004	"fps_deriv (fps_sin c) = fps_const c * fps_cos c"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4005	(is "?lhs = ?rhs")
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	4006	proof (rule fps_ext)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4007	fix n :: nat
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4008	show "?lhs $ n = ?rhs $ n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4009	proof (cases "even n")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4010	case True
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4011	have "?lhs$n = of_nat (n+1) * (fps_sin c $ (n+1))" by simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4012	also have "\<dots> = of_nat (n+1) * ((- 1)^(n div 2) * c^Suc n / of_nat (fact (Suc n)))"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4013	using True by (simp add: fps_sin_def)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4014	also have "\<dots> = (- 1)^(n div 2) * c^Suc n * (of_nat (n+1) / (of_nat (Suc n) * of_nat (fact n)))"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4015	unfolding fact_Suc of_nat_mult
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4016	by (simp add: field_simps del: of_nat_add of_nat_Suc)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4017	also have "\<dots> = (- 1)^(n div 2) *c^Suc n / of_nat (fact n)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4018	by (simp add: field_simps del: of_nat_add of_nat_Suc)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4019	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4020	using True by (simp add: fps_cos_def field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4021	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4022	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4023	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4024	by (simp_all add: fps_deriv_def fps_sin_def fps_cos_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4025	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4026	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4027
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4028	lemma fps_cos_deriv: "fps_deriv (fps_cos c) = fps_const (- c)* (fps_sin c)"
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4029	(is "?lhs = ?rhs")
31273 da95bc889ad2 use class field_char_0 for fps definitions huffman parents: 31199 diff changeset	4030	proof (rule fps_ext)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4031	have th0: "- ((- 1::'a) ^ n) = (- 1)^Suc n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4032	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4033	show "?lhs $ n = ?rhs $ n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4034	proof (cases "even n")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4035	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4036	then have n0: "n \<noteq> 0" by presburger
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4037	from False have th1: "Suc ((n - 1) div 2) = Suc n div 2"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4038	by (cases n) simp_all
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4039	have "?lhs$n = of_nat (n+1) * (fps_cos c $ (n+1))" by simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4040	also have "\<dots> = of_nat (n+1) * ((- 1)^((n + 1) div 2) * c^Suc n / of_nat (fact (Suc n)))"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4041	using False by (simp add: fps_cos_def)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4042	also have "\<dots> = (- 1)^((n + 1) div 2)c^Suc n (of_nat (n+1) / (of_nat (Suc n) * of_nat (fact n)))"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4043	unfolding fact_Suc of_nat_mult
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4044	by (simp add: field_simps del: of_nat_add of_nat_Suc)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4045	also have "\<dots> = (- 1)^((n + 1) div 2) * c^Suc n / of_nat (fact n)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4046	by (simp add: field_simps del: of_nat_add of_nat_Suc)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4047	also have "\<dots> = (- ((- 1)^((n - 1) div 2))) * c^Suc n / of_nat (fact n)"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4048	unfolding th0 unfolding th1 by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4049	finally show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4050	using False by (simp add: fps_sin_def field_simps)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4051	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4052	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4053	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4054	by (simp_all add: fps_deriv_def fps_sin_def fps_cos_def)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4055	qed
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4056	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4057
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4058	lemma fps_sin_cos_sum_of_squares: "(fps_cos c)\<^sup>2 + (fps_sin c)\<^sup>2 = 1"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4059	(is "?lhs = _")
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	4060	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4061	have "fps_deriv ?lhs = 0"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4062	apply (simp add: fps_deriv_power fps_sin_deriv fps_cos_deriv)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4063	apply (simp add: field_simps fps_const_neg[symmetric] del: fps_const_neg)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4064	done
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4065	then have "?lhs = fps_const (?lhs $ 0)"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4066	unfolding fps_deriv_eq_0_iff .
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4067	also have "\<dots> = 1"
30960 fec1a04b7220 power operation defined generic haftmann parents: 30952 diff changeset	4068	by (auto simp add: fps_eq_iff numeral_2_eq_2 fps_mult_nth fps_cos_def fps_sin_def)
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4069	finally show ?thesis .
