Towards Erdos-Hajnal for graphs with no 5-hole
Abstract
The Erdos-Hajnal conjecture says that for every graph H there exists c>0 such that (α(G),ω(G)) nc for every H-free graph G with n vertices, and this is still open when H=C5. Until now the best bound known on (α(G),ω(G)) for C5-free graphs was the general bound of Erdos and Hajnal, that for all H, (α(G),ω(G)) 2( n ) if G is H-free. We improve this when H=C5 to (α(G),ω(G)) 2( n n).
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