When Many Trees Go to War: On Sets of Phylogenetic Trees With Almost No Common Structure

Abstract

It is known that any two trees on the same n leaves can be displayed by a network with n-2 reticulations, and there are two trees that cannot be displayed by a network with fewer reticulations. But how many reticulations are needed to display multiple trees? For any set of t trees on n leaves, there is a trivial network with (t - 1)n reticulations that displays them. To do better, we have to exploit common structure of the trees to embed non-trivial subtrees of different trees into the same part of the network. In this paper, we show that for t ∈ o( n), there is a set of t trees with virtually no common structure that could be exploited. More precisely, we show for any t∈ o( n), there are t trees such that any network displaying them has (t-1)n - o(n) reticulations. For t ∈ o( n), we obtain a slightly weaker bound. We also prove that already for t = c n, for any constant c > 0, there is a set of t trees that cannot be displayed by a network with o(n n) reticulations, matching up to constant factors the known upper bound of O(n n) reticulations sufficient to display all trees with n leaves. These results are based on simple counting arguments and extend to unrooted networks and trees.