Ramsey Goodness of paths and unbalanced graphs
Abstract
Given graphs G and H, we say that G is H-good if the Ramsey number R(G,H) equals the trivial lower bound (|G| - 1)((H) - 1) + σ(H), where (H) denotes the usual chromatic number of H, and σ(H) denotes the minimum size of a color class in a (H)-coloring of H. Pokrovskiy and Sudakov [Ramsey goodness of paths. Journal of Combinatorial Theory, Series B, 122:384-390, 2017.] proved that Pn is H-good whenever n≥ 4|H|. In this paper, given >0, we show that if H satisfy a special unbalance condition, then Pn is H-good whenever n ≥ (2 + )|H|. More specifically, we show that if m1,…, mk are such that · mi ≥ 2mi-12 for 2≤ i≤ k, and n ≥ (2 + )(m1 + ·s + mk), then Pn is Km1,…,mk-good.
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