Dense, irregular, yet always graphic $3$-uniform hypergraph degree sequences
Abstract
A -uniform hypergraph is a generalization of simple graphs where each hyperedge is a subset of vertices of size . The degree of a vertex in a hypergraph is the number of hyperedges incident with it. The degree sequence of a hypergraph is the sequence of the degrees of its vertices. The degree sequence problem for -uniform hypergraphs is to decide if a -uniform hypergraph exists with a prescribed degree sequence. Such a hypergraph is called a realization. Recently, Deza \emph{et al.} proved that the degree sequence problem for -uniform hypergraphs is NP-complete. Some special cases are easy; however, polynomial algorithms have been known so far only for some very restricted degree sequences. The main result of our research is the following. If all degrees are between and in a degree sequence , further, the number of vertices is at least , and the degree sum can be divided by , then has a -uniform hypergraph realization. Our proof is constructive and in fact, it constructs a hypergraph realization in polynomial time for any degree sequence satisfying the properties mentioned above. To our knowledge, this is the first polynomial running time algorithm to construct a -uniform hypergraph realization of a highly irregular and dense degree sequence.
Keywords
Cite
@article{arxiv.2312.00555,
title = {Dense, irregular, yet always graphic $3$-uniform hypergraph degree sequences},
author = {Runze Li and Istvan Miklos},
journal= {arXiv preprint arXiv:2312.00555},
year = {2023}
}