Lower Bounds for Induced-Universal Graphs

Abstract

We give a series of new lower bounds on the minimum number of vertices required by a graph to contain every graph of a given family as induced subgraph. In particular, we show that this induced-universal graph for n-vertex planar graphs must have at least 10.52n vertices. We also show that the number of conflicting graphs to consider in order to beat this lower bound is at least 137. In other words, any family of less than 137 planar graphs of n vertices has an induced-universal graph with less than 10.52n vertices, stressing the difficulty in beating such lower bounds. Similar results are developed for other graph families, including but not limited to, trees, outerplanar graphs, series-parallel graphs, K3,3-minor free graphs. As a byproduct, we show that any family of t graphs of n vertices having small chromatic number and sublinear pathwidth, like any proper minor-closed family, has an induced-universal graph with less than 157 t · n vertices. This is achieved by making a bridge between equitable colorings, combinatorial designs, and path-decompositions.