On the Hyperbolic Fractional Sum of the Divisor Function

Abstract

Let τ(n) denote the classical divisor function. In this paper, we consider the hyperbolic fractional sum of the divisor function defined by T(x) = Σn1 n2 ≤slant x τ( [ xn1 n2 ] ) = Σn ≤slant x τ( [ xn ] ) τ(n), where [t] denotes the integral part of the real number t. By establishing new estimates for a class of three-dimensional exponential sums with constant perturbation, we obtain an improved asymptotic formula for T(x). In particular, we show that for any > 0, the error term in the asymptotic expansion of T(x) is bounded by O(x17/30+). This result breaks the 4/7-barrier which corresponds to the application of the classical divisor problem conjecture 1/4+.