中文

Distorted metrics on trees and phylogenetic forests

组合数学 2007-05-23 v1

摘要

We study distorted metrics on binary trees in the context of phylogenetic reconstruction. Given a binary tree TT on nn leaves with a path metric dd, consider the pairwise distances {d(u,v)}\{d(u,v)\} between leaves. It is well known that these determine the tree and the dd length of all edges. Here we consider distortions \d\d of dd such that for all leaves uu and vv it holds that d(u,v)\d(u,v)<f/2|d(u,v) - \d(u,v)| < f/2 if either d(u,v)<Md(u,v) < M or \d(u,v)<M\d(u,v) < M, where dd satisfies fd(e)gf \leq d(e) \leq g for all edges ee. Given such distortions we show how to reconstruct in polynomial time a forest T1,...,TαT_1,...,T_{\alpha} such that the true tree TT may be obtained from that forest by adding α1\alpha-1 edges and α12Ω(M/g)n\alpha-1 \leq 2^{-\Omega(M/g)} n. Metric distortions arise naturally in phylogeny, where d(u,v)d(u,v) is defined by the log-det of a covariance matrix associated with uu and vv. of a covariance matrix associated with uu and vv. When uu and vv are ``far'', the entries of the covariance matrix are small and therefore \d(u,v)\d(u,v), which is defined by log-det of an associated empirical-correlation matrix may be a bad estimate of d(u,v)d(u,v) even if the correlation matrix is ``close'' to the covariance matrix. Our metric results are used in order to show how to reconstruct phylogenetic forests with small number of trees from sequences of length logarithmic in the size of the tree. Our method also yields an independent proof that phylogenetic trees can be reconstructed in polynomial time from sequences of polynomial length under the standard assumptions in phylogeny. Both the metric result and its applications to phylogeny are almost tight.

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引用

@article{arxiv.math/0403508,
  title  = {Distorted metrics on trees and phylogenetic forests},
  author = {Elchanan Mossel},
  journal= {arXiv preprint arXiv:math/0403508},
  year   = {2007}
}