Counting paths, cycles and blow-ups in planar graphs

Abstract

For a planar graph H, let N P(n,H) denote the maximum number of copies of H in an n-vertex planar graph. In this paper, we prove that N P(n,P7)4 27n4, N P(n,C6)(n/3)3, N P(n,C8)(n/4)4 and N P(n,K4\1\)(n/6)6, where K4\1\ is the 1-subdivision of K4. In addition, we obtain significantly improved upper bounds on N P(n,P2m+1) and N P(n,C2m) for m≥ 4. For a wide class of graphs H, the key technique developed in this paper allows us to bound N P(n,H) in terms of an optimization problem over weighted graphs.

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