E. E. A. Batista, G. C. Bento, O. P. Ferreira
Published 2015-11-26Version 1
In this paper an inexact proximal point method for variational inequalities in Hadamard manifolds is introduced and studied its convergence properties. The main tool used for presenting the method is the concept of enlargement of monotone vector fields, which generalizes the concept of enlargement of monotone operators from the linear setting to the Riemannian context. As an application, an inexact proximal point method for constrained optimization problems is obtained.
An inexact proximal point method for variational inequality on Hadamard manifolds
A parallel hybrid method for equilibrium problems, variational inequalities and nonexpansive mappings in Hilbert space
Exploring Jacobian Inexactness in Second-Order Methods for Variational Inequalities: Lower Bounds, Optimal Algorithms and Quasi-Newton Approximations
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