LIU Aixin, LI Haitao, LI Ping, YANG Xinrong
|  Friedman J W, Game Theory with Application to Economics, New York: Oxford University Press, New York, 1986.
 Nash J, Non-cooperative games, Annals of Mathematics: Second Series, 1951, 54(2): 286-295.
 Farrell J, Communication, coordination and Nash equilibrium, Economics Letters, 1988, 27(3): 209-214.
 Rosenthal R W, A class of games possessing pure-strategy Nash equilibria, International Journal of Game Theory, 1973, 2(1): 65-67.
 Monderer D and Shapley L S, Potential games, Games and Economic Behavior, 1996, 14(1): 124-143.
 Cheng D Z, On finite potential games, Automatica, 2014, 50: 1793-1801.
 Liu X Y and Zhu J D, On potential equations of finite games, Automatica, 2016, 68: 245-253.
 Candogan O, Menache I, Ozdaglar A, et al., Flows and decompositions of games: Harmonic and potential games, Mathematics of Operations Research, 2011, 36(3): 474-503.
 Hao Y Q and Cheng D Z, On skew-symmetric games, Journal of the Franklin Institute, 2018, 355(6): 3196-3220.
 Li C X, He F H, Liu T, et al., Symmetry-based decomposition of finite games, Science China Information Sciences, 2019, 62(1): 012207.
 Liu T, Qi H S, and Cheng D Z, Dual expressions of decomposed subspaces of finite games, Proceedings of the 34th Chinese Control Conference, Hangzhou, 2015, 9146-9151.
 Li C X, Liu T, He F H, et al., On finite harmonic games, The 55th IEEE Conference on Decision and Control, Las Vegas, NV, 2016, 7024-7029.
 Wang Y H, Liu T, and Cheng D Z, From weighted potential game to weighted harmonic game, IET Control Theory & Applications, 2017, 11(13): 2161-2169.
 Cheng D Z and Liu T, Linear representation of symmetric games, IET Control Theory & Applications, 2017, 11(18): 3278-3287.
 Li Y L, Li H T, Xu X J, et al., Semi-tensor product approach to minimal-agent consensus control of networked evolutionary games, IET Control Theory & Applications, 2018, 12(16): 2269-2275.
 Qi H S, Wang Y H, Liu T, et al., Vector space structure of finite evolutionary games and its application to strategy profile convergence, Journal of Systems Science & Complexity, 2016, 29(3): 602-628.
 Li C X, He F H, Liu T, et al., Verification and dynamics of group-based potential games, IEEE Transactions on Control of Network Systems, 2019, 6(1): 215-224.
 Mao Y, Wang L Q, Liu Y, et al., Stabilization of evolutionary networked games with length-r information, Applied Mathematics and Computation, 2018, 337: 442-451.
 Jiang K C and Wang J H, Stabilization of a class of congestion games via intermittent control, Science China Information Sciences, 2022, 65: 149203.
 Zhang X and Cheng D Z, Profile-dynamic based fictitious play, Science China Information Sciences, 2021, 64: 169202.
 Guo P L and Wang Y Z, The computation of Nash equilibrium in fashion games via semi-tensor product method, Journal of Systems Science & Complexity, 2016, 29(4): 881-896.
 Li H T, Zhao G D, Guo P L, et al., Analysis and Control of Finite-Value Systems, CRC Press, Florida, 2018.
 Zou Y L and Zhu J D, Graph theory methods for decomposition w.r.t. outputs of Boolean control networks, Journal of Systems Science & Complexity, 2015, 30(3): 519-534.
 Li C X, Xing Y, He F H, et al., A strategic learning algorithm for state-based games, Automatica, 2020, 113: 108615.
 Liang J L, Chen H W, and Liu Y, On algorithms for state feedback stabilization of Boolean control networks, Automatica, 2017, 84: 10-16.
 Wang H Y, Zhong J H, and Lin D D, Linearization of multi-valued nonlinear feedback shift registers, Journal of Systems Science & Complexity, 2016, 30(2): 494-509.
 Guo Y Q, Zhou R P, Wu Y H, et al., Stability and set stability in distribution of probabilistic Boolean networks, IEEE Transactions on Automatic Control, 2019, 64(2): 736-742.
 Meng M, Lam J, Feng J, et al., l1-gain analysis and model reduction problem for Boolean control networks, Information Sciences, 2016, 348: 68-83.
 Jiang D P and Zhang K Z, Observability of Boolean control networks with time-variant delays in states, Journal of Systems Science & Complexity, 2018, 31(2): 436-445.
 Wang S L and Li H T, Aggregation method to reachability and optimal control of large-size Boolean control networks, Science China Information Sciences, 2022, DOI: 10.1007/s11432-021- 3388-y.
 Lu J Q, Li H T, Liu Y, et al., Survey on semi-tensor product method with its applications in logical networks and other finite-valued systems, IET Control Theory & Applications, 2017, 11(13): 2040-2047.
 Li H T, Zhao G D, Meng M, et al., A survey on applications of semi-tensor product method in engineering, Science China Information Sciences, 2018, 61: 010202.
 Fornasini E and Valcher M E, Recent developments in Boolean networks control, Journal of Control & Decision, 2016, 3(1): 1-18.
 Cheng D Z, Liu T, Zhang K Z, et al., On decomposed subspaces of finite games, IEEE Transactions on Automatic Control, 2016, 61(11): 3651-3656.
 Bates D M and Watts D G, Relative curvature measures of nonlinearity, Journal of the Royal Statistical Society, 1980, 42(1): 1-25.
|||GUO Peilian,WANG Yuzhen. The Computation of Nash Equilibrium in Fashion Games via Semi-Tensor Product Method [J]. Journal of Systems Science and Complexity, 2016, 29(4): 881-896.|
|||LI Haitao, WANG Yuzhen, LIU Zhenbin. ON THE OBSERVABILITY OF FREE BOOLEAN NETWORKS VIA THE SEMI-TENSOR PRODUCT METHOD [J]. Journal of Systems Science and Complexity, 2014, 27(4): 666-678.|