Maximizing five-cycles in Kr-free graphs

Abstract

The Erdos Pentagon problem asks to find an n-vertex triangle-free graph that is maximizing the number of 5-cycles. The problem was solved using flag algebras by Grzesik and independently by Hatami, Hladk\'y, Kr\'al', Norin, and Razborov. Recently, Palmer suggested the general problem of maximizing the number of 5-cycles in Kk+1-free graphs. Using flag algebras, we show that every Kk+1-free graph of order n contains at most \[110k4(k4 - 5k3 + 10k2 - 10k + 4)n5 + o(n5)\] copies of C5 for any k ≥ 3, with the Tur\'an graph begin the extremal graph for large enough n.