Evolutionarily stable state

Evolutionarily stable states are frequently used to identify solutions to the replicator equation, given in its linear payoff form by:

${\displaystyle {\dot {x_{i}}}=x_{i}\left(\left(Ax\right)_{i}-x^{T}Ax\right),}$

The state ${\displaystyle {\hat {x}}}$ is said to be evolutionarily stable if for all ${\displaystyle x\neq {\hat {x}}}$ in some neighborhood of ${\displaystyle {\hat {x}}}$.

${\displaystyle x^{T}Ax<{\hat {x}}^{T}Ax}$

This is similar but distinct from the concept of an evolutionarily stable strategy.

It can be shown that for the replicator equation if a state is evolutionarily stable then it is an asymptotically stable rest point, so the evolutionarily stable states are often taken as solutions of the replicator equation. The converse is true if the game matrix is symmetric.

The concept of evolutionary stability is equivalent to the concept of strong stability for normal form games, due to Cressman.

• Maynard Smith, J.. (1982) Evolution and the Theory of Games. Cambridge University Press. ISBN 0-521-28884-3