Excluding disjoint Kuratowski graphs

Abstract

A graph is a ``k-Kuratowski graph'' if it has exactly k components, each isomorphic to K5 or to K3,3. We prove that if a graph G contains no k-Kuratowski graph as a minor,then there is a set X of boundedly many vertices such that G X can be drawn in a (possibly disconnected) surface in which no k-Kuratowski graph can be drawn.

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