On 2-connected graphs avoiding cycles of length 0 modulo 4

Abstract

For two integers k and , an ( mod k)-cycle means a cycle of length m such that m k. In 1977, Bollob\'as proved a conjecture of Burr and Erdos by showing that if is even or k is odd, then every n-vertex graph containing no ( mod k)-cycles has at most a linear number of edges in terms of n. Since then, determining the exact extremal bounds for graphs without ( mod k)-cycles has emerged as an interesting question in extremal graph theory, though the exact values are known only for a few integers and k. Recently, Gyori, Li, Salia, Tompkins, Varga and Zhu proved that every n-vertex graph containing no (0 mod 4)-cycles has at most 1912(n -1) edges, and they provided extremal examples that reach the bound, all of which are not 2-connected. In this paper, we show that a 2-connected graph without (0 mod 4)-cycles has at most 3n-12 edges, and this bound is tight by presenting a method to construct infinitely many extremal examples.