The size, multipartite Ramsey numbers for nK2 versus path-path and cycle

Abstract

For given graphs G1, G2,…, Gn and any integer j, the size of the multipartite Ramsey number mj(G1, G2,…, Gn) is the smallest positive integer t such that any n-coloring of the edges of Kj× t contains a monochromatic copy of Gi in color i for some i, 1 ≤ i ≤ n, where Kj× t denotes the complete multipartite graph having j classes with t vertices per each class. In this paper we compute the size of the multipartite Ramsey number mj(K1,2, P4, nK2) for any j,n≥ 2 and mj(nK2,C7), for any j≤4 and n≥ 2.

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