Self-triggered control for the convergence of n-person random evolutionary games

Abstract

In this article, the self-triggered control scheme is designed to achieve the convergence of $n$-person random evolutionary games (REGs). Firstly, using the semi-tensor product (STP) of matrices, the $n$-person REG is converted to an algebraic form. Secondly, the control Lyapunov functions (CLFs) for the convergence problem of $n$-person REGs are presented, and an algorithm for the construction of a CLF is given. Moreover, a necessary and sufficient condition based on the CLF is proposed to detect whether an $n$-person REG can converge to a target profile with probability one. And a design scheme of state-feedback self-triggered controls (STCs) is established. Finally, an example is presented to illustrate the obtained results.