On the computation of all solutions of jointly convex generalized Nash equilibrium problems

@article{Facchinei2011OnTC,
  title={On the computation of all solutions of jointly convex generalized Nash equilibrium problems},
  author={Francisco Facchinei and Simone Sagratella},
  journal={Optimization Letters},
  year={2011},
  volume={5},
  pages={531-547}
}
Jointly convex generalized Nash equilibrium problems are the most studied class of generalized Nash equilibrium problems. For this class of problems it is now clear that a special solution, called variational or normalized equilibrium, can be computed by solving a variational inequality. However, the computation of nonvariational equilibria is more complex and less understood and only very few methods have been proposed so far. In this note we consider a new approach for the computation of non… CONTINUE READING

References

Publications referenced by this paper.
Showing 1-10 of 16 references

Finite-Dimensional Variational Inequalities and Complementarity Problems, Volumes 1 and 2

F. Facchinei, J. S. Pang
Springer, New York • 2003
View 3 Excerpts
Highly Influenced

Existence and uniqueness of equilibrium points for concave n-person games

J. B. Rosen
Econometrica 33, 520–534 • 1965
View 6 Excerpts
Highly Influenced

Nash equilibria: the variational approach

F. Facchinei, J. S. Pang
Palomar, D.P., Eldar, Y.C. (eds.) Convex Optimization in Signal Processing and Communications, pp. 443–493. Cambridge University Press, Cambridge • 2010
View 1 Excerpt

Similar Papers

Loading similar papers…