English

A third strike against perfect phylogeny

Discrete Mathematics 2019-04-30 v2 Combinatorics Populations and Evolution

Abstract

Perfect phylogenies are fundamental in the study of evolutionary trees because they capture the situation when each evolutionary trait emerges only once in history; if such events are believed to be rare, then by Occam's Razor such parsimonious trees are preferable as a hypothesis of evolution. A classical result states that 2-state characters permit a perfect phylogeny precisely if each subset of 2 characters permits one. More recently, it was shown that for 3-state characters the same property holds but for size-3 subsets. A long-standing open problem asked whether such a constant exists for each number of states. More precisely, it has been conjectured that for any fixed integer rr, there exists a constant f(r)f(r) such that a set of rr-state characters CC has a perfect phylogeny if and only if every subset of at most f(r)f(r) characters has a perfect phylogeny. In this paper, we show that this conjecture is false. In particular, we show that for any constant tt, there exists a set CC of 88-state characters such that CC has no perfect phylogeny, but there exists a perfect phylogeny for every subset of tt characters. This negative result complements the two negative results ("strikes") of Bodlaender et al. We reflect on the consequences of this third strike, pointing out that while it does close off some routes for efficient algorithm development, many others remain open.

Cite

@article{arxiv.1804.07232,
  title  = {A third strike against perfect phylogeny},
  author = {Leo van Iersel and Mark Jones and Steven Kelk},
  journal= {arXiv preprint arXiv:1804.07232},
  year   = {2019}
}

Comments

This article has been accepted for publication in Systematic Biology Published by Oxford University Press

R2 v1 2026-06-23T01:28:55.900Z