Constructing the Simplest Possible Phylogenetic Network from Triplets

Constructing the Simplest Possible Phylogenetic Network from Triplets

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Article ID: iaor20114246
Volume: 60
Issue: 2
Start Page Number: 207
End Page Number: 235
Publication Date: Jun 2011
Journal: Algorithmica
Authors: ,
Keywords: networks
Abstract:

A phylogenetic network is a directed acyclic graph that visualizes an evolutionary history containing so‐called reticulations such as recombinations, hybridizations or lateral gene transfers. Here we consider the construction of a simplest possible phylogenetic network consistent with an input set T, where T contains at least one phylogenetic tree on three leaves (a triplet) for each combination of three taxa. To quantify the complexity of a network we consider both the total number of reticulations and the number of reticulations per biconnected component, called the level of the network. We give polynomial‐time algorithms for constructing a level‐1 respectively a level‐2 network that contains a minimum number of reticulations and is consistent with T (if such a network exists). In addition, we show that if T is precisely equal to the set of triplets consistent with some network, then we can construct such a network with smallest possible level in time O(|T| k+1), if k is a fixed upper bound on the level of the network.

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