Continuous CM-regularity and generic vanishing

Abstract

We study the continuous CM-regularity of torsion-free coherent sheaves on polarized irregular smooth projective varieties (X,OX(1)), and its relation with the theory of generic vanishing. This continuous variant of the Castelnuovo-Mumford regularity was introduced by Mustopa, and he raised the question whether a continuously 1-regular such sheaf F is GV. Here we answer the question in the affirmative for many pairs (X,OX(1)) which includes the case of any polarized abelian variety. Moreover, for these pairs, we show that if F is continuously k-regular for some integer 1≤ k≤ X, then F is a GV-(k-1) sheaf. Further, we extend the notion of continuous CM-regularity to a real valued function on the Q-twisted bundles on polarized abelian varieties (X,OX(1)), and we show that this function can be extended to a continuous function on N1(X)R. We also provide syzygetic consequences of our results for OP(E)(1) on P(E) associated to a 0-regular bundle E on polarized abelian varieties. In particular, we show that OP(E)(1) satisfies Np property if the base-point freeness threshold of the class of OX(1) in N1(X) is less than 1p+2. This result is obtained using a theorem in the Appendix written by Atsushi Ito.