The Mean Square of Divisor Function

Abstract

Let d(n) be the divisor function. In 1916, S. Ramanujan stated but without proof that Σn≤ xd2(n)=xP( x)+E(x), where P(y) is a cubic polynomial in y and E(x)=O(x3 5+ε), where ε is a sufficiently small positive constant. He also stated that, assuming the Riemann Hypothesis(RH), E(x)=O(x1 2+ε). In 1922, B. M. Wilson proved the above result unconditionally. The direct application of the RH would produce E(x)=O(x1 2( x)5 x). In 2003, K. Ramachandra and A. Sankaranarayanan proved the above result without any assumption. In this paper, we shall prove E(x)=O(x1 2( x)5).