Testing the Agreement of Trees with Internal Labels

Abstract

The input to the agreement problem is a collection P = \T1, T2, … , Tk\ of phylogenetic trees, called input trees, over partially overlapping sets of taxa. The question is whether there exists a tree T, called an agreement tree, whose taxon set is the union of the taxon sets of the input trees, such that for each i ∈ \1, 2, … , k\, the restriction of T to the taxon set of Ti is isomorphic to Ti. We give a O(n k (Σi ∈ [k] di + 2(nk))) algorithm for a generalization of the agreement problem in which the input trees may have internal labels, where n is the total number of distinct taxa in P, k is the number of trees in P, and di is the maximum number of children of a node in Ti.