Vedel Y.I., Denisov S.V., Semenov V.V.
An adaptive algorithm for the variational inequality over the set of solutions of the equilibrium problem

In the paper, we consider bilevel problems: variational inequality problems over the set of solutions of the equilibrium problem. Finding normal Nash equilibrium is an example of such a problem. To solve these problems, an iterative algorithm is proposed that combines the ideas of the two-stage proximal method, adaptability, and iterative regularization. In contrast to the previously used rules for choosing the step size, the proposed algorithm does not calculate bifunction values at additional points and does not require knowledge of information on bifunction’s Lipschitz constants and operator’s Lipschitz and strong monotonicity constants. For monotone bifunctions of Lipschitz type and strongly monotone Lipschitz operators, the theorem on strong convergence of sequences generated by the algorithm is proved. The proposed algorithm is shown to be applicable to monotone bilevel variational inequalities in Hilbert spaces. © 2021, Springer Science+Business Media, LLC, part of Springer Nature.

Keywords: adaptivity, bilevel problem, equilibrium problem, iterative regularization, strong convergence, two-stage proximal algorithm, variational inequality, Adaptive algorithms, Variational techniques, Equilibrium problem, Iterative algorithm, Iterative regularization, Lipschitz constant, Strong convergence, Strongly-monotones, Variational inequalities, Variational inequality problems, Iterative methods

Cite:
Vedel Y.I., Denisov S.V., Semenov V.V. (2021). An adaptive algorithm for the variational inequality over the set of solutions of the equilibrium problem. Cybernetics and Systems Analysis, 57 (1), 104–114. doi: https://doi.org/10.1007/s10559-021-00332-2 http://jnas.nbuv.gov.ua/article/UJRN-0001199860 [In Russian].