Moving Seshadri Constants, and Coverings of Varieties of Maximal Albanese Dimension

Abstract

Let X be a smooth projective complex variety of maximal Albanese dimension, and let L X be a big line bundle. We prove that the moving Seshadri constants of the pull-backs of L to suitable finite abelian \'etale covers of X are arbitrarily large. As an application, given any integer k≥ 1, there exists an abelian \'etale cover p X' X such that the adjoint system |KX' + p*L | separates k-jets away from the augmented base locus of p*L, and the exceptional locus of the pull-back of the Albanese map of X under p.