Noisy traveling waves: Effect of selection on genealogies

E. Brunet; B. Derrida; A. H. Mueller; S. Munier

doi:10.1209/epl/i2006-10224-4

Noisy traveling waves: Effect of selection on genealogies

E. Brunet
, B. Derrida
, A. H. Mueller
, S. Munier

Research output: Contribution to journal › Article › peer-review

Abstract

For a family of models of evolving population under selection, which can be described by noisy traveling-wave equations, the coalescence times along the genealogical tree scale like ln^α N, where N is the size of the population, in contrast with neutral models for which they scale like N. An argument relating this time scale to the diffusion constant of the noisy traveling wave leads to a prediction for α which agrees with our simulations. An exactly soluble case gives trees with statistics identical to those predicted for mean-field spin glasses by Parisi's theory.

Original language	English
Pages (from-to)	1-7
Number of pages	7
Journal	EPL
Volume	76
Issue number	1
DOIs	https://doi.org/10.1209/epl/i2006-10224-4
Publication status	Published - 1 Oct 2006

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title = "Noisy traveling waves: Effect of selection on genealogies",

abstract = "For a family of models of evolving population under selection, which can be described by noisy traveling-wave equations, the coalescence times along the genealogical tree scale like lnα N, where N is the size of the population, in contrast with neutral models for which they scale like N. An argument relating this time scale to the diffusion constant of the noisy traveling wave leads to a prediction for α which agrees with our simulations. An exactly soluble case gives trees with statistics identical to those predicted for mean-field spin glasses by Parisi's theory.",

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AU - Munier, S.

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AB - For a family of models of evolving population under selection, which can be described by noisy traveling-wave equations, the coalescence times along the genealogical tree scale like lnα N, where N is the size of the population, in contrast with neutral models for which they scale like N. An argument relating this time scale to the diffusion constant of the noisy traveling wave leads to a prediction for α which agrees with our simulations. An exactly soluble case gives trees with statistics identical to those predicted for mean-field spin glasses by Parisi's theory.

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DO - 10.1209/epl/i2006-10224-4

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Noisy traveling waves: Effect of selection on genealogies

Abstract

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