fourierdlem77

Description: If H is bounded, then U is bounded. (Contributed by Glauco Siliprandi, 11-Dec-2019)

	Ref	Expression
Hypotheses	fourierdlem77.f	\|- ( ph -> F : RR --> RR )
	fourierdlem77.x	\|- ( ph -> X e. RR )
	fourierdlem77.y	\|- ( ph -> Y e. RR )
	fourierdlem77.w	\|- ( ph -> W e. RR )
	fourierdlem77.h	\|- H = ( s e. ( -u _pi [,] _pi ) \|-> if ( s = 0 , 0 , ( ( ( F ` ( X + s ) ) - if ( 0 < s , Y , W ) ) / s ) ) )
	fourierdlem77.k	\|- K = ( s e. ( -u _pi [,] _pi ) \|-> if ( s = 0 , 1 , ( s / ( 2 x. ( sin ` ( s / 2 ) ) ) ) ) )
	fourierdlem77.u	\|- U = ( s e. ( -u _pi [,] _pi ) \|-> ( ( H ` s ) x. ( K ` s ) ) )
	fourierdlem77.bd	\|- ( ph -> E. a e. RR A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a )
Assertion	fourierdlem77	\|- ( ph -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b )

Proof

Step	Hyp	Ref	Expression
1		fourierdlem77.f	\|- ( ph -> F : RR --> RR )
2		fourierdlem77.x	\|- ( ph -> X e. RR )
3		fourierdlem77.y	\|- ( ph -> Y e. RR )
4		fourierdlem77.w	\|- ( ph -> W e. RR )
5		fourierdlem77.h	\|- H = ( s e. ( -u _pi [,] _pi ) \|-> if ( s = 0 , 0 , ( ( ( F ` ( X + s ) ) - if ( 0 < s , Y , W ) ) / s ) ) )
6		fourierdlem77.k	\|- K = ( s e. ( -u _pi [,] _pi ) \|-> if ( s = 0 , 1 , ( s / ( 2 x. ( sin ` ( s / 2 ) ) ) ) ) )
7		fourierdlem77.u	\|- U = ( s e. ( -u _pi [,] _pi ) \|-> ( ( H ` s ) x. ( K ` s ) ) )
8		fourierdlem77.bd	\|- ( ph -> E. a e. RR A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a )
9		pire	\|- _pi e. RR
10	9	renegcli	\|- -u _pi e. RR
11	10	a1i	\|- ( T. -> -u _pi e. RR )
12	9	a1i	\|- ( T. -> _pi e. RR )
13		pirp	\|- _pi e. RR+
14		neglt	\|- ( _pi e. RR+ -> -u _pi < _pi )
15	13 14	ax-mp	\|- -u _pi < _pi
16	10 9 15	ltleii	\|- -u _pi <_ _pi
17	16	a1i	\|- ( T. -> -u _pi <_ _pi )
18	6	fourierdlem62	\|- K e. ( ( -u _pi [,] _pi ) -cn-> RR )
19	18	a1i	\|- ( T. -> K e. ( ( -u _pi [,] _pi ) -cn-> RR ) )
20	11 12 17 19	evthiccabs	\|- ( T. -> ( E. c e. ( -u _pi [,] _pi ) A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) /\ E. x e. ( -u _pi [,] _pi ) A. y e. ( -u _pi [,] _pi ) ( abs ` ( K ` x ) ) <_ ( abs ` ( K ` y ) ) ) )
21	20	mptru	\|- ( E. c e. ( -u _pi [,] _pi ) A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) /\ E. x e. ( -u _pi [,] _pi ) A. y e. ( -u _pi [,] _pi ) ( abs ` ( K ` x ) ) <_ ( abs ` ( K ` y ) ) )
22	21	simpli	\|- E. c e. ( -u _pi [,] _pi ) A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) )
23	22	a1i	\|- ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) -> E. c e. ( -u _pi [,] _pi ) A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) )
24		simpl	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> a e. RR )
25	6	fourierdlem43	\|- K : ( -u _pi [,] _pi ) --> RR
26	25	ffvelrni	\|- ( c e. ( -u _pi [,] _pi ) -> ( K ` c ) e. RR )
27	26	adantl	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( K ` c ) e. RR )
28	24 27	remulcld	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( a x. ( K ` c ) ) e. RR )
29	28	recnd	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( a x. ( K ` c ) ) e. CC )
30	29	abscld	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( abs ` ( a x. ( K ` c ) ) ) e. RR )
31	29	absge0d	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> 0 <_ ( abs ` ( a x. ( K ` c ) ) ) )
32	30 31	ge0p1rpd	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR+ )
33	32	3ad2antl2	\|- ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) -> ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR+ )
34	33	3adant3	\|- ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) -> ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR+ )
35		nfv	\|- F/ s ph
36		nfv	\|- F/ s a e. RR
37		nfra1	\|- F/ s A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a
38	35 36 37	nf3an	\|- F/ s ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a )
39		nfv	\|- F/ s c e. ( -u _pi [,] _pi )
40		nfra1	\|- F/ s A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) )
41	38 39 40	nf3an	\|- F/ s ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) )
42		simpl11	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ph )
