dchrvmasumlem

Description: The sum of the Möbius function multiplied by a non-principal Dirichlet character, divided by n , is bounded. Equation 9.4.16 of Shapiro, p. 379. (Contributed by Mario Carneiro, 12-May-2016)

	Ref	Expression
Hypotheses	rpvmasum.z	\|- Z = ( Z/nZ ` N )
	rpvmasum.l	\|- L = ( ZRHom ` Z )
	rpvmasum.a	\|- ( ph -> N e. NN )
	dchrmusum.g	\|- G = ( DChr ` N )
	dchrmusum.d	\|- D = ( Base ` G )
	dchrmusum.1	\|- .1. = ( 0g ` G )
	dchrmusum.b	\|- ( ph -> X e. D )
	dchrmusum.n1	\|- ( ph -> X =/= .1. )
	dchrmusum.f	\|- F = ( a e. NN \|-> ( ( X ` ( L ` a ) ) / a ) )
	dchrmusum.c	\|- ( ph -> C e. ( 0 [,) +oo ) )
	dchrmusum.t	\|- ( ph -> seq 1 ( + , F ) ~~> T )
	dchrmusum.2	\|- ( ph -> A. y e. ( 1 [,) +oo ) ( abs ` ( ( seq 1 ( + , F ) ` ( \|_ ` y ) ) - T ) ) <_ ( C / y ) )
Assertion	dchrvmasumlem	\|- ( ph -> ( x e. RR+ \|-> sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) ) e. O(1) )

Proof

Step	Hyp	Ref	Expression
1		rpvmasum.z	\|- Z = ( Z/nZ ` N )
2		rpvmasum.l	\|- L = ( ZRHom ` Z )
3		rpvmasum.a	\|- ( ph -> N e. NN )
4		dchrmusum.g	\|- G = ( DChr ` N )
5		dchrmusum.d	\|- D = ( Base ` G )
6		dchrmusum.1	\|- .1. = ( 0g ` G )
7		dchrmusum.b	\|- ( ph -> X e. D )
8		dchrmusum.n1	\|- ( ph -> X =/= .1. )
9		dchrmusum.f	\|- F = ( a e. NN \|-> ( ( X ` ( L ` a ) ) / a ) )
10		dchrmusum.c	\|- ( ph -> C e. ( 0 [,) +oo ) )
11		dchrmusum.t	\|- ( ph -> seq 1 ( + , F ) ~~> T )
12		dchrmusum.2	\|- ( ph -> A. y e. ( 1 [,) +oo ) ( abs ` ( ( seq 1 ( + , F ) ` ( \|_ ` y ) ) - T ) ) <_ ( C / y ) )
13	1 2 3 4 5 6 7 8 9 10 11 12	dchrisumn0	\|- ( ph -> T =/= 0 )
14	13	adantr	\|- ( ( ph /\ x e. RR+ ) -> T =/= 0 )
15		ifnefalse	\|- ( T =/= 0 -> if ( T = 0 , ( log ` x ) , 0 ) = 0 )
16	14 15	syl	\|- ( ( ph /\ x e. RR+ ) -> if ( T = 0 , ( log ` x ) , 0 ) = 0 )
17	16	oveq2d	\|- ( ( ph /\ x e. RR+ ) -> ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + if ( T = 0 , ( log ` x ) , 0 ) ) = ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + 0 ) )
18		fzfid	\|- ( ( ph /\ x e. RR+ ) -> ( 1 ... ( \|_ ` x ) ) e. Fin )
19	7	ad2antrr	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> X e. D )
20		elfzelz	\|- ( n e. ( 1 ... ( \|_ ` x ) ) -> n e. ZZ )
21	20	adantl	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> n e. ZZ )
22	4 1 5 2 19 21	dchrzrhcl	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> ( X ` ( L ` n ) ) e. CC )
23		elfznn	\|- ( n e. ( 1 ... ( \|_ ` x ) ) -> n e. NN )
24	23	adantl	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> n e. NN )
25		vmacl	\|- ( n e. NN -> ( Lam ` n ) e. RR )
26		nndivre	\|- ( ( ( Lam ` n ) e. RR /\ n e. NN ) -> ( ( Lam ` n ) / n ) e. RR )
27	25 26	mpancom	\|- ( n e. NN -> ( ( Lam ` n ) / n ) e. RR )
28	24 27	syl	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> ( ( Lam ` n ) / n ) e. RR )
29	28	recnd	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> ( ( Lam ` n ) / n ) e. CC )
30	22 29	mulcld	\|- ( ( ( ph /\ x e. RR+ ) /\ n e. ( 1 ... ( \|_ ` x ) ) ) -> ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) e. CC )
31	18 30	fsumcl	\|- ( ( ph /\ x e. RR+ ) -> sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) e. CC )
32	31	addridd	\|- ( ( ph /\ x e. RR+ ) -> ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + 0 ) = sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) )
33	17 32	eqtrd	\|- ( ( ph /\ x e. RR+ ) -> ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + if ( T = 0 , ( log ` x ) , 0 ) ) = sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) )
34	33	mpteq2dva	\|- ( ph -> ( x e. RR+ \|-> ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + if ( T = 0 , ( log ` x ) , 0 ) ) ) = ( x e. RR+ \|-> sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) ) )
35	1 2 3 4 5 6 7 8 9 10 11 12	dchrvmasumif	\|- ( ph -> ( x e. RR+ \|-> ( sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) + if ( T = 0 , ( log ` x ) , 0 ) ) ) e. O(1) )
36	34 35	eqeltrrd	\|- ( ph -> ( x e. RR+ \|-> sum_ n e. ( 1 ... ( \|_ ` x ) ) ( ( X ` ( L ` n ) ) x. ( ( Lam ` n ) / n ) ) ) e. O(1) )

Metamath Proof Explorer

Theorem dchrvmasumlem

Proof