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4070	qed
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4071
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4072	lemma fps_sin_nth_0 [simp]: "fps_sin c $ 0 = 0"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4073	unfolding fps_sin_def by simp
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4074
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4075	lemma fps_sin_nth_1 [simp]: "fps_sin c $ 1 = c"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4076	unfolding fps_sin_def by simp
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4077
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4078	lemma fps_sin_nth_add_2:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4079	"fps_sin c $ (n + 2) = - (c * c * fps_sin c $ n / (of_nat (n + 1) * of_nat (n + 2)))"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4080	unfolding fps_sin_def
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4081	apply (cases n)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4082	apply simp
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	4083	apply (simp add: nonzero_divide_eq_eq nonzero_eq_divide_eq del: of_nat_Suc fact_Suc)
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4084	apply (simp add: of_nat_mult del: of_nat_Suc mult_Suc)
e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4085	done
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4086
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4087	lemma fps_cos_nth_0 [simp]: "fps_cos c $ 0 = 1"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4088	unfolding fps_cos_def by simp
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4089
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4090	lemma fps_cos_nth_1 [simp]: "fps_cos c $ 1 = 0"
53195 e4b18828a817 tuned proofs; wenzelm parents: 53077 diff changeset	4091	unfolding fps_cos_def by simp
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4092
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4093	lemma fps_cos_nth_add_2:
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4094	"fps_cos c $ (n + 2) = - (c * c * fps_cos c $ n / (of_nat (n + 1) * of_nat (n + 2)))"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4095	unfolding fps_cos_def
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	4096	apply (simp add: nonzero_divide_eq_eq nonzero_eq_divide_eq del: of_nat_Suc fact_Suc)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4097	apply (simp add: of_nat_mult del: of_nat_Suc mult_Suc)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4098	done
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4099
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4100	lemma nat_induct2: "P 0 \<Longrightarrow> P 1 \<Longrightarrow> (\<And>n. P n \<Longrightarrow> P (n + 2)) \<Longrightarrow> P (n::nat)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4101	unfolding One_nat_def numeral_2_eq_2
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4102	apply (induct n rule: nat_less_induct)
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4103	apply (case_tac n)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4104	apply simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4105	apply (rename_tac m)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4106	apply (case_tac m)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4107	apply simp
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4108	apply (rename_tac k)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4109	apply (case_tac k)
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4110	apply simp_all
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4111	done
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4112
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4113	lemma nat_add_1_add_1: "(n::nat) + 1 + 1 = n + 2"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4114	by simp
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4115
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4116	lemma eq_fps_sin:
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4117	assumes 0: "a $ 0 = 0"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4118	and 1: "a $ 1 = c"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4119	and 2: "fps_deriv (fps_deriv a) = - (fps_const c * fps_const c * a)"
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4120	shows "a = fps_sin c"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4121	apply (rule fps_ext)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4122	apply (induct_tac n rule: nat_induct2)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4123	apply (simp add: 0)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4124	apply (simp add: 1 del: One_nat_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4125	apply (rename_tac m, cut_tac f="\<lambda>a. a $ m" in arg_cong [OF 2])
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4126	apply (simp add: nat_add_1_add_1 fps_sin_nth_add_2
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4127	del: One_nat_def of_nat_Suc of_nat_add add_2_eq_Suc')
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4128	apply (subst minus_divide_left)
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	4129	apply (subst nonzero_eq_divide_eq)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4130	apply (simp del: of_nat_add of_nat_Suc)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	4131	apply (simp only: ac_simps)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4132	done
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4133
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4134	lemma eq_fps_cos:
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4135	assumes 0: "a $ 0 = 1"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4136	and 1: "a $ 1 = 0"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4137	and 2: "fps_deriv (fps_deriv a) = - (fps_const c * fps_const c * a)"
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4138	shows "a = fps_cos c"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4139	apply (rule fps_ext)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4140	apply (induct_tac n rule: nat_induct2)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4141	apply (simp add: 0)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4142	apply (simp add: 1 del: One_nat_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4143	apply (rename_tac m, cut_tac f="\<lambda>a. a $ m" in arg_cong [OF 2])
