We consider a population with non-overlapping generations, whose size goes to infinity. It is described by a discrete genealogy which may be time non-homogeneous and we pay special attention to branching trees in varying environments. A Markov chain models the dynamic of the trait of each individual along this genealogy and may also be time non-homogeneous. Such models are motivated by transmission processes in the cell division, reproduction-dispersion dynamics or sampling problems in evolution. We want to determine the evolution of the distribution of the traits among the population, namely the asymptotic behavior of the proportion of individuals with a given trait. We prove some quenched laws of large numbers which rely on the ergodicity of an auxiliary process, in the same vein as cite{guy,delmar}. Applications to time inhomogeneous Markov chains lead us to derive a backward (with respect to the environment) law of large numbers and a law of large numbers on the whole population until generation $n$. A central limit is also established in the transient case.
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机译:我们考虑了具有不重叠世代的人口,其规模达到无穷大。它是由离散的族谱描述的,这可能是时间上不均匀的,我们特别注意在不同环境中的分支树。马尔可夫链沿着这个家谱对每个个体的特征的动态进行建模,并且可能在时间上是不均匀的。这种模型是由细胞分裂中的传播过程,繁殖-分散动力学或进化中的采样问题所激发的。我们要确定人群中性状分布的演变,即具有特定性状的个体比例的渐近行为。我们证明了一些依赖于辅助过程的遍历性的大量淬灭定律,与 cite {guy,delmar}相同。时间非齐次马尔可夫链的应用使我们得出了一个总的倒数(相对于环境)定律,并推论了整个人口上的一个大数定律,直到产生$ n $。在瞬态情况下也建立了中心极限。
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