Continuous CM-regularity and generic vanishing
Abstract
We study the continuous CM-regularity of torsion-free coherent sheaves on polarized irregular smooth projective varieties , 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 -regular such sheaf is GV. Here we answer the question in the affirmative for many pairs which includes the case of any polarized abelian variety. Moreover, for these pairs, we show that if is continuously -regular for some integer , then is a GV sheaf. Further, we extend the notion of continuous CM-regularity to a real valued function on the -twisted bundles on polarized abelian varieties , and we show that this function can be extended to a continuous function on . We also provide syzygetic consequences of our results for on associated to a -regular bundle on polarized abelian varieties. In particular, we show that satisfies property if the base-point freeness threshold of the class of in is less than . This result is obtained using a theorem in the Appendix written by Atsushi Ito.
Keywords
Cite
@article{arxiv.2208.13096,
title = {Continuous CM-regularity and generic vanishing},
author = {Debaditya Raychaudhury},
journal= {arXiv preprint arXiv:2208.13096},
year = {2023}
}
Comments
With an appendix by Atsushi Ito; v2: title changed, this is the second half of the previous submission, which includes the appendix. Final version, accepted for publication in Advances in Geometry