Complex Links and Hilbert-Samuel Multiplicities
Abstract
We describe a framework for estimating Hilbert-Samuel multiplicities for pairs of projective varieties from finite point samples rather than defining equations. The first step involves proving that this multiplicity remains invariant under certain hyperplane sections which reduce to a point and to a curve . Next, we establish that equals the Euler characteristic (and hence, the cardinality) of the complex link of in . Finally, we provide explicit bounds on the number of uniform point samples needed (in an annular neighborhood of in ) to determine this Euler characteristic with high confidence.
Cite
@article{arxiv.2006.10452,
title = {Complex Links and Hilbert-Samuel Multiplicities},
author = {Martin Helmer and Vidit Nanda},
journal= {arXiv preprint arXiv:2006.10452},
year = {2021}
}
Comments
16 pages, 7 figures. This is a major revision. There is a problem with the Lefschetz theorem from Sec 6 of v1: it applies not to the usual complex linking space but to a projective version thereof (which has a very different topology in general). We have removed the old Sec 6 and replaced it with a new theorem on inferring multiplicities from point samples with high confidence