Sobolev regularity of the Bergman and Szeg\"o projections in terms of ∂∂* and ∂b∂b*

Abstract

Let be a smooth bounded pseudoconvex domain in Cn. It is shown that for 0≤ q≤ n, s≥ 0, the embedding jq: dom(∂) dom(∂*) L2(0,q)() is continuous in Ws()--norms if and only if the Bergman projection Pq is (see below for the modification needed for j0). The analogous result for the operators on the boundary is also proved (for n≥ 3). In particular, j1 is always regular in Sobolev norms in C2, notwithstanding the fact that N1 need not be.

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