Variational formulas for determinant of Laplacian on higher genus polyhedral surface

Abstract

Let X be a Riemann surface of genus g 1 endowed with a flat conical metric m and let det\, be the ζ-regularized determinant of the Friedrichs Laplacian on (X,m). We derive variational formulas for det\, with respect to conical points and conical angles within a given conformal class. Integration of them leads to an explicit expression for det\, up to moduli dependent factor. The latter, in principle, can be calculated via comparison of the above result with the well-known formulas for the case of flat conical metrics with trivial holonomy.