A variational inequality framework for network games: Existence, uniqueness, convergence and sensitivity analysis

Author(s)
Parise, FrancescaOzdagalar, Asuman E.
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Abstract
We provide a unified variational inequality framework for the study of fundamental properties of the Nash equilibrium in network games. We identify several conditions on the underlying network (in terms of spectral norm, infinity norm and minimum eigenvalue of its adjacency matrix) that guarantee existence, uniqueness, convergence and continuity of equilibrium in general network games with multidimensional and possibly constrained strategy sets. We delineate the relations between these conditions and characterize classes of networks that satisfy each of these conditions. Keywords: network games, variational inequalities, strong monotonicity, uniform P-function, Nash equilibrium, existence and uniqueness, best response dynamics, sensitivity analysis
Date issued
2019-03
URI
https://hdl.handle.net/1721.1/121465
Department
Massachusetts Institute of Technology. Laboratory for Information and Decision SystemsMassachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
Journal
Games and Economic Behavior
Publisher
Elsevier BV
Citation
Parise, Francesca, and Asuman Ozdaglar. “A Variational Inequality Framework for Network Games: Existence, Uniqueness, Convergence and Sensitivity Analysis.” Games and Economic Behavior 114 (March 2019): 47–82.
Version: Original manuscript
ISSN
0899-8256
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