Induced Minors and Region Intersection Graphs
Abstract
We show that for any positive integers g and t, there is a K6(1)-induced-minor-free graph of girth at least g that is not a region intersection graph over the class of Kt-minor-free graphs. This answers in a strong form the recently raised question of whether for every graph H there is a graph H' such that H-induced-minor-free graphs are region intersection graphs over H'-minor-free graphs.
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