Rainbow Erdos-S\'os Conjectures

Abstract

An edge colored graph is said to contain rainbow-F if F is a subgraph and every edge receives a different color. In 2007, Keevash, Mubayi, Sudakov, and Verstra\"ete introduced the rainbow extremal number ex*(n,F), a variant on the classical Tur\'an problem, asking for the maximum number of edges in a n-vertex properly edge-colored graph which does not contain a rainbow-F. In the following years many authors have studied the asymptotic behavior of ex*(n,F) when F is bipartite. In the particular case that F is a tree T, the infamous Erd\"os-S\'os conjecture says that the extremal number of T depends only on the size of T and not its structure. After observing that such a pattern cannot hold for ex* in the usual setting, we propose that the relative rainbow extremal number ex*(Qn,T) in the n-dimensional hypercube Qn will satisfy an Erd\"os-S\'os type Conjecture and verify it for some infinite families of trees T.