An exact Ramsey number of large bipartite graphs versus odd wheel
Abstract
The Ramsey number for the pair of graphs K1,n (star) versus Wm (wheel) has been extensively studied. In contrast, the Ramsey number of K2,n versus the wheel is not yet explored due to the bit more structural complexity of K2,n compared to the star. In this article, we have established an exact value of K2,n versus Wm for large n and m. In particular, we have proved equation* R(K2,n, Wm)=3n+4, equation* whenever n and m are sufficiently large integers satisfying n≥4m and m is an odd integer. This proves the Wm-goodness of K2,n. Our proof combines probabilistic methods with an analysis of structural dependencies. As part of the argument, we resolve a structural rigidity question concerning highly dependent neighbourhoods (Lemma 3.12).
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