arXiv:1610.04932 Abstract | arXiv Analytics

arXiv:1610.04932 [math.CO]Abstract References Reviews Resources

The homomorphism threshold of $\{C_3, C_5\}$-free graphs

Published 2016-10-17Version 1

We determine the structure of $\{C_3, C_5\}$-free graphs with $n$ vertices and minimum degree larger than $n/5$: such graphs are homomorphic to the graph obtained from a $(5k - 3)$-cycle by adding all chords of length $1$ mod $5$, for some $k$. This answers a question of Messuti and Schacht. We deduce that the homomorphism threshold of $\{C_3, C_5\}$-free graphs is $1/5$, thus answering a question of Oberkampf and Schacht.

Comments: 33 pages, 21 figures

Categories: math.CO

Keywords: free graphs, homomorphism threshold, minimum degree larger, homomorphic

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