Asymptotic Bounds for t(3,n) and an Application to t(4,n)
Abstract
A set of vertices X⊂eq V in a simple graph G(V,E) is irredundant if each vertex x∈ X is either isolated in the induced subgraph G[X] or else has a private neighbor y∈ V X that is adjacent to x and to no other vertex of X. The mixed Ramsey number t(m,n) is the smallest N for which every red-blue coloring of the edges of KN has an m-element irredundant set in the blue subgraph or an n-element independent set in the red subgraph. The irredundant Ramsey number s(m,n) is the smallest N for which every red-blue coloring of the edges of KN has an m-element irredundant set in the blue subgraph or an n-element irredundant set in the blue subgraph. In this paper, we determine t(3,n) and s(3,n) up to a constant factor by showing that t(3,n)=O(n5/4/n), which improved the best upper bound due to Rousseau and Speed in [Comb. Probab. Comput. 12 (2003), 653-660]. As an application, we verify a conjecture for m=4 proposed by Chen, Hattingh, and Rousseau in [J. Graph Theory 17(2) (1993), 193-206].
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