Configuration types and cubic surfaces
Abstract
This paper is a sequel to the paper \cite{refGH}. We relate the matroid notion of a combinatorial geometry to a generalization which we call a configuration type. Configuration types arise when one classifies the Hilbert functions and graded Betti numbers for fat point subschemes supported at essentially distinct points of the projective plane. Each type gives rise to a surface obtained by blowing up the points. We classify those types such that and is nef. The surfaces obtained are precisely the desingularizations of the normal cubic surfaces. By classifying configuration types we recover in all characteristics the classification of normal cubic surfaces, which is well-known in characteristic 0 \cite{refBW}. As an application of our classification of configuration types, we obtain a numerical procedure for determining the Hilbert function and graded Betti numbers for the ideal of any fat point subscheme such that the points are essentially distinct and is nef, given only the configuration type of the points and the coefficients .
Cite
@article{arxiv.1204.3015,
title = {Configuration types and cubic surfaces},
author = {E. Guardo and B. Harbourne},
journal= {arXiv preprint arXiv:1204.3015},
year = {2012}
}
Comments
14 pages, final version