The unavoidable drawings of complete multipartite graphs
Abstract
In a simple drawing of a graph every pair of edges intersect each other in at most one point, which is either a common endvertex or a proper crossing. For each positive integer n, Negami identified a drawing Bn of the complete bipartite graph Kn,n, and proved that if N is sufficiently large, then every drawing of KN,N contains a drawing of Kn,n weakly isomorphic to Bn. Thus Bn is (up to weak isomorphism) the only unavoidable drawing of Kn,n. We extend this result to complete multipartite graphs, characterizing their unavoidable drawings.
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