Koshliakov kernel and identities involving the Riemann zeta function
arXiv:1505.01552
Abstract
Some integral identities involving the Riemann zeta function and functions reciprocal in a kernel involving the Bessel functions $J_{z}(x), Y_{z}(x)$ and $K_{z}(x)$ are studied. Interesting special cases of these identities are derived, one of which is connected to a well-known transformation due to Ramanujan, and Guinand.
21 pages, 5 figures; submitted for publication