自然选择基本定理
The Fundamental Theorem of Natural Selection.
作者信息
Baez John C
机构信息
Department of Mathematics, University of California, Riverside, CA 92521, USA.
Centre for Quantum Technologies, National University of Singapore, Singapore 117543, Singapore.
出版信息
Entropy (Basel). 2021 Oct 30;23(11):1436. doi: 10.3390/e23111436.
Suppose we have different types of self-replicating entity, with the population Pi of the th type changing at a rate equal to Pi times the fitness fi of that type. Suppose the fitness fi is any continuous function of all the populations P1,…,Pn. Let pi be the fraction of replicators that are of the th type. Then p=(p1,…,pn) is a time-dependent probability distribution, and we prove that its speed as measured by the Fisher information metric equals the variance in fitness. In rough terms, this says that the speed at which information is updated through natural selection equals the variance in fitness. This result can be seen as a modified version of Fisher's fundamental theorem of natural selection. We compare it to Fisher's original result as interpreted by Price, Ewens and Edwards.
假设我们有不同类型的自我复制实体,第(i)种类型的种群数量(P_i)的变化速率等于(P_i)乘以该类型的适应度(f_i)。假设适应度(f_i)是所有种群数量(P_1,\cdots,P_n)的任意连续函数。设(p_i)是第(i)种类型复制子的比例。那么(p=(p_1,\cdots,p_n))是一个随时间变化的概率分布,并且我们证明,用费希尔信息度量所衡量的它的速度等于适应度的方差。粗略地说,这意味着通过自然选择更新信息的速度等于适应度的方差。这个结果可以看作是费希尔自然选择基本定理的一个修正版本。我们将它与普赖斯、尤恩斯和爱德华兹所解释的费希尔的原始结果进行比较。
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