The maximum number of k-cliques of 7-connected 1-planar graphs
Abstract
In 2023, Gollin, Hendrey, Methuku, Tompkins and Zhang determined the maximum number of cliques in general 1-planar graphs with order n. Their extremal examples have connectivity at most three, except for a few small orders. At the high-connectivity end, we prove that every n-vertex 7-connected 1-planar graph has at most 4n-12 edges, 4n-16 triangles, and n-6 copies of K4. Hence the total number of cliques is at most 10n-33. All bounds are sharp for infinitely many values of n.
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