Hilbert-Kunz density functions and $F$-thresholds
Abstract
We had shown earlier that for a standard graded ring and a graded ideal in characteristic , with , there exists a compactly supported continuous function whose Riemann integral is the HK multiplicity . We explore further some other invariants, namely the shape of the graph of (where is the graded maximal ideal of ) and the maximum support (denoted as ) of . In case is a domain of dimension , we prove that is a regular ring if and only if has a symmetry , for all . If is strongly -regular on the punctured spectrum then we prove that the -threshold coincides with . As a consequence, if is a two dimensional domain and is generated by homogeneous elements of the same degree, thene have (1) a formula for the -threshold in terms of the minimum strong Harder-Narasimahan slope of the syzygy bundle and (2) a well defined notion of the -threshold in characteristic . This characterisation readily computes , for the set of all irreducible plane trinomials , where and .
Cite
@article{arxiv.1808.04093,
title = {Hilbert-Kunz density functions and $F$-thresholds},
author = {Vijaylaxmi Trivedi and Kei-Ichi Watanabe},
journal= {arXiv preprint arXiv:1808.04093},
year = {2020}
}
Comments
23 pages, This paper is the first part of arXiv:1808.04093, which is now divided into two parts. The part containing exclusively the two dimensional case has been removed and will be posted as another paper