Edge-Isoperimetric Inequalities in Chamber Graphs of Hyperplane Arrangements

Abstract

We study edge-isoperimetric inequalities in chamber graphs of affine hyperplane arrangements. Our approach is topological: to a set of chambers we associate its thickening in Euclidean space and estimate its edge boundary through the induced stratification by intersections of arrangement hyperplanes. This yields general lower bounds for a broad class of sets. We show that a convex set of chambers of size Σi=0d ki, with k d-1, has edge boundary at least Σi=0d-1ki, and we conjecture that convex sets minimize the edge boundary among all chamber sets of a fixed size. We verify this conjecture in dimension 2. Our main result is a three-dimensional asymptotic inequality for arbitrary subsets of chambers: for arrangements in general position, every set S occupying at most a fixed proportion of the chambers satisfies |∂ S|=(|S|2/3). As a consequence, for an arrangement of n hyperplanes in general position in R3, the lazy simple random walk on the chamber graph has -mixing time O(n2(n/)).