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arxiv: 2007.08797 · v1 · pith:JULIQVREnew · submitted 2020-07-17 · 🧮 math.PR

Long-time behavior and darwinian optimality for an asymmetric size-structured branching process

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keywords asymmetricbehaviorprocessasymmetrybranchingdarwiniandistributiondivision
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We study the long time behavior of an asymmetric size-structured measure-valued growth-fragmentation branching process that models the dynamics of a population of cells taking into account physiological and morphological asymmetry at division. We show that the process exhibits a Malthusian behavior; that is that the global population size grows exponentially fast and that the trait distribution of individuals converges to some stable distribution. The proof is based on a generalization of Lyapunov function techniques for non-conservative semi-groups. We then investigate the fluctuations of the growth rate with respect to the parameters guiding asymmetry. In particular, we exhibit that, under some special assumptions, asymmetric division is optimal in a Darwinian sense.

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