Complete Asymptotic Expansion of the Additive Mertens Sum Sk(x)

Abstract

Let p1, …c, pk be primes not exceeding x (k ≥slant 2), and define the additive Mertens sum \[ Sk(x) = Σp1 ≤slant x ·s Σpk ≤slant x 1p1 + …m + pk. \] In contrast to Tenenbaum's generalized (multiplicative) Mertens sum, whose leading term has order ( x)k, the sum Sk(x) has leading term of order xk-1/k x. We establish the complete asymptotic expansion \[ Sk(x) = xk-1k x Σn=0N Ek,nn x + O(xk-1k+N+1 x) (∀\, N ≥slant 0), \] where the coefficients are given by absolutely convergent multiple logarithmic integrals \[ Ek,n = (-1)n ∫(0,1]k hn( t1, …c, tk)t1 + …m + tk\, dt, \] with hn the complete homogeneous symmetric polynomial of degree n. We give closed-form expressions for the first two coefficients Ek,0 and Ek,1 for all k, and obtain the closed form for the diagonal part of the third coefficient Ek,2 (with Ek,2 fully explicit for k ≤slant 4); consequently, the first three terms of the expansions of S2(x) and S3(x) are fully explicit. For k = 2, we further obtain a closed-form expression for the entire sequence \E2,n\n ≥slant 0, whose values are explicit Q-linear combinations of 2 and zeta values ζ(j). The proofs rely on the real-variable form of the prime number theorem, variable rescaling, and multivariate Taylor remainder estimates.

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