The “finite intersection property” for bifunctions is introduced and its relationship with generalized monotonicity properties is studied. Some characterizations are considered involving the Minty equilibrium problem. Also, some results concerning existence of equilibria and quasi-equilibria are established recovering several results in the literature. Furthermore, we give an existence result for generalized Nash equilibrium problems and variational inequality problems.
CITATION STYLE
Cotrina, J., & Svensson, A. (2021). The finite intersection property for equilibrium problems. Journal of Global Optimization, 79(4), 941–957. https://doi.org/10.1007/s10898-020-00961-5
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