Helly numbers of Algebraic Subsets of Rd

Abstract

We study S-convex sets, which are the geometric objects obtained as the intersection of the usual convex sets in Rd with a proper subset S⊂ Rd. We contribute new results about their S-Helly numbers. We extend prior work for S= Rd, Zd, and Zd-k× Rk; we give sharp bounds on the S-Helly numbers in several new cases. We considered the situation for low-dimensional S and for sets S that have some algebraic structure, in particular when S is an arbitrary subgroup of Rd or when S is the difference between a lattice and some of its sublattices. By abstracting the ingredients of Lov\'asz method we obtain colorful versions of many monochromatic Helly-type results, including several colorful versions of our own results.