Note on the multicolour size-Ramsey number for paths
Abstract
The size-Ramsey number R(F,r) of a graph F is the smallest integer m such that there exists a graph G on m edges with the property that any colouring of the edges of G with r colours yields a monochromatic copy of F. In this short note, we give an alternative proof of the recent result of Krivelevich that R(Pn,r) = O(( r)r2 n). This upper bound is nearly optimal, since it is also known that R(Pn,r) = (r2 n).
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