On Determinants of Laplacians on Compact Riemann Surfaces Equipped with Pullbacks of Conical Metrics by Meromorphic Functions

Abstract

Let m be any conical (or smooth) metric of finite volume on the Riemann sphere CP1. On a compact Riemann surface X of genus g consider a meromorphic funciton f: X CP1 such that all poles and critical points of f are simple and no critical value of f coincides with a conical singularity of m or \∞\. The pullback f* m of m under f has conical singularities of angles 4π at the critical points of f and other conical singularities that are the preimages of those of m. We study the ζ-regularized determinant Det' F of the (Friedrichs extension of) Laplace-Beltrami operator on (X,f* m) as a functional on the moduli space of pairs (X, f) and obtain an explicit formula for Det' F.