43		simpl12	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> a e. RR )
44	42 43	jca	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( ph /\ a e. RR ) )
45		simpl13	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a )
46		rspa	\|- ( ( A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) <_ a )
47	45 46	sylancom	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) <_ a )
48		simpl2	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> c e. ( -u _pi [,] _pi ) )
49	44 47 48	jca31	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) )
50		rspa	\|- ( ( A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) )
51	50	3ad2antl3	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) )
52		simpr	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> s e. ( -u _pi [,] _pi ) )
53		simp-5l	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ph )
54		simpr	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> s e. ( -u _pi [,] _pi ) )
55	1 2 3 4 5	fourierdlem9	\|- ( ph -> H : ( -u _pi [,] _pi ) --> RR )
56	55	ffvelrnda	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( H ` s ) e. RR )
57	25	ffvelrni	\|- ( s e. ( -u _pi [,] _pi ) -> ( K ` s ) e. RR )
58	57	adantl	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( K ` s ) e. RR )
59	56 58	remulcld	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( ( H ` s ) x. ( K ` s ) ) e. RR )
60	7	fvmpt2	\|- ( ( s e. ( -u _pi [,] _pi ) /\ ( ( H ` s ) x. ( K ` s ) ) e. RR ) -> ( U ` s ) = ( ( H ` s ) x. ( K ` s ) ) )
61	54 59 60	syl2anc	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( U ` s ) = ( ( H ` s ) x. ( K ` s ) ) )
62	61 59	eqeltrd	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( U ` s ) e. RR )
63	62	recnd	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( U ` s ) e. CC )
64	63	abscld	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) e. RR )
65	53 64	sylancom	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) e. RR )
66		simp-5r	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> a e. RR )
67		simpllr	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> c e. ( -u _pi [,] _pi ) )
68	66 67 30	syl2anc	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( a x. ( K ` c ) ) ) e. RR )
69		peano2re	\|- ( ( abs ` ( a x. ( K ` c ) ) ) e. RR -> ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR )
70	68 69	syl	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR )
71	61	fveq2d	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) = ( abs ` ( ( H ` s ) x. ( K ` s ) ) ) )
72	53 71	sylancom	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) = ( abs ` ( ( H ` s ) x. ( K ` s ) ) ) )
73	56	recnd	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( H ` s ) e. CC )
74	73	abscld	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) e. RR )
75	53 74	sylancom	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) e. RR )
76		recn	\|- ( a e. RR -> a e. CC )
77	76	abscld	\|- ( a e. RR -> ( abs ` a ) e. RR )
78	66 77	syl	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` a ) e. RR )
79	57	recnd	\|- ( s e. ( -u _pi [,] _pi ) -> ( K ` s ) e. CC )
80	79	abscld	\|- ( s e. ( -u _pi [,] _pi ) -> ( abs ` ( K ` s ) ) e. RR )
81	80	adantl	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( K ` s ) ) e. RR )
82	26	recnd	\|- ( c e. ( -u _pi [,] _pi ) -> ( K ` c ) e. CC )
83	82	abscld	\|- ( c e. ( -u _pi [,] _pi ) -> ( abs ` ( K ` c ) ) e. RR )
84	67 83	syl	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( K ` c ) ) e. RR )
85	73	absge0d	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> 0 <_ ( abs ` ( H ` s ) ) )
86	53 85	sylancom	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> 0 <_ ( abs ` ( H ` s ) ) )
87	82	absge0d	\|- ( c e. ( -u _pi [,] _pi ) -> 0 <_ ( abs ` ( K ` c ) ) )
88	67 87	syl	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> 0 <_ ( abs ` ( K ` c ) ) )
89	74	ad4ant14	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) e. RR )
90		simpllr	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> a e. RR )
91	77	ad3antlr	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` a ) e. RR )
92		simplr	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) <_ a )
