Hypergraph Representation via Axis-Aligned Point-Subspace Cover

Abstract

We propose a new representation of k-partite, k-uniform hypergraphs, that is, a hypergraph with a partition of vertices into k parts such that each hyperedge contains exactly one vertex of each type; we call them k-hypergraphs for short. Given positive integers , d, and k with ≤ d-1 and k=d, any finite set P of points in Rd represents a k-hypergraph GP as follows. Each point in P is covered by k many axis-aligned affine -dimensional subspaces of Rd, which we call -subspaces for brevity and which form the vertex set of GP. We interpret each point in P as a hyperedge of GP that contains each of the covering -subspaces as a vertex. The class of (d,)-hypergraphs is the class of k-hypergraphs that can be represented in this way. The resulting classes of hypergraphs are fairly rich: Every k-hypergraph is a (k,k-1)-hypergraph. On the other hand, (d,)-hypergraphs form a proper subclass of the class of all k-hypergraphs for <d-1. In this paper we give a natural structural characterization of (d,)-hypergraphs based on vertex cuts. This characterization leads to a poly\-nomial-time recognition algorithm that decides for a given k-hypergraph whether or not it is a (d,)-hypergraph and that computes a representation if existing. We assume that the dimension d is constant and that the partitioning of the vertex set is prescribed.