Universal rooted phylogenetic tree shapes and universal tanglegrams

Abstract

We provide an (n n) lower bound and an O(n2) upper bound for the smallest size of rooted binary trees (a.k.a. phylogenetic tree shapes), which are universal for rooted binary trees with n leaves, i.e., contain all of them as induced binary subtrees. We explicitly compute the smallest universal trees for n≤ 11. We also provide an (n2) lower bound and an O(n4) upper bound for the smallest size of tanglegrams, which are universal for size n tanglegrams, i.e., which contain all of them as induced subtanglegrams. Some of our results generalize to rooted d-ary trees and to d-ary tanglegrams.