• Media type: E-Article
  • Title: Slicing the Nash equilibrium manifold
  • Contributor: Levy, Yehuda John
  • Published: Springer Science and Business Media LLC, 2023
  • Published in: Journal of Fixed Point Theory and Applications, 25 (2023) 4
  • Language: English
  • DOI: 10.1007/s11784-023-01088-2
  • ISSN: 1661-7738; 1661-7746
  • Keywords: Applied Mathematics ; Geometry and Topology ; Modeling and Simulation
  • Origination:
  • Footnote:
  • Description: AbstractThis paper uses tools on the structure of the Nash equilibrium correspondence of strategic-form games to characterize a class of fixed-point correspondences, that is, correspondences assigning, for a given parametrized function, the fixed-points associated with each value of the parameter. After generalizing recent results from the game-theoretic literature, we deduce that every fixed-point correspondence associated with a semi-algebraic function is the projection of a Nash equilibrium correspondence, and hence its graph is a slice of a projection, as well as a projection of a slice, of a manifold that is homeomorphic, even isotopic, to a Euclidean space. As a result, we derive an illustrative proof of Browder’s theorem for fixed-point correspondences.