Accurate double inequalities for generalized harmonic numbers

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摘要

For n∈N and p∈R the nth harmonic number of order p H(n,p):=∑k=1n1kpis expressed in the form H(n,p)=H˜q(m,n,p)+Rq(m,n,p)where m,q∈N are parameters controlling the magnitude of the error term. The function H˜q(m,n,p) consists of m+2q+1 simple summands and the remainder Rq(m, n, p) is estimated, for p ≥ 0, as 0≤(−1)q+1Rq(m,n,p)<1π(1−2·4−q)(p2+q−1)πm)2q−1·1mp.Similar result is obtained also for p < 0 and for real zeta function (n=∞, p > 1) as well.

论文关键词:Approximation,Estimate,Euler–Maclaurin summation,Generalized harmonic number,p-series,Zeta-generalized-Euler-constant function

论文评审过程:Received 5 February 2015, Revised 17 April 2015, Accepted 23 April 2015, Available online 4 June 2015, Version of Record 4 June 2015.

论文官网地址:https://doi.org/10.1016/j.amc.2015.04.128