On the Number of Pentagons in Triangle-Free Graphs
arXiv:1102.1634 · doi:10.1016/j.jcta.2012.12.008
Abstract
Using the formalism of flag algebras, we prove that every triangle-free graph $G$ with $n$ vertices contains at most $(n/5)^5$ cycles of length five. Moreover, the equality is attained only when $n$ is divisible by five and $G$ is the balanced blow-up of the pentagon. We also compute the maximal number of pentagons and characterize extremal graphs in the non-divisible case provided $n$ is sufficiently large. This settles a conjecture made by ErdÅs in 1984.
16 pages, accepted to Journal of Combinatorial Theory Ser. A