There is no abstract available for this article.
This work was supported by National Natural Science Foundation of China (Grant No. 61603109), Natural Science Foundation of Hebei Province (Grant No. F2018202075), and Natural Science Foundation of Heilongjiang Province (Grant No. LC2016023).
Appendix A.
[1] Rosenthal R W. A class of games possessing pure-strategy Nash equilibria. Int J Game Theor, 1973, 2: 65-67 CrossRef Google Scholar
[2] Cheng D Z, Qi H S, Zhao Y. An Introduction to Semi-Tensor Product of Matrices and Its Applications. Singapore: World Scientific, 2012. Google Scholar
[3] Zhu Q X, Liu Y, Lu J Q. Observability of Boolean control networks. Sci China Inf Sci, 2018, 61: 092201 CrossRef Google Scholar
[4] Li H T, Xie L H, Wang Y Z. On robust control invariance of Boolean control networks. Automatica, 2016, 68: 392-396 CrossRef Google Scholar
[5] Guo P L, Zhang H X, Alsaadi F E. Semi-tensor product method to a class of event-triggered control for finite evolutionary networked games. IET Control Theor Appl, 2017, 11: 2140-2145 CrossRef Google Scholar
[6] Hao Y Q, Pan S S, Qiao Y P. Cooperative Control via Congestion Game Approach. IEEE Trans Automat Contr, 2018, : 1-1 CrossRef Google Scholar
[7] Zhang K Z, Xiao N, Xie L H, et al. Convergence speed analysis for evolutionary congestion games. In: Proceedings of Asian Control Conference, Malaysia, 2015. 1--5. Google Scholar
[8] Li B W, Liu Y, Kou K I. Event-Triggered Control for the Disturbance Decoupling Problem of Boolean Control Networks. IEEE Trans Cybern, 2018, 48: 2764-2769 CrossRef PubMed Google Scholar
