Stability for Nash Equilibrium Problems
Abstract
This paper is devoted to studying the stability properties of the Karush-Kuhn-Tucker (KKT) solution mapping S KKT for Nash equilibrium problems (NEPs) with canonical perturbations. Firstly, we obtain an exact characterization of the strong regularity of S KKT and a sufficient condition that is easy to verify. Secondly, we propose equivalent conditions for the continuously differentiable single-valued localization of S KKT. Thirdly, the isolated calmness of S KKT is studied based on two conditions: Property A and Property B, and Property B proves to be sufficient for the robustness of both E(p) and S KKT under the convex assumptions, where E(p) denotes the Nash equilibria at perturbation p. Furthermore, we establish that studying the stability properties of the NEP with canonical perturbations is equivalent to studying those of the NEP with only tilt perturbations based on the prior discussions. Finally, we provide detailed characterizations of stability for NEPs whose each individual player solves a quadratic programming (QP) problem.
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