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4144	apply (simp add: nat_add_1_add_1 fps_cos_nth_add_2
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4145	del: One_nat_def of_nat_Suc of_nat_add add_2_eq_Suc')
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4146	apply (subst minus_divide_left)
60162 645058aa9d6f tidying some messy proofs paulson <lp15@cam.ac.uk> parents: 60017 diff changeset	4147	apply (subst nonzero_eq_divide_eq)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4148	apply (simp del: of_nat_add of_nat_Suc)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	4149	apply (simp only: ac_simps)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4150	done
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4151
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4152	lemma mult_nth_0 [simp]: "(a * b) $ 0 = a $ 0 * b $ 0"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4153	by (simp add: fps_mult_nth)
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4154
d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4155	lemma mult_nth_1 [simp]: "(a * b) $ 1 = a $ 0 * b $ 1 + a $ 1 * b $ 0"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4156	by (simp add: fps_mult_nth)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4157
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4158	lemma fps_sin_add: "fps_sin (a + b) = fps_sin a * fps_cos b + fps_cos a * fps_sin b"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4159	apply (rule eq_fps_sin [symmetric], simp, simp del: One_nat_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4160	apply (simp del: fps_const_neg fps_const_add fps_const_mult
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4161	add: fps_const_add [symmetric] fps_const_neg [symmetric]
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4162	fps_sin_deriv fps_cos_deriv algebra_simps)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4163	done
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4164
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4165	lemma fps_cos_add: "fps_cos (a + b) = fps_cos a * fps_cos b - fps_sin a * fps_sin b"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4166	apply (rule eq_fps_cos [symmetric], simp, simp del: One_nat_def)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4167	apply (simp del: fps_const_neg fps_const_add fps_const_mult
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4168	add: fps_const_add [symmetric] fps_const_neg [symmetric]
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4169	fps_sin_deriv fps_cos_deriv algebra_simps)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4170	done
31274 d2b5c6b07988 addition formulas for fps_sin, fps_cos huffman parents: 31273 diff changeset	4171
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	4172	lemma fps_sin_even: "fps_sin (- c) = - fps_sin c"
56479 91958d4b30f7 revert c1bbd3e22226, a14831ac3023, and 36489d77c484: divide_minus_left/right are again simp rules hoelzl parents: 56410 diff changeset	4173	by (auto simp add: fps_eq_iff fps_sin_def)
31968 0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	4174
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	4175	lemma fps_cos_odd: "fps_cos (- c) = fps_cos c"
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	4176	by (auto simp add: fps_eq_iff fps_cos_def)
0314441a53a6 FPS form a metric space, which justifies the infinte sum notation chaieb parents: 31790 diff changeset	4177
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4178	definition "fps_tan c = fps_sin c / fps_cos c"
4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4179
53077 a1b3784f8129 more symbols; wenzelm parents: 52903 diff changeset	4180	lemma fps_tan_deriv: "fps_deriv (fps_tan c) = fps_const c / (fps_cos c)\<^sup>2"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4181	proof -
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4182	have th0: "fps_cos c $ 0 \<noteq> 0" by (simp add: fps_cos_def)
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4183	from this have "fps_cos c \<noteq> 0" by (intro notI) simp
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	4184	hence "fps_deriv (fps_tan c) =
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4185	fps_const c * (fps_cos c^2 + fps_sin c^2) / (fps_cos c^2)"
62102 877463945ce9 fix code generation for uniformity: uniformity is a non-computable pure data. hoelzl parents: 62101 diff changeset	4186	by (simp add: fps_tan_def fps_divide_deriv power2_eq_square algebra_simps
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4187	fps_sin_deriv fps_cos_deriv fps_const_neg[symmetric] div_mult_swap
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4188	del: fps_const_neg)
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4189	also note fps_sin_cos_sum_of_squares
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4190	finally show ?thesis by simp
29687 4d934a895d11 A formalization of formal power series chaieb parents: diff changeset	4191	qed
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	4192
60558 4fcc6861e64f tuned proofs; wenzelm parents: 60504 diff changeset	4193	text \<open>Connection to E c over the complex numbers --- Euler and de Moivre.\<close>
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4194
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4195	lemma Eii_sin_cos: "E (ii * c) = fps_cos c + fps_const ii * fps_sin c"
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4196	(is "?l = ?r")
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4197	proof -
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4198	have "?l $ n = ?r $ n" for n
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4199	proof (cases "even n")
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4200	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4201	then obtain m where m: "n = 2 * m" ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4202	show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4203	by (simp add: m fps_sin_def fps_cos_def power_mult_distrib power_mult power_minus [of "c ^ 2"])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4204	next
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4205	case False
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4206	then obtain m where m: "n = 2 * m + 1" ..
