Sums Over Primes II

Abstract: In this paper, we give explicit asymptotic formulas for some sums over primes involving generalized alternating hyperharmonic numbers of types I, II and III. Analogous results for numbers with $k$-prime factors will also be considered.

“…The motivation of this paper arises from an exercise in Granville's book [5] and the author's recent work [14] on generalized alternating hyperharmonic numbers H (p,r,2,1) n and H (p,r,1,2) n . This paper is a continuation of the previous papers of the author with the same title [12,15]. In this paper, we will derive explicit asymptotic formulas for some sums over primes involving generalized alternating hyperharmonic numbers of types H (p,r,2,1) n and H (p,r,1,2) n .…”

“…Lemma 3 ( [7,12]). Let p n,k denote the nth squarefree number with just k prime factors and q n,k denote the nth number with k prime factors counted with multiplicity.…”

“…The author [12,15] considered the sum involving generalized hyperharmonic numbers of type pn≤x p α n (H (p,r) n…”

Sums over primes III

“…The motivation of this paper arises from an exercise in Granville's book [5] and the author's recent work [14] on generalized alternating hyperharmonic numbers H (p,r,2,1) n and H (p,r,1,2) n . This paper is a continuation of the previous papers of the author with the same title [12,15]. In this paper, we will derive explicit asymptotic formulas for some sums over primes involving generalized alternating hyperharmonic numbers of types H (p,r,2,1) n and H (p,r,1,2) n .…”

“…Lemma 3 ( [7,12]). Let p n,k denote the nth squarefree number with just k prime factors and q n,k denote the nth number with k prime factors counted with multiplicity.…”

“…The author [12,15] considered the sum involving generalized hyperharmonic numbers of type pn≤x p α n (H (p,r) n…”

Sums over primes III