An Intersection Matrix for Affine Hyperplane Arrangements
Abstract
For a real affine hyperplane arrangement, we define an integer intersection matrix with a natural -deformation related to the intersections of bounded chambers of the arrangement. By connecting the integer matrix to a bilinear form of Schechtman-Varchenko, we show that there is a closed formula for its determinant that only depends on the combinatorics of the underlying matroid. We conjecture an analogous formula for its -deformation. Our work also applies more generally in the setting of affine oriented matroids. Additionally, we give a representation-theoretic interpretation of our -intersection matrix using Braden-Licata-Proudfoot-Websters's hypertoric category (or more generally Kowalenko-Mautner's category for oriented matroid programs). This paper is part of a broader program to categorify matroidal Schur algebras defined by Braden-Mautner.
Cite
@article{arxiv.2407.06008,
title = {An Intersection Matrix for Affine Hyperplane Arrangements},
author = {Jens Niklas Eberhardt and Carl Mautner},
journal= {arXiv preprint arXiv:2407.06008},
year = {2024}
}