Semi-classical asymptotics of partial Bergman kernels on R-symmetric complex manifolds with boundary

Abstract

Let M be a relatively compact connected open subset with smooth connected boundary of a complex manifold M'. Let (L,hL)→ M' be a positive line bundle over M'. Suppose that M' admits a holomorphic R-action which preserves the boundary of M and lifts to L. We establish the asymptotic expansion of a partial Bergman kernel associated to a package of Fourier modes of high frequency with respect to the R-action in the high powers of L. As an application, we establish an R-equivariant analogue of Fefferman's and Bell-Ligocka's result about smooth extension up to the boundary of biholomorphic maps between weakly pseudoconvex domains in Cn. Another application concerns the embedding of pseudoconcave manifolds.