Bounding the number of odd paths in planar graphs via convex optimization

Abstract

Let NP(n,H) denote the maximum number of copies of H in an n vertex planar graph. The problem of bounding this function for various graphs H has been extensively studied since the 70's. A special case that received a lot of attention recently is when H is the path on 2m+1 vertices, denoted P2m+1. Our main result in this paper is that NP(n,P2m+1)=O(m-mnm+1)\;. This improves upon the previously best known bound by a factor em, which is best possible up to the hidden constant, and makes a significant step towards resolving conjectures of Gosh et al. and of Cox and Martin. The proof uses graph theoretic arguments together with (simple) arguments from the theory of convex optimization.