The determinant of the Lax-Phillips scattering operator

Abstract

Let M denote a finite volume, non-compact Riemann surface without elliptic points, and let B denote the Lax-Phillips scattering operator. Using the superzeta function approach due to Voros, we define a Hurwitz-type zeta function ζB(s,z) constructed from the resonances associated to zI -[ (1/2)I B]. We prove the meromorphic continuation in s of ζB(s,z) and, using the special value at s=0, define a determinant of the operators zI -[ (1/2)I B]. We obtain expressions for Selberg's zeta function and the determinant of the scattering matrix in terms of the operator determinants.