English

Operads and Phylogenetic Trees

Category Theory 2018-11-22 v3 Algebraic Topology

Abstract

We construct an operad Phyl\mathrm{Phyl} whose operations are the edge-labelled trees used in phylogenetics. This operad is the coproduct of Com\mathrm{Com}, the operad for commutative semigroups, and [0,)[0,\infty), the operad with unary operations corresponding to nonnegative real numbers, where composition is addition. We show that there is a homeomorphism between the space of nn-ary operations of Phyl\mathrm{Phyl} and Tn×[0,)n+1\mathcal{T}_n\times [0,\infty)^{n+1}, where Tn\mathcal{T}_n is the space of metric nn-trees introduced by Billera, Holmes and Vogtmann. Furthermore, we show that the Markov models used to reconstruct phylogenetic trees from genome data give coalgebras of Phyl\mathrm{Phyl}. These always extend to coalgebras of the larger operad Com+[0,]\mathrm{Com} + [0,\infty], since Markov processes on finite sets converge to an equilibrium as time approaches infinity. We show that for any operad OO, its coproduct with [0,][0,\infty] contains the operad W(O)W(O) constucted by Boardman and Vogt. To prove these results, we explicitly describe the coproduct of operads in terms of labelled trees.

Keywords

Cite

@article{arxiv.1512.03337,
  title  = {Operads and Phylogenetic Trees},
  author = {John C. Baez and Nina Otter},
  journal= {arXiv preprint arXiv:1512.03337},
  year   = {2018}
}

Comments

48 pages, 3 figures

R2 v1 2026-06-22T12:06:32.047Z