On graph classes with minor-universal elements

Abstract

A graph U is universal for a graph class C U, if every G∈ C is a minor of U. We prove the existence or absence of universal graphs in several natural graph classes, including graphs component-wise embeddable into a surface, and graphs forbidding K5, or K3,3, or K∞ as a minor. We prove the existence of uncountably many minor-closed classes of countable graphs that (do and) do not have a universal element. Some of our results and questions may be of interest to the finite graph theorist. In particular, one of our side-results is that every K5-minor-free graph is a minor of a K5-minor-free graph of maximum degree 22.

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