Trivariate Splines on Fans of Hyperplane Arrangements and Koszul Homology

Abstract

We study the space of splines Sr(ΣA) where r denotes a smoothness distribution and ΣA is the fan of a central hyperplane arrangement A in R3. This is the first step in the analysis of splines on three-dimensional cross-cut partitions, which naturally generalize planar cross-cut partitions. We show that the Hilbert function of Sr(ΣA) is bounded by an expression that involves the dimensions of specific Koszul homology modules constructed from the defining equations of the hyperplane arrangement A and the smoothness distribution function. By exploiting this connection with Koszul homology, we are able to: 1) compute the dimension of the spline space in high degrees, 2) compute all values of the dimension of the spline space if A is generic with five or fewer hyperplanes, and 3) compute the Hilbert function of the spline space if A is a generic arrangement with sufficiently many hyperplanes and r is a constant distribution. As an application of our methods, we compute S0d(ΣA) and S1d(ΣA) for all values of d when A is a generic arrangement.