A note on the Ramsey number of even wheels versus stars
Abstract
For two graphs G1 and G2 the Ramsey number R(G1,G2) is the smallest integer N, such that for any graph on N vertices either G contains G1 or G contains G2. Let Sn be a star of order n and Wm be a wheel of order m+1. In this paper, it is shown that R(Wn,Sn)≤5n/2-1, where n≥6 is even. It was proven a theorem which implies that R(Wn,Sn)≥5n/2-2, where n≥6 is even. Therefore we conclude that R(Wn,Sn)=5n/2-2 or 5n/2-1, for n≥6 and even.
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