Optimal L2 Extensions of Openness Type

Abstract

We study the following optimal L2 extension problem of openness type: given a complex manifold M, a closed subvariety S⊂ M and a holomorphic vector bundle E→ M, for any L2 holomorphic section f defined on some open neighborhood U of S, find an L2 holomorphic section F on M such that F|S = f|S, and the L2 norm of F on M is optimally controlled by the L2 norm of f on U. Answering the above problem, we prove an optimal L2 extension theorem of openness type on weakly pseudoconvex K\"ahler manifolds, which generalizes a couple of known results on such a problem. Moreover, we prove a product property for certain minimal L2 extensions and give an alternative proof to a version of the above L2 extension theorem. We also present some applications to the usual optimal L2 extension problem and the equality part of Suita's conjecture.