$F$-thresholds $c^I({\bf m})$ for projective curves
Abstract
We show that if is a two dimensional standard graded ring (with the graded maximal ideal ) of characteristic and is a graded ideal with then the -threshold can be expressed in terms of a strong HN (Harder-Narasimahan) slope of the canonical syzygy bundle on . Thus is a rational number. This gives us a well defined notion, of the -threshold in characteristic , in terms of a HN slope of the syzygy bundle on . This generalizes our earlier result (in [TrW]) where we have shown that if has homogeneous generators of the same degree, then the -threshold is expressed in terms of the minimal strong HN slope (in char ) and in terms of the minimal HN slope (in char ), respectively, of the canonical syzygy bundle on . Here we also prove that, for a given pair over a field of characteristic , if is a reduction mod of then implies has in the denominator, for almost all .
Keywords
Cite
@article{arxiv.2007.12394,
title = {$F$-thresholds $c^I({\bf m})$ for projective curves},
author = {Vijaylaxmi Trivedi},
journal= {arXiv preprint arXiv:2007.12394},
year = {2020}
}
Comments
21 pages, This paper is the second part of the paper arXiv:1808.04093 v1, which is now divided into two parts. The first part is now posted as arXiv:1808.04093 v2