English

On Hypergraph Supports

Combinatorics 2024-02-05 v2 Discrete Mathematics

Abstract

Let H=(X,E)\mathcal{H}=(X,\mathcal{E}) be a hypergraph. A support is a graph QQ on XX such that for each EEE\in\mathcal{E}, the subgraph of QQ induced on the elements in EE is connected. In this paper, we consider hypergraphs defined on a host graph. Given a graph G=(V,E)G=(V,E), with c:V{r,b}c:V\to\{\mathbf{r},\mathbf{b}\}, and a collection of connected subgraphs H\mathcal{H} of GG, a primal support is a graph QQ on b(V)\mathbf{b}(V) such that for each HHH\in \mathcal{H}, the induced subgraph Q[b(H)]Q[\mathbf{b}(H)] on vertices b(H)=Hc1(b)\mathbf{b}(H)=H\cap c^{-1}(\mathbf{b}) is connected. A \emph{dual support} is a graph QQ^* on H\mathcal{H} s.t. for each vXv\in X, the induced subgraph Q[Hv]Q^*[\mathcal{H}_v] is connected, where Hv={HH:vH}\mathcal{H}_v=\{H\in\mathcal{H}: v\in H\}. We present sufficient conditions on the host graph and hyperedges so that the resulting support comes from a restricted family. We primarily study two classes of graphs: (1)(1) If the host graph has genus gg and the hypergraphs satisfy a topological condition of being \emph{cross-free}, then there is a primal and a dual support of genus at most gg. (2)(2) If the host graph has treewidth tt and the hyperedges satisfy a combinatorial condition of being \emph{non-piercing}, then there exist primal and dual supports of treewidth O(2t)O(2^t). We show that this exponential blow-up is sometimes necessary. As an intermediate case, we also study the case when the host graph is outerplanar. Finally, we show applications of our results to packing and covering, and coloring problems on geometric hypergraphs.

Keywords

Cite

@article{arxiv.2303.16515,
  title  = {On Hypergraph Supports},
  author = {Rajiv Raman and Karamjeet Singh},
  journal= {arXiv preprint arXiv:2303.16515},
  year   = {2024}
}
R2 v1 2026-06-28T09:39:24.937Z