Capturing a phylogenetic tree when the number of character states varies with the number of leaves

Abstract

We show that for any two values α, β >0 for which α+β>1 then there is a value N so that for all n ≥ N the following holds. For any binary phylogenetic tree T on n leaves there is a set of nα characters that capture T, and for which each character takes at most nβ distinct states. Here `capture' means that T is the unique perfect phylogeny for these characters. Our short proof of this combinatorial result is based on the probabilistic method.