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4207	show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4208	by (simp add: m fps_sin_def fps_cos_def power_mult_distrib
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4209	power_mult power_minus [of "c ^ 2"])
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4210	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4211	then show ?thesis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4212	by (simp add: fps_eq_iff)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4213	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4214
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4215	lemma E_minus_ii_sin_cos: "E (- (ii * c)) = fps_cos c - fps_const ii * fps_sin c"
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4216	unfolding minus_mult_right Eii_sin_cos by (simp add: fps_sin_even fps_cos_odd)
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4217
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4218	lemma fps_const_minus: "fps_const (c::'a::group_add) - fps_const d = fps_const (c - d)"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4219	by (fact fps_const_sub)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4220
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	4221	lemma fps_numeral_fps_const: "numeral i = fps_const (numeral i :: 'a::comm_ring_1)"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	4222	by (fact numeral_fps_const) (* FIXME: duplicate *)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4223
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4224	lemma fps_cos_Eii: "fps_cos c = (E (ii * c) + E (- ii * c)) / fps_const 2"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4225	proof -
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	4226	have th: "fps_cos c + fps_cos c = fps_cos c * fps_const 2"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	4227	by (simp add: numeral_fps_const)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4228	show ?thesis
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4229	unfolding Eii_sin_cos minus_mult_commute
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4230	by (simp add: fps_sin_even fps_cos_odd numeral_fps_const fps_divide_unit fps_const_inverse th)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4231	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4232
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4233	lemma fps_sin_Eii: "fps_sin c = (E (ii * c) - E (- ii * c)) / fps_const (2*ii)"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4234	proof -
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	4235	have th: "fps_const \<i> * fps_sin c + fps_const \<i> * fps_sin c = fps_sin c * fps_const (2 * ii)"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46757 diff changeset	4236	by (simp add: fps_eq_iff numeral_fps_const)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4237	show ?thesis
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4238	unfolding Eii_sin_cos minus_mult_commute
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4239	by (simp add: fps_sin_even fps_cos_odd fps_divide_unit fps_const_inverse th)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4240	qed
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4241
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4242	lemma fps_tan_Eii:
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4243	"fps_tan c = (E (ii * c) - E (- ii * c)) / (fps_const ii * (E (ii * c) + E (- ii * c)))"
adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4244	unfolding fps_tan_def fps_sin_Eii fps_cos_Eii mult_minus_left E_neg
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4245	apply (simp add: fps_divide_unit fps_inverse_mult fps_const_mult[symmetric] fps_const_inverse del: fps_const_mult)
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4246	apply simp
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4247	done
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4248
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4249	lemma fps_demoivre:
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4250	"(fps_cos a + fps_const ii * fps_sin a)^n =
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4251	fps_cos (of_nat n * a) + fps_const ii * fps_sin (of_nat n * a)"
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4252	unfolding Eii_sin_cos[symmetric] E_power_mult
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	4253	by (simp add: ac_simps)
32157 adea7a729c7a Moved important theorems from FPS_Examples to FPS --- they are not chaieb parents: 31968 diff changeset	4254
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4255
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	4256	subsection \<open>Hypergeometric series\<close>
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4257
62422 4aa35fd6c152 Tuned Euclidean rings eberlm parents: 62390 diff changeset	4258	(* TODO: Rename this *)
59867 58043346ca64 given up separate type classes demanding `inverse 0 = 0` haftmann parents: 59862 diff changeset	4259	definition "F as bs (c::'a::{field_char_0,field}) =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4260	Abs_fps (\<lambda>n. (foldl (\<lambda>r a. r* pochhammer a n) 1 as * c^n) /
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4261	(foldl (\<lambda>r b. r * pochhammer b n) 1 bs * of_nat (fact n)))"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4262
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4263	lemma F_nth[simp]: "F as bs c $ n =
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4264	(foldl (\<lambda>r a. r* pochhammer a n) 1 as * c^n) /
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4265	(foldl (\<lambda>r b. r * pochhammer b n) 1 bs * of_nat (fact n))"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4266	by (simp add: F_def)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4267
