Asymptotic properties of Bergman kernels for potentials with Gevrey regularity

Abstract

We study the asymptotic properties of the Bergman kernels associated to tensor powers of a positive line bundle on a compact K\"ahler manifold. We show that if the K\"ahler potential is in Gevrey class Ga for some a>1, then the Bergman kernel accepts a complete asymptotic expansion in a neighborhood of the diagonal of shrinking size k-12+14a+4 for every >0. These improve the earlier results in the subject for smooth potentials, where an expansion exists in a ( kk)12 neighborhood of the diagonal. We obtain our results by finding upper bounds of the form Cm m!2a+2 for the Bergman coefficients bm(x, y) in a fixed neighborhood by the method of BBS. We also show that sharpening these upper bounds would improve the rate of shrinking neighborhoods of the diagonal x=y in our results.