On graphs without cycles of length 0 modulo 4

Abstract

Bollob\'as proved that for every k and such that kZ+ contains an even number, an n-vertex graph containing no cycle of length k can contain at most a linear number of edges. The precise (or asymptotic) value of the maximum number of edges in such a graph is known for very few pairs and k. In this work we precisely determine the maximum number of edges in a graph containing no cycle of length 0 4.

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