On the Ramsey numbers for paths and generalized Jahangir graphs
Abstract
For given graphs G and H, the Ramsey number R(G,H) is the least natural number n such that for every graph F of order n the following condition holds: either F contains G or the complement of F contains H. In this paper, we determine the Ramsey number of paths versus generalized Jahangir graphs. We also derive the Ramsey number R(tPn,H), where H is a generalized Jahangir graph Js,m where s≥2 is even, m≥3 and t≥1 is any integer.
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