Szego kernels and Poincare series

Abstract

Let M = M/ be a Kahler manifold, where M is the universal Kahler cover, and where is the deck transformation group. Let (L, h) M be a positive Hermitian holomorophic line bundle. Lift the Hermitian line bundle to M and consider the relation between the orthogonal projection onto holomorphic sections on the quotient and onto L2 holomorphic sections on M. We prove that the quotient Szego kernel is given by the periodization of the L2 Szego kernel of the universal cover, i.e. its sum over the deck group . Although this is a standard result for symmetric spaces (it is used in the Selberg trace formula) and is also standard for heat and wave kernels, it seems that a proof of the sum over Gamma formula was lacking for Szego kernels of positive line bundles over general Kahler manifolds. We apply the result to give a simple proof of Napier's theorem on the holomorphic convexity of M with respect to LN and to surjectivity of Poincar\'e series. We also simplify the discussion of Poincare series in Kollar's book.