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4268	lemma foldl_mult_start:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4269	fixes v :: "'a::comm_ring_1"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4270	shows "foldl (\<lambda>r x. r * f x) v as * x = foldl (\<lambda>r x. r * f x) (v * x) as "
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4271	by (induct as arbitrary: x v) (auto simp add: algebra_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4272
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4273	lemma foldr_mult_foldl:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4274	fixes v :: "'a::comm_ring_1"
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4275	shows "foldr (\<lambda>x r. r * f x) as v = foldl (\<lambda>r x. r * f x) v as"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4276	by (induct as arbitrary: v) (auto simp add: foldl_mult_start)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4277
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4278	lemma F_nth_alt:
942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4279	"F as bs c $ n = foldr (\<lambda>a r. r * pochhammer a n) as (c ^ n) /
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4280	foldr (\<lambda>b r. r * pochhammer b n) bs (of_nat (fact n))"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4281	by (simp add: foldl_mult_start foldr_mult_foldl)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4282
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	4283	lemma F_E[simp]: "F [] [] c = E c"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4284	by (simp add: fps_eq_iff)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4285
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4286	lemma F_1_0[simp]: "F [1] [] c = 1/(1 - fps_const c * X)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4287	proof -
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4288	let ?a = "(Abs_fps (\<lambda>n. 1)) oo (fps_const c * X)"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4289	have th0: "(fps_const c * X) $ 0 = 0" by simp
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4290	show ?thesis unfolding gp[OF th0, symmetric]
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4291	by (auto simp add: fps_eq_iff pochhammer_fact[symmetric]
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	4292	fps_compose_nth power_mult_distrib cond_value_iff setsum.delta' cong del: if_weak_cong)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4293	qed
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4294
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4295	lemma F_B[simp]: "F [-a] [] (- 1) = fps_binomial a"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4296	by (simp add: fps_eq_iff gbinomial_pochhammer algebra_simps)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4297
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4298	lemma F_0[simp]: "F as bs c $ 0 = 1"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4299	apply simp
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4300	apply (subgoal_tac "\<forall>as. foldl (\<lambda>(r::'a) (a::'a). r) 1 as = 1")
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4301	apply auto
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4302	apply (induct_tac as)
1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4303	apply auto
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4304	done
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4305
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4306	lemma foldl_prod_prod:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4307	"foldl (\<lambda>(r::'b::comm_ring_1) (x::'a::comm_ring_1). r * f x) v as * foldl (\<lambda>r x. r * g x) w as =
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4308	foldl (\<lambda>r x. r * f x * g x) (v * w) as"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4309	by (induct as arbitrary: v w) (auto simp add: algebra_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4310
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4311
53196 942a1b48bb31 tuned proofs; wenzelm parents: 53195 diff changeset	4312	lemma F_rec:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4313	"F as bs c $ Suc n = ((foldl (\<lambda>r a. r* (a + of_nat n)) c as) /
f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4314	(foldl (\<lambda>r b. r * (b + of_nat n)) (of_nat (Suc n)) bs )) * F as bs c $ n"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4315	apply (simp del: of_nat_Suc of_nat_add fact_Suc)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4316	apply (simp add: foldl_mult_start del: fact_Suc of_nat_Suc)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4317	unfolding foldl_prod_prod[unfolded foldl_mult_start] pochhammer_Suc
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4318	apply (simp add: algebra_simps of_nat_mult)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4319	done
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4320
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4321	lemma XD_nth[simp]: "XD a $ n = (if n = 0 then 0 else of_nat n * a$n)"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4322	by (simp add: XD_def)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4323
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4324	lemma XD_0th[simp]: "XD a $ 0 = 0"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4325	by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4326	lemma XD_Suc[simp]:" XD a $ Suc n = of_nat (Suc n) * a $ Suc n"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4327	by simp
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4328
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4329	definition "XDp c a = XD a + fps_const c * a"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4330
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4331	lemma XDp_nth[simp]: "XDp c a $ n = (c + of_nat n) * a$n"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4332	by (simp add: XDp_def algebra_simps)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4333
