Lower bounds for rainbow Tur\'an numbers of paths and other trees

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\'an number of F. We show that ex*(n,Pk)≥ k2n + O(1) where Pk is a path on k≥ 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 ≤ 10 and a few other caterpillars of small diameter.