Two counterexamples to a conjecture about even cycles
Abstract
A conjecture of Verstra\"ete states that for any fixed < k there exists a positive constant c such that any C2k-free graph G contains a C2-free subgraph with at least c |E(G)| edges. For = 2, this conjecture was verified by K\"uhn and Osthus in 2004. We identify two counterexamples to this conjecture for = 4 and k=5: the first comes from a recent construction of a dense C10-free subgraph of the hypercube and the second from Wenger's construction for extremal C10-free graphs.
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