Inequalities for Taylor series involving the divisor function

Abstract

Let T(q)=Σk=1∞ d(k) qk, |q|<1, where d(k) denotes the number of positive divisors of the natural number k. We present monotonicity properties of functions defined in terms of T. More specifically, we proved that H(q) := T(q)- (1-q)(q) is strictly increasing in (0,1) while F(q) := 1-qq \,H(q) is strictly decreasing in (0,1) . These results are then applied to obtain various inequalities, one of which states that the double-inequality α \,q1-q+(1-q)(q) < T(q)< β \,q1-q+(1-q)(q), 0<q<1, holds with the best possible constant factors α=γ and β=1. Here, γ denotes Euler's constant. This refines a result of Salem, who proved the inequalities with α=1/2 and β=1.