The Log term in the Bergman and Szeg o kernels in strictly pseudoconvex domains in C2

Abstract

In this paper, we consider bounded strictly pseudoconvex domains D⊂ C2 with smooth boundary M=M3:=∂ D. If we consider the asymptotic expansion of the Bergman kernel on the diagonal KB φBn+1+B, where >0 is a Fefferman defining equation for D, then it is well known that the trace of the log term bB:=(B)|M on M does not determine the CR geometry of M locally; e.g., the vanishing of bB on an open subset of M does not imply that M is locally spherical there. Nevertheless, the main result in this paper is that if D⊂ C2 is assumed to have transverse symmetry, then the global vanishing of bB on M implies that M is locally spherical. A similar result is proved for the Szeg o kernel.