On the Riemann-Hardy hypothesis for the Ramanujan zeta function

Abstract

The Ramanujan zeta function was in 1916 proposed by an Indian mathematician Srinivasa Ramanujan. As an analogue of the Riemann hypothesis, an English mathematician Godfrey Harold Hardy proposed in 1940 that the real part of all complex zeros of the Ramanujan zeta function is 6. This is the well-known Riemann-Hardy hypothesis for the Ramanujan zeta function. This article is devoted to the proof of this hypothesis derived from the Ramanujan-Rankin function. Owing to the integral representation of the Ramanujan-De Bruijn function, we establish its series. We also reduce its product using the Hadamard's factorization theorem. By a class with its series and product representations, we conclude that the real part of all zeros for Ramanujan-De Bruijn function is zero. we also obtain its products of Conrey and Ghosh and Hadamard-type for the Ramanujan-Rankin function. Based on the obtained result, we prove that the Riemann-Hardy hypothesis is true.