English

Survival Probabilities at Spherical Frontiers

Populations and Evolution 2015-06-02 v2 Statistical Mechanics

Abstract

Motivated by tumor growth and spatial population genetics, we study the interplay between evolutionary and spatial dynamics at the surfaces of three-dimensional, spherical range expansions. We consider range expansion radii that grow with an arbitrary power-law in time: R(t)=R0(1+t/t)ΘR(t)=R_0(1+t/t^*)^{\Theta}, where Θ\Theta is a growth exponent, R0R_0 is the initial radius, and tt^* is a characteristic time for the growth, to be affected by the inflating geometry. We vary the parameters tt^* and Θ\Theta to capture a variety of possible growth regimes. Guided by recent results for two-dimensional inflating range expansions, we identify key dimensionless parameters that describe the survival probability of a mutant cell with a small selective advantage arising at the population frontier. Using analytical techniques, we calculate this probability for arbitrary Θ\Theta. We compare our results to simulations of linearly inflating expansions (Θ=1\Theta=1 spherical Fisher-Kolmogorov-Petrovsky-Piscunov waves) and treadmilling populations (Θ=0\Theta=0, with cells in the interior removed by apoptosis or a similar process). We find that mutations at linearly inflating fronts have survival probabilities enhanced by factors of 100 or more relative to mutations at treadmilling population frontiers. We also discuss the special properties of "marginally inflating" (Θ=1/2)(\Theta=1/2) expansions.

Keywords

Cite

@article{arxiv.1408.6006,
  title  = {Survival Probabilities at Spherical Frontiers},
  author = {Maxim O. Lavrentovich and David R. Nelson},
  journal= {arXiv preprint arXiv:1408.6006},
  year   = {2015}
}

Comments

35 pages, 11 figures, revised version

R2 v1 2026-06-22T05:39:43.264Z