Weighted Potential Incomplete-Profile Games

In this paper the weighted potential incomplete-profile games are studied. First a potential equation with algebraic form is established to check whether an incomplete-profile normal form game (IPNFG) is a weighted potential game with weight <inline-formula> <tex-math notation="LaTeX">$w>0$ </tex-math></inline-formula> or not, based on which, the potential function can be constructed. Then the weighted potential subspace and the non-strategic subspace and some properties of weighted potential incomplete-profile games are obtained. Finally, an example is given to illustrate our theoretical results.

[1]  Tiina Heikkinen,et al.  A potential game approach to distributed power control and scheduling , 2006, Comput. Networks.

[2]  Fangfei Li,et al.  On stabilization and set stabilization of multivalued logical systems , 2017, Autom..

[3]  Nan Xiao,et al.  Distributed consensus in noncooperative congestion games: An application to road pricing , 2013, 2013 10th IEEE International Conference on Control and Automation (ICCA).

[4]  Yang Liu,et al.  Feedback Controller Design for the Synchronization of Boolean Control Networks , 2016, IEEE Transactions on Neural Networks and Learning Systems.

[5]  Shihua Fu,et al.  A Matrix Approach to the Analysis and Control of Networked Evolutionary Games with Bankruptcy Mechanism , 2017 .

[6]  Hongyan Liu,et al.  Controllability and Optimal Control of Higher-Order Incomplete Boolean Control Networks With Impulsive Effects , 2018, IEEE Access.

[7]  Guodong Zhao,et al.  A survey on applications of semi-tensor product method in engineering , 2017, Science China Information Sciences.

[8]  Yusuke Hino,et al.  An improved algorithm for detecting potential games , 2011, Int. J. Game Theory.

[9]  Fuad E. Alsaadi,et al.  Algebraic formulation and topological structure of Boolean networks with state-dependent delay , 2019, J. Comput. Appl. Math..

[10]  Daizhan Cheng,et al.  Matrix expression of Shapley values and its application to distributed resource allocation , 2018, Science China Information Sciences.

[11]  Ma Jin Approximation of the Boundary of Power System Stability Region Based on Semi-tensor Theory Part One Theoretical Basis , 2006 .

[12]  Yang Liu,et al.  Stabilization of evolutionary networked games with length-r information , 2018, Appl. Math. Comput..

[13]  H. Ohtsuki,et al.  A simple rule for the evolution of cooperation on graphs and social networks , 2006, Nature.

[14]  I. Milchtaich,et al.  Congestion Games with Player-Specific Payoff Functions , 1996 .

[15]  Xinyun Liu,et al.  On potential equations of finite games , 2015, Autom..

[16]  Daizhan Cheng,et al.  On finite potential games , 2014, Autom..

[17]  David M. Kreps,et al.  Game Theory and Economic Modelling , 1992 .

[18]  Asuman E. Ozdaglar,et al.  Flows and Decompositions of Games: Harmonic and Potential Games , 2010, Math. Oper. Res..

[19]  L. Shapley,et al.  Potential Games , 1994 .

[20]  Zengqiang Chen,et al.  Semi-tensor product of matrices approach to reachability of finite automata with application to language recognition , 2014, Frontiers of Computer Science.

[21]  S. Hart,et al.  Potential, value, and consistency , 1989 .

[22]  Qing Zhang,et al.  Calculation of Siphons and Minimal Siphons in Petri Nets Based on Semi-Tensor Product of Matrices , 2017, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[23]  Daizhan Cheng,et al.  Incomplete-profile potential games , 2017, J. Frankl. Inst..

[24]  Weiwei Sun,et al.  Modelling and strategy consensus for a class of networked evolutionary games , 2018, Int. J. Syst. Sci..

[25]  Yang Liu,et al.  Survey on semi-tensor product method with its applications in logical networks and other finite-valued systems , 2017 .

[26]  Daizhan Cheng,et al.  Block Decoupling of Boolean Control Networks , 2019, IEEE Transactions on Automatic Control.

[27]  L. Blume The Statistical Mechanics of Strategic Interaction , 1993 .

[28]  Lei Deng,et al.  State feedback control design to avoid players going bankrupt , 2019, Asian Journal of Control.

[29]  Daizhan Cheng,et al.  Modeling, Analysis and Control of Networked Evolutionary Games , 2015, IEEE Transactions on Automatic Control.

[30]  Xiaojing Xu,et al.  Finite-time stability analysis of stochastic switched boolean networks with impulsive effect , 2019, Appl. Math. Comput..

[31]  D. Cheng,et al.  An Introduction to Semi-Tensor Product of Matrices and Its Applications , 2012 .

[32]  Mei Shengwei Polynomial approximation of a nonlinear system and its application topower system (I):Theoretical justification , 2010 .

[33]  F. Alsaadi,et al.  Semi-tensor product method to a class of event-triggered control for finite evolutionary networked games , 2017 .

[34]  Jason R. Marden,et al.  Cooperative Control and Potential Games , 2009, IEEE Transactions on Systems, Man, and Cybernetics, Part B (Cybernetics).

[35]  Sonia Martínez,et al.  Distributed Coverage Games for Energy-Aware Mobile Sensor Networks , 2013, SIAM J. Control. Optim..

[36]  R. Sugden The Economics of Rights, Co-Operation, and Welfare , 1986 .

[37]  Daizhan Cheng,et al.  From weighted potential game to weighted harmonic game , 2017 .