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Abstract The size Ramsey number ř ( G ) of a graph G is the smallest integer ř such that there is a graph F of ř edges with the property that any two‐coloring of the edges of F yields a monochromatic copy of G . First we show that the size Ramsey number ř( P n ) of the path P n of length n is linear in n , solving a problem of Erdös. Second we present a general upper bound on size Ramsey numbers of trees.
József Beck (Tue,) studied this question.
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