The role of twins in computing planar supports of hypergraphs

Abstract

A support or realization of a hypergraph H is a graph G on the same vertex as H such that for each hyperedge of H it holds that its vertices induce a connected subgraph of G. The NP-hard problem of finding a planar support has applications in hypergraph drawing and network design. Previous algorithms for the problem assume that twins -- pairs of vertices that are in precisely the same hyperedges -- can safely be removed from the input hypergraph. We prove that this assumption is generally wrong, yet that the number of twins necessary for a hypergraph to have a planar support only depends on its number of hyperedges. We give an explicit upper bound on the number of twins necessary for a hypergraph with m hyperedges to have an r-outerplanar support, which depends only on r and m. Since all additional twins can be safely removed, we obtain a linear-time algorithm for computing r-outerplanar supports for hypergraphs with m hyperedges if m and r are constant; in other words, the problem is fixed-parameter linear-time solvable with respect to the parameters m and r.