TY - JOUR
T1 - Distributed Population Dynamics
T2 - Optimization and Control Applications
AU - Barreiro-Gomez, Julian
AU - Obando, Germán
AU - Quijano, Nicanor
N1 - Funding Information:
This work was supported in part by Colciencias Colfuturo-Colombia, under Grant 528 and Grant 6172, in part by Universidad de los Andes, and in part by the project ALTERNAR, BPIN 20130001000089, OCAD-Fondo de CTel-SGR Colombia, under Grant Acuerdo 005 de 2013. J. Barreiro-Gomez and G. Obando contributed equally to this work.
Publisher Copyright:
© 2016 IEEE.
Copyright:
Copyright 2017 Elsevier B.V., All rights reserved.
PY - 2017/2
Y1 - 2017/2
N2 - Population dynamics have been widely used in the design of learning and control systems for networked engineering applications, where the information dependency among elements of the network has become a relevant issue. Classic population dynamics (e.g., replicator, logit choice, Smith, and projection) require full information to evolve to the solution (Nash equilibrium). The main reason is that classic population dynamics are deduced by assuming well-mixed populations, which limits the applications where this theory can be implemented. In this paper, we extend the concept of population dynamics for nonwell-mixed populations in order to deal with distributed information structures that are characterized by noncomplete graphs. Although the distributed population dynamics proposed in this paper use partial information, they preserve similar characteristics and properties of their classic counterpart. Specifically, we prove mass conservation and convergence to Nash equilibrium. To illustrate the performance of the proposed dynamics, we show some applications in the solution of optimization problems, classic games, and the design of distributed controllers.
AB - Population dynamics have been widely used in the design of learning and control systems for networked engineering applications, where the information dependency among elements of the network has become a relevant issue. Classic population dynamics (e.g., replicator, logit choice, Smith, and projection) require full information to evolve to the solution (Nash equilibrium). The main reason is that classic population dynamics are deduced by assuming well-mixed populations, which limits the applications where this theory can be implemented. In this paper, we extend the concept of population dynamics for nonwell-mixed populations in order to deal with distributed information structures that are characterized by noncomplete graphs. Although the distributed population dynamics proposed in this paper use partial information, they preserve similar characteristics and properties of their classic counterpart. Specifically, we prove mass conservation and convergence to Nash equilibrium. To illustrate the performance of the proposed dynamics, we show some applications in the solution of optimization problems, classic games, and the design of distributed controllers.
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U2 - 10.1109/TSMC.2016.2523934
DO - 10.1109/TSMC.2016.2523934
M3 - Research Article
AN - SCOPUS:85010006559
SN - 1083-4427
VL - 47
SP - 304
EP - 314
JO - IEEE Transactions on Systems, Man, and Cybernetics: Systems
JF - IEEE Transactions on Systems, Man, and Cybernetics: Systems
IS - 2
M1 - 7419636
ER -