93	90	leabsd	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> a <_ ( abs ` a ) )
94	89 90 91 92 93	letrd	\|- ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) <_ ( abs ` a ) )
95	94	ad4ant14	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( H ` s ) ) <_ ( abs ` a ) )
96		simplr	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) )
97	75 78 81 84 86 88 95 96	lemul12bd	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( ( abs ` ( H ` s ) ) x. ( abs ` ( K ` s ) ) ) <_ ( ( abs ` a ) x. ( abs ` ( K ` c ) ) ) )
98	58	recnd	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( K ` s ) e. CC )
99	73 98	absmuld	\|- ( ( ph /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( ( H ` s ) x. ( K ` s ) ) ) = ( ( abs ` ( H ` s ) ) x. ( abs ` ( K ` s ) ) ) )
100	53 99	sylancom	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( ( H ` s ) x. ( K ` s ) ) ) = ( ( abs ` ( H ` s ) ) x. ( abs ` ( K ` s ) ) ) )
101	76	adantr	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> a e. CC )
102	27	recnd	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( K ` c ) e. CC )
103	101 102	absmuld	\|- ( ( a e. RR /\ c e. ( -u _pi [,] _pi ) ) -> ( abs ` ( a x. ( K ` c ) ) ) = ( ( abs ` a ) x. ( abs ` ( K ` c ) ) ) )
104	66 67 103	syl2anc	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( a x. ( K ` c ) ) ) = ( ( abs ` a ) x. ( abs ` ( K ` c ) ) ) )
105	97 100 104	3brtr4d	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( ( H ` s ) x. ( K ` s ) ) ) <_ ( abs ` ( a x. ( K ` c ) ) ) )
106	72 105	eqbrtrd	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) <_ ( abs ` ( a x. ( K ` c ) ) ) )
107	68	ltp1d	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( a x. ( K ` c ) ) ) < ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) )
108	65 68 70 106 107	lelttrd	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) < ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) )
109	65 70 108	ltled	\|- ( ( ( ( ( ( ph /\ a e. RR ) /\ ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) ) /\ ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) )
110	49 51 52 109	syl21anc	\|- ( ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) /\ s e. ( -u _pi [,] _pi ) ) -> ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) )
111	110	ex	\|- ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) -> ( s e. ( -u _pi [,] _pi ) -> ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) ) )
112	41 111	ralrimi	\|- ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) -> A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) )
113		breq2	\|- ( b = ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) -> ( ( abs ` ( U ` s ) ) <_ b <-> ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) ) )
114	113	ralbidv	\|- ( b = ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) -> ( A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b <-> A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) ) )
115	114	rspcev	\|- ( ( ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) e. RR+ /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ ( ( abs ` ( a x. ( K ` c ) ) ) + 1 ) ) -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b )
116	34 112 115	syl2anc	\|- ( ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) /\ c e. ( -u _pi [,] _pi ) /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) ) -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b )
117	116	rexlimdv3a	\|- ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) -> ( E. c e. ( -u _pi [,] _pi ) A. s e. ( -u _pi [,] _pi ) ( abs ` ( K ` s ) ) <_ ( abs ` ( K ` c ) ) -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b ) )
118	23 117	mpd	\|- ( ( ph /\ a e. RR /\ A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a ) -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b )
119	118	rexlimdv3a	\|- ( ph -> ( E. a e. RR A. s e. ( -u _pi [,] _pi ) ( abs ` ( H ` s ) ) <_ a -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b ) )
120	8 119	mpd	\|- ( ph -> E. b e. RR+ A. s e. ( -u _pi [,] _pi ) ( abs ` ( U ` s ) ) <_ b )

Metamath Proof Explorer

Theorem fourierdlem77

Proof