AbstractIn this paper, we study nonsmooth variational inequalities. Using nonsmooth analysis, we characterize various monotonicity properties of locally Lipschitzian functions and give some sufficient conditions to guarantee the local uniqueness of solutions to variational inequalities. Two iterative algorithms are also presented to solve nonsmooth variational inequalities
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
First we examine a resonant variational inequality driven by the p-Laplacian and with a nonsmooth po...
This paper studies the convergence of the classical proximal point algorithm without assuming monoto...
AbstractIn this paper, we study nonsmooth variational inequalities. Using nonsmooth analysis, we cha...
We propose a descent method via gap functions for solving nonsmooth variational inequalities with a ...
A descent method with a gap function is proposed for a finite-dimensional variational inequality wit...
AbstractThis paper investigates inexact Newton methods for solving systems of nonsmooth equations. W...
We consider mixed variational inequalities involving a non-strictly monotone, differentiable cost ma...
We provide a general regularization method for monotone variational inequalities, where the regulari...
In this paper, we introduce a new class of nonsmooth pseudo-invex and nonsmooth quasi-invex function...
The aim of paper is to prove a weak convergenceresult for finding a common of the set of fixed point...
This paper addresses the question of global convergence of descent processes for solving monotone va...
AbstractIt has long been known that variational inequality problems can be reformulated as nonsmooth...
AbstractThis note shows that several nonsmooth equation based methods proposed recently for affine v...
AbstractThis paper continues the series of investigations of the authors concerning approximate meth...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
First we examine a resonant variational inequality driven by the p-Laplacian and with a nonsmooth po...
This paper studies the convergence of the classical proximal point algorithm without assuming monoto...
AbstractIn this paper, we study nonsmooth variational inequalities. Using nonsmooth analysis, we cha...
We propose a descent method via gap functions for solving nonsmooth variational inequalities with a ...
A descent method with a gap function is proposed for a finite-dimensional variational inequality wit...
AbstractThis paper investigates inexact Newton methods for solving systems of nonsmooth equations. W...
We consider mixed variational inequalities involving a non-strictly monotone, differentiable cost ma...
We provide a general regularization method for monotone variational inequalities, where the regulari...
In this paper, we introduce a new class of nonsmooth pseudo-invex and nonsmooth quasi-invex function...
The aim of paper is to prove a weak convergenceresult for finding a common of the set of fixed point...
This paper addresses the question of global convergence of descent processes for solving monotone va...
AbstractIt has long been known that variational inequality problems can be reformulated as nonsmooth...
AbstractThis note shows that several nonsmooth equation based methods proposed recently for affine v...
AbstractThis paper continues the series of investigations of the authors concerning approximate meth...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
First we examine a resonant variational inequality driven by the p-Laplacian and with a nonsmooth po...
This paper studies the convergence of the classical proximal point algorithm without assuming monoto...
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