Note on a sum involving the divisor function
Abstract
Let d(n) be the divisor function and denote by [t] the integral part of the real number t. In this paper, we prove that Σn≤ x1/cd([xnc])=dcx1/c+O,c (x\(2c+2)/(2c2+5c+2),5/(5c+6)\+), where dc=Σk≥1d(k)(1k1/c-1(k+1)1/c) is a constant. This result constitutes an improvement upon that of Feng.
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