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	4334	lemma XDp_commute: "XDp b \<circ> XDp (c::'a::comm_ring_1) = XDp c \<circ> XDp b"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	4335	by (auto simp add: XDp_def fun_eq_iff fps_eq_iff algebra_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4336
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4337	lemma XDp0 [simp]: "XDp 0 = XD"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	4338	by (simp add: fun_eq_iff fps_eq_iff)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4339
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4340	lemma XDp_fps_integral [simp]: "XDp 0 (fps_integral a c) = X * a"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4341	by (simp add: fps_eq_iff fps_integral_def)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4342
52891 b8dede3a4f1d tuned proofs; wenzelm parents: 51542 diff changeset	4343	lemma F_minus_nat:
59867 58043346ca64 given up separate type classes demanding `inverse 0 = 0` haftmann parents: 59862 diff changeset	4344	"F [- of_nat n] [- of_nat (n + m)] (c::'a::{field_char_0,field}) $ k =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4345	(if k \<le> n then
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4346	pochhammer (- of_nat n) k * c ^ k / (pochhammer (- of_nat (n + m)) k * of_nat (fact k))
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4347	else 0)"
59867 58043346ca64 given up separate type classes demanding `inverse 0 = 0` haftmann parents: 59862 diff changeset	4348	"F [- of_nat m] [- of_nat (m + n)] (c::'a::{field_char_0,field}) $ k =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4349	(if k \<le> m then
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4350	pochhammer (- of_nat m) k * c ^ k / (pochhammer (- of_nat (m + n)) k * of_nat (fact k))
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4351	else 0)"
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4352	by (auto simp add: pochhammer_eq_0_iff)
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4353
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4354	lemma setsum_eq_if: "setsum f {(n::nat) .. m} = (if m < n then 0 else f n + setsum f {n+1 .. m})"
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4355	apply simp
57418 6ab1c7cb0b8d fact consolidation haftmann parents: 57129 diff changeset	4356	apply (subst setsum.insert[symmetric])
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4357	apply (auto simp add: not_less setsum_head_Suc)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4358	done
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4359
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4360	lemma pochhammer_rec_if: "pochhammer a n = (if n = 0 then 1 else a * pochhammer (a + 1) (n - 1))"
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4361	by (cases n) (simp_all add: pochhammer_rec)
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4362
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	4363	lemma XDp_foldr_nth [simp]: "foldr (\<lambda>c r. XDp c \<circ> r) cs (\<lambda>c. XDp c a) c0 $ n =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4364	foldr (\<lambda>c r. (c + of_nat n) * r) cs (c0 + of_nat n) * a$n"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4365	by (induct cs arbitrary: c0) (auto simp add: algebra_simps)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4366
63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4367	lemma genric_XDp_foldr_nth:
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4368	assumes f: "\<forall>n c a. f c a $ n = (of_nat n + k c) * a$n"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	4369	shows "foldr (\<lambda>c r. f c \<circ> r) cs (\<lambda>c. g c a) c0 $ n =
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4370	foldr (\<lambda>c r. (k c + of_nat n) * r) cs (g c0 a $ n)"
48757 1232760e208e tuned proofs; wenzelm parents: 47217 diff changeset	4371	by (induct cs arbitrary: c0) (auto simp add: algebra_simps f)
32160 63686057cbe8 Vandermonde vs Pochhammer; Hypergeometric series - very basic facts chaieb parents: 32157 diff changeset	4372
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4373	lemma dist_less_imp_nth_equal:
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4374	assumes "dist f g < inverse (2 ^ i)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4375	and"j \<le> i"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4376	shows "f $ j = g $ j"
54263 c4159fe6fa46 move Lubs from HOL to HOL-Library (replaced by conditionally complete lattices) hoelzl parents: 54230 diff changeset	4377	proof (rule ccontr)
c4159fe6fa46 move Lubs from HOL to HOL-Library (replaced by conditionally complete lattices) hoelzl parents: 54230 diff changeset	4378	assume "f $ j \<noteq> g $ j"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4379	hence "f \<noteq> g" by auto
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4380	with assms have "i < subdegree (f - g)"
62390 842917225d56 more canonical names nipkow parents: 62343 diff changeset	4381	by (simp add: if_split_asm dist_fps_def)
54263 c4159fe6fa46 move Lubs from HOL to HOL-Library (replaced by conditionally complete lattices) hoelzl parents: 54230 diff changeset	4382	also have "\<dots> \<le> j"
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4383	using \<open>f $ j \<noteq> g $ j\<close> by (intro subdegree_leI) simp_all
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	4384	finally show False using \<open>j \<le> i\<close> by simp
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4385	qed
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4386
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4387	lemma nth_equal_imp_dist_less:
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4388	assumes "\<And>j. j \<le> i \<Longrightarrow> f $ j = g $ j"
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4389	shows "dist f g < inverse (2 ^ i)"
