Extension of Jets With L2 Estimates, and an Application

Abstract

We study the problem of extension of normal jets from a hypersurface, with focus on the growth order of the constant. Using aspects of the standard, twisted approach for L2 extension and of the new approach to L2 extension introduced by Berndtsson and Lempert, we are able to obtain an extension theorem with a constant Ck where C is universal and k is the jet order. We then use the jet extension theorem to extend positively curved singular Hermitian metrics from smooth, deformably pseudoeffective hypersurfaces in projective manifolds.