Vertex Sparsifiers for Hyperedge Connectivity

TL;DR

This paper extends vertex sparsifier concepts to hypergraphs, constructing small hypergraph sparsifiers that preserve minimum cuts among terminals efficiently, matching bounds known for normal graphs.

Contribution

It introduces hypergraph vertex sparsifiers for c-hyperedge connectivity with size bounds matching those for normal graphs, and provides efficient construction algorithms.

Findings

Hypergraph sparsifiers with O(kc^3) hyperedges preserve minimum cuts.

Construction algorithms operate in almost-linear time.

Size bounds match those for normal graphs.

Abstract

Recently, Chalermsook et al. [SODA'21(arXiv:2007.07862)] introduces a notion of vertex sparsifiers for $c$-edge connectivity, which has found applications in parameterized algorithms for network design and also led to exciting dynamic algorithms for $c$-edge st-connectivity [Jin and Sun FOCS'21(arXiv:2004.07650)]. We study a natural extension called vertex sparsifiers for $c$-hyperedge connectivity and construct a sparsifier whose size matches the state-of-the-art for normal graphs. More specifically, we show that, given a hypergraph $G=(V,E)$ with $n$ vertices and $m$ hyperedges with $k$ terminal vertices and a parameter $c$, there exists a hypergraph $H$ containing only $O(kc^{3})$ hyperedges that preserves all minimum cuts (up to value $c$) between all subset of terminals. This matches the best bound of $O(kc^{3})$ edges for normal graphs by [Liu'20(arXiv:2011.15101)]. Moreover, $H$ can be constructed in almost-linear $O(p^{1+o(1)} + n(rc\log n)^{O(rc)}\log m)$ time where $r=\max_{e\in E}|e|$ is the rank of $G$ and $p=\sum_{e\in E}|e|$ is the total size of $G$, or in $\text{poly}(m, n)$ time if we slightly relax the size to $O(kc^{3}\log^{1.5}(kc))$ hyperedges.