Title of article
Strategy abundance in games for arbitrary mutation rates
Author/Authors
Antal، نويسنده , , Tibor and Nowak، نويسنده , , Martin A. and Traulsen، نويسنده , , Arne، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
5
From page
340
To page
344
Abstract
We study evolutionary game dynamics in a well-mixed populations of finite size, N . A well-mixed population means that any two individuals are equally likely to interact. In particular we consider the average abundances of two strategies, A and B , under mutation and selection. The game dynamical interaction between the two strategies is given by the 2 × 2 payoff matrix ( a c b d ) . It has previously been shown that A is more abundant than B , if a ( N - 2 ) + bN > cN + d ( N - 2 ) . This result has been derived for particular stochastic processes that operate either in the limit of asymptotically small mutation rates or in the limit of weak selection. Here we show that this result holds in fact for a wide class of stochastic birth–death processes for arbitrary mutation rate and for any intensity of selection.
Keywords
Finite populations , evolutionary game theory , Stochastic effects
Journal title
Journal of Theoretical Biology
Serial Year
2009
Journal title
Journal of Theoretical Biology
Record number
1539622
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