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Clines with partial panmixia across a geographical barrier in an environmental pocket

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  • Nagylaki, Thomas
  • Zeng, Kai

Abstract

In a geographically structured population, partial global panmixia can be regarded as the limiting case of long-distance migration. On the entire line with homogeneous, isotropic migration, an environmental pocket is bounded by a geographical barrier, which need not be symmetric. For slow evolution, a continuous approximation of the exact, discrete model for the gene frequency p(x) at a diallelic locus at equilibrium, where x denotes position and the barrier is at x=±a, is formulated and investigated. This model incorporates viability selection, local adult migration, adult partial panmixia, and the barrier. The gene frequency and its derivatives are discontinuous at the barrier unless the latter is symmetric, in which case only p(x) is discontinuous. A cline exists only if the scaled rate of partial panmixia β<1; several qualitative results also are proved. Formulas that determine p(x) in a step-environment when dominance is absent are derived. The maximal gene frequency in the cline satisfies p(0)<1−β. A cline exists if and only if 0≤β<1 and the radius a of the pocket exceeds the minimal radius a∗, for which a simple, explicit formula is deduced. Given numerical solutions for p(0) and p(a±), an explicit formula is proved for p(x) in |x|>a; whereas in (−a,a), an elliptic integral for x must be numerically inverted. The minimal radius a∗∗ for maintenance of a cline in an isotropic, bidimensional pocket is also examined.

Suggested Citation

  • Nagylaki, Thomas & Zeng, Kai, 2016. "Clines with partial panmixia across a geographical barrier in an environmental pocket," Theoretical Population Biology, Elsevier, vol. 110(C), pages 1-11.
  • Handle: RePEc:eee:thpobi:v:110:y:2016:i:c:p:1-11
    DOI: 10.1016/j.tpb.2016.03.003
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    References listed on IDEAS

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    1. Nagylaki, Thomas & Su, Linlin & Alevy, Ian & Dupont, Todd F., 2014. "Clines with partial panmixia in an environmental pocket," Theoretical Population Biology, Elsevier, vol. 95(C), pages 24-32.
    2. Nagylaki, Thomas, 2012. "Clines with partial panmixia," Theoretical Population Biology, Elsevier, vol. 81(1), pages 45-68.
    3. Nagylaki, Thomas, 2012. "Clines with partial panmixia in an unbounded unidimensional habitat," Theoretical Population Biology, Elsevier, vol. 82(1), pages 22-28.
    4. Nagylaki, Thomas, 2016. "Clines with partial panmixia across a geographical barrier," Theoretical Population Biology, Elsevier, vol. 109(C), pages 28-43.
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    Cited by:

    1. Forien, Raphaël, 2019. "Gene flow across geographical barriers — scaling limits of random walks with obstacles," Stochastic Processes and their Applications, Elsevier, vol. 129(10), pages 3748-3773.
    2. Nagylaki, Thomas & Su, Linlin & Dupont, Todd F., 2019. "Uniqueness and multiplicity of clines in an environmental pocket," Theoretical Population Biology, Elsevier, vol. 130(C), pages 106-131.

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