Superzeta functions, regularized products, and the Selberg zeta function on hyperbolic manifolds with cusps

Abstract

Let = \λk\ denote a sequence of complex numbers and assume that that the counting function #\λk ∈ : | λk| < T\ =O(Tn) for some integer n. From Hadamard's theorem, we can construct an entire function f of order at most n such that is the divisor f. In this article we prove, under reasonably general conditions, that the superzeta function f(s,z) associated to admits a meromorphic continuation. Furthermore, we describe the relation between the regularized product of the sequence z- and the function f as constructed as a Weierstrass product. In the case f admits a Dirichlet series expansion in some right half-plane, we derive the meromorphic continuation in s of f(s,z) as an integral transform of f'/f. We apply these results to obtain superzeta product evaluations of Selberg zeta function associated to finite volume hyperbolic manifolds with cusps.