Holomorphic factorization of determinants of laplacians on Riemann surfaces and a higher genus generalization of Kronecker's first limit formula
Abstract
For a family of compact Riemann surfaces Xt of genus g>1 parametrized by the Schottky space Sg, we define a natural basis for the holomorphic n-differentials on Xt which varies holomorphically with t and generalizes the basis of normalized abelian differentials of the first kind for n=1. We introduce a holomorphic function F(n) on Sg which generalizes the classical product Π(1-qm)2 appearing in the Dedekind eta function for n=1 and g=1. We prove a holomorphic factorization formula expressing the regularized determinant of the Laplacian as a product of |F(n)|2, a holomorphic anomaly depending on the classical Liouville action (a Kahler potential of Sg), and the determinant of the Gram matrix of the natural basis. The factorization formula reduces to Kronecker's first limit formula when n=1 and g=1, and to Zograf's factorization formula for n=1 and g>1.
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