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Lower bounds for rainbow Turán numbers of paths and other trees (1901.03308v1)

Published 10 Jan 2019 in math.CO

Abstract: For a fixed graph $F$, we would like to determine the maximum number of edges in a properly edge-colored graph on $n$ vertices which does not contain a rainbow copy of $F$, that is, a copy of $F$ all of whose edges receive a different color. This maximum, denoted by $ex*(n, F)$, is the rainbow Tur\'{a}n number of $F$. We show that $ex*(n,P_k)\geq \frac{k}{2}n + O(1)$ where $P_k$ is a path on $k\geq 3$ edges, generalizing a result by Maamoun and Meyniel and by Johnston, Palmer and Sarkar. We show similar bounds for brooms on $2s-1$ edges and diameter $\leq 10$ and a few other caterpillars of small diameter.

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