The maximum number of odd cycles in a planar graph

Abstract

How many copies of a fixed odd cycle, C2m+1, can a planar graph contain? We answer this question asymptotically for m∈\2,3,4\ and prove a bound which is tight up to a factor of 3/2 for all other values of m. This extends the prior results of Cox--Martin and Lv et al. on the analogous question for even cycles. Our bounds result from a reduction to the following maximum likelihood question: which probability mass μ on the edges of some clique maximizes the probability that m edges sampled independently from μ form either a cycle or a path?