About top-degree L2- and L2,loc-Dolbeault cohomologies of complex spaces with pseudoconvex boundary

Abstract

Let X be a complex space of pure-dimension n. For a pseudoconvex relatively compact domain in X with C3-smooth boundary and embedded in a domain of the complex number space, we prove that the L2- and L2,loc-Dolbeault (n,q)-cohomology groups are vanishing for q>0. Thereby, we include the case that the forms have values in a Nakano semi-positive holomorphic vector bundle. Using this local vanishing theorem, we also prove the equivalence of the L2- and L2,loc-Dolbeault (n,q)-cohomology groups of domains Ω=\ρ<0\ in X which are defined by a C3-smooth function ρ which is strictly plurisubharmonic on a neighbourhood of ∂Ω except of finitely many points.