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4390	proof (cases "f = g")
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4391	case True
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4392	then show ?thesis by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4393	next
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4394	case False
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4395	with assms have "dist f g = inverse (2 ^ subdegree (f - g))"
62390 842917225d56 more canonical names nipkow parents: 62343 diff changeset	4396	by (simp add: if_split_asm dist_fps_def)
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4397	moreover
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4398	from assms and False have "i < subdegree (f - g)"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4399	by (intro subdegree_greaterI) simp_all
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4400	ultimately show ?thesis by simp
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4401	qed
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4402
7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4403	lemma dist_less_eq_nth_equal: "dist f g < inverse (2 ^ i) \<longleftrightarrow> (\<forall>j \<le> i. f $ j = g $ j)"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4404	using dist_less_imp_nth_equal nth_equal_imp_dist_less by blast
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4405
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4406	instance fps :: (comm_ring_1) complete_space
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4407	proof
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 54489 diff changeset	4408	fix X :: "nat \<Rightarrow> 'a fps"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4409	assume "Cauchy X"
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4410	obtain M where M: "\<forall>i. \<forall>m \<ge> M i. \<forall>j \<le> i. X (M i) $ j = X m $ j"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4411	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4412	have "\<exists>M. \<forall>m \<ge> M. \<forall>j\<le>i. X M $ j = X m $ j" for i
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4413	proof -
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4414	have "0 < inverse ((2::real)^i)" by simp
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4415	from metric_CauchyD[OF \<open>Cauchy X\<close> this] dist_less_imp_nth_equal
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4416	show ?thesis by blast
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4417	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4418	then show ?thesis using that by metis
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4419	qed
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4420
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4421	show "convergent X"
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4422	proof (rule convergentI)
61969 e01015e49041 more symbols; wenzelm parents: 61943 diff changeset	4423	show "X \<longlonglongrightarrow> Abs_fps (\<lambda>i. X (M i) $ i)"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4424	unfolding tendsto_iff
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4425	proof safe
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4426	fix e::real assume e: "0 < e"
61969 e01015e49041 more symbols; wenzelm parents: 61943 diff changeset	4427	have "(\<lambda>n. inverse (2 ^ n) :: real) \<longlonglongrightarrow> 0" by (rule LIMSEQ_inverse_realpow_zero) simp_all
61608 a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4428	from this and e have "eventually (\<lambda>i. inverse (2 ^ i) < e) sequentially"
a0487caabb4a subdegree/shift/cutoff and Euclidean ring instance for formal power series eberlm parents: 61585 diff changeset	4429	by (rule order_tendstoD)
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4430	then obtain i where "inverse (2 ^ i) < e"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4431	by (auto simp: eventually_sequentially)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4432	have "eventually (\<lambda>x. M i \<le> x) sequentially"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4433	by (auto simp: eventually_sequentially)
54452 f3090621446e tuned proofs; wenzelm parents: 54263 diff changeset	4434	then show "eventually (\<lambda>x. dist (X x) (Abs_fps (\<lambda>i. X (M i) $ i)) < e) sequentially"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4435	proof eventually_elim
52902 7196e1ce1cd8 tuned proofs; wenzelm parents: 52891 diff changeset	4436	fix x
60501 839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4437	assume x: "M i \<le> x"
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4438	have "X (M i) $ j = X (M j) $ j" if "j \<le> i" for j
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4439	using M that by (metis nat_le_linear)
839169c70e92 tuned proofs; wenzelm parents: 60500 diff changeset	4440	with x have "dist (X x) (Abs_fps (\<lambda>j. X (M j) $ j)) < inverse (2 ^ i)"
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4441	using M by (force simp: dist_less_eq_nth_equal)
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60162 diff changeset	4442	also note \<open>inverse (2 ^ i) < e\<close>
51107 3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4443	finally show "dist (X x) (Abs_fps (\<lambda>j. X (M j) $ j)) < e" .
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4444	qed
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4445	qed
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4446	qed
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4447	qed
3f9dbd2cc475 complete metric for formal power series immler parents: 49962 diff changeset	4448
29911 c790a70a3d19 declare fps_nth as a typedef morphism; clean up instance proofs huffman parents: 29906 diff changeset	4449	end

author	wenzelm
	Tue, 08 Mar 2016 18:38:29 +0100
changeset 62560	498f6ff16804
parent 62481	b5d8e57826df
child 63040	eb4ddd18d635
permissions	-rw-r--r--