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.