Integer points in the degree-sequence polytope

Abstract

An integer vector b ∈ Zd is a degree sequence if there exists a hypergraph with vertices \1,…,d\ such that each bi is the number of hyperedges containing i. The degree-sequence polytope Zd is the convex hull of all degree sequences. We show that all but a 2-(d) fraction of integer vectors in the degree sequence polytope are degree sequences. Furthermore, the corresponding hypergraph of these points can be computed in time 2O(d) via linear programming techniques. This is substantially faster than the 2O(d2) running time of the current-best algorithm for the degree-sequence problem. We also show that for d≥ 98, the degree-sequence polytope Zd contains integer points that are not degree sequences. Furthermore, we prove that the linear optimization problem over Zd is NP-hard. This complements a recent result of Deza et al. (2018) who provide an algorithm that is polynomial in d and the number of hyperedges.