A study of two Ramsey numbers involving odd cycles

Abstract

The book graph of order (n+2), denoted by Bn, is the graph with n distinct copies of triangles sharing a common edge called the `base'. A cycle of order m is denoted by Cm. A lot of studies have been done in recent years on the Ramsey number R(Bn, Cm). However, the exact value remains unknown for several n and m. In 2021, Lin and Peng obtained the value of R(Bn, Cm) under certain conditions on n and m. In this paper, they remarked that the value is still unknown for the range n∈ [9m8-125, 4m-14]. In a recent paper, Hu et al. determined the value of the book-cycle Ramsey number within the range n∈ [ 3m-52-125, 4m] where m is odd and n is sufficiently large. In this article, we extend the investigation to smaller values of n. We have obtained a bound of R(Bn, Cm) if n∈ [2m-3, 4m-14] and m≥ 7 is odd. This is a progress on the earlier result. A connected graph G is said to be H-good if the formula, equation* R(G,H)= (|G|-1)((H)-1)+σ(H) equation* holds, where (H) is the chromatic number of H and σ(H) is the size of the smallest colour class for the (H)-colouring. In this article, we have studied the Ramsey goodness of the graph pair (Cm, K2,n), where K2,n is the complete biparite graph. We have obtained an exact value of R(K2,n,Cm) for all n satisfying n≥ 3493 and n≥ 2m+499 where m≥ 7 is odd. This shows that K2,n is Cm-good, which extends a previous result on the Ramsey goodness of (Cm, K2,n). Also, this improves the lower bound on n from a previous result on the Ramsey number R(Bn, Cm)

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