Universality of Nash Equilibria
Published Online:1 Aug 2003https://doi.org/10.1287/moor.28.3.424.16397
References
- Topology of Real Algebraic Sets (1992) (Springer-Verlag, Berlin) Crossref, Google Scholar
- Oddness of the number of equilibrium points: A new proof. Internat. J. Game Theory (1973) 2:235–250Crossref, Google Scholar
- Rational learning leads to Nash equilibrium. Econometrica (1993) 61:1019–1045Crossref, Google Scholar
- , Breese J., Koller D. Graphical models for game theory. Uncertainty in Artificial Intelligence: Proc. of the Seventeenth Conference (2001) (Morgan Kauffman Publishers, San Francisco, CA) 253–260Google Scholar
- The maximal number of regular totally mixed Nash equilibria. J. Econom. Theory (1997) 72:411–425Crossref, Google Scholar
- , Viro O. Ya. The universality theorems on the classification problem of configuration varieties and convex polytopes varieties. Topology and Geometry—Rohlin Seminar (1988) (Springer, Heidelberg, Germany) 527–544Crossref, Google Scholar
- Real algebraic manifolds. Ann. Math. (1952) 116:133–176Google Scholar
- Realization spaces of 4-polytopes are universal. Bull. Amer. Math. Soc. (1995) 32:403–412Crossref, Google Scholar
- , Gritzmann P., Sturmfels B. Stretchability of pseudolines is NP-hard. Applied Geometry and Discrete Mathematics: The Victor Klee Festschrift (1991) (American Mathematical Society, Providence, RI) 531–554Crossref, Google Scholar
- Numerical homotopies to compute generic points on positive dimensional algebraic sets. J. Complexity (2000) 16:572–602Crossref, Google Scholar
- Solving Systems of Polynomial Equations (2002) (American Mathematical Society, Providence, RI) Crossref, Google Scholar
- Su una congettura di Nash. Annali della Scuola Normale Superiore di Pisa (1973) 27:167–185Google Scholar
- Algorithm 795: PHCpack: A general-purpose solver for polynomial systems by homotopy continuation. ACM Trans. Math. Software (1999) 25:251–276Crossref, Google Scholar
