An evaluation of the central value of the automorphic scattering determinant

Abstract

Let M be a finite volume, non-compact hyperbolic Riemann surface, possibly with elliptic fixed points, and let φ(s) denote the automorphic scattering determinant. From the known functional equation φ(s)φ(1-s)=1 one concludes that φ(1/2)2 = 1. However, except for the relatively few instances when φ(s) is explicitly computable, one does not know φ(1/2). In this article we address this problem and prove the following result. Let N and P denote the number of zeros and poles, respectively, of φ(s) in (1/2,∞), counted with multiplicities. Let d(1) be the coefficient of the leading term from the Dirichlet series component of φ(s). Then φ(1/2)=(-1)N+P · sgn(d(1)).