Duality of holomorphic functions spaces und smoothing properties of the Bergman projection

Abstract

Let ⊂Cn be a bounded domain with smooth boundary, whose Bergman projection B maps the Sobolev space Hk1() (continuously) into Hk2(). We establish two smoothing results: (i) the full Sobolev norm \|Bf\|k2 is controlled by L2 derivatives of f taken along a single, distinguished direction (of order ≤ k1), and (ii) the projection of a conjugate holomorphic function in L2() is automatically in Hk2(). There are obvious corollaries for when B is globally regular.