Giant Rainbow Trees in Sparse Random Graphs

Abstract

For any small constant ε>0, the Erdos-R\'enyi random graph G(n,1+εn) with high probability has a unique largest component which contains (1 O(ε))2ε n vertices. Let Gc(n,p) be obtained by assigning each edge in G(n,p) a color in [c] independently and uniformly. Cooley, Do, Erde, and Missethan proved that for any fixed α>0, Gα n(n,1+εn) with high probability contains a rainbow tree (a tree that does not repeat colors) which covers (1 O(ε))αα+1ε n vertices, and conjectured that there is one which covers (1 O(ε))2ε n. In this paper, we achieve the correct leading constant and prove their conjecture correct up to a logarithmic factor in the error term, as we show that with high probability Gα n(n,1+εn) contains a rainbow tree which covers (1 O(ε(1/ε)))2ε n vertices.