Title of article :
Meromorphic Continuation of the Spectral Zeta Kernel
Author/Authors :
omenyi, louis federal university - department of mathematics, computer science, statistics and informatics, Nigeria
Abstract :
The meromorphic extension of spectral zeta kernel, (g(s,x,x), of the Laplacian on a Riemannian manifold, (M,g), is constructed using a relationship between the zeta kernel and the heat kernel. This construction is facilitated by the analytic properties of the Mellin transform of measurable functions on Riemannian manifolds. The pole structure of the spectral zeta function is highlighted from the relationship between it and the zeta kernel.
Keywords :
Laplacian , Zeta function , Zeta kernel , Heat kernel , Mellin Transform , Meromorphic Extension
Journal title :
General Mathematics Notes
Journal title :
General Mathematics Notes
