Sobolev Regularity of the Bergman Projection on a Smoothly Bounded Stein Domain that is not Hyperconvex

Abstract

For every 0<r<12, we will construct a flat K\"ahler manifold M and a relatively compact domain with smooth boundary ⊂ M that is Stein but not hyperconvex such that the Bergman projection P on is regular in the L2 Sobolev space Ws() for all 0≤ s<r but irregular in Wr(). On these domains, we will also construct f∈ C∞() such that Pf C∞(). We will prove the same result for the invariant Bergman projection on (2,0)-forms. These domains are modelled on a construction of Diederich and Ohsawa.