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Welfare-maximizing correlated equilibria using Kantorovich polynomials with sparsity

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  • Fook Kong
  • Berç Rustem

Abstract

We provide motivations for the correlated equilibrium solution concept from the game-theoretic and optimization perspectives. We then propose an algorithm that computes $${\varepsilon}$$ -correlated equilibria with global-optimal (i.e., maximum) expected social welfare for normal form polynomial games. We derive an infinite dimensional formulation of $${\varepsilon}$$ -correlated equilibria using Kantorovich polynomials, and re-express it as a polynomial positivity constraint. We exploit polynomial sparsity to achieve a leaner problem formulation involving sum-of-squares constraints. By solving a sequence of semidefinite programming relaxations of the problem, our algorithm converges to a global-optimal $${\varepsilon}$$ -correlated equilibrium. The paper ends with two numerical examples involving a two-player polynomial game, and a wireless game with two mutually-interfering communication links. Copyright Springer Science+Business Media, LLC. 2013

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  • Fook Kong & Berç Rustem, 2013. "Welfare-maximizing correlated equilibria using Kantorovich polynomials with sparsity," Journal of Global Optimization, Springer, vol. 57(1), pages 251-277, September.
    • Handle: RePEc:spr:jglopt:v:57:y:2013:i:1:p:251-277
    DOI: 10.1007/s10898-012-9912-5
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