Towards the fixed parameter tractability of constructing minimal phylogenetic networks from arbitrary sets of nonbinary trees (1207.7034v2)

Abstract: It has remained an open question for some time whether, given a set of not necessarily binary (i.e. "nonbinary") trees T on a set of taxa X, it is possible to determine in time f(r).poly(m) whether there exists a phylogenetic network that displays all the trees in T, where r refers to the reticulation number of the network and m=|X|+|T|. Here we show that this holds if one or both of the following conditions holds: (1) |T| is bounded by a function of r; (2) the maximum degree of the nodes in T is bounded by a function of r. These sufficient conditions absorb and significantly extend known special cases, namely when all the trees in T are binary, or T contains exactly two nonbinary trees. We believe this result is an important step towards settling the issue for an arbitrarily large and complex set of nonbinary trees. For completeness we show that the problem is certainly solveable in polynomial time.