The method of multipliers for variational inequalities with nonstrictly monotone cost mappings and convex differentiable constraints is considered. We prove the convergence of the method with an arbitrary value of the penalty parameter. We suggest to evaluate accuracy of solutions of auxiliary subproblems with the help of gap functions
. We propose new methods for solving the variational inequality problem where the underlying functio...
. The paper considers two cases of variational inequality problems. The first case involves an affin...
AbstractIn this paper, we suggest and analyze a new projection-type method for solving monotone vari...
The method of multipliers for variational inequalities with nonstrictly monotone cost mappings and c...
For variational inequalities with the feasible set given by linear or nonlinear convex constraints, ...
A simple iterative method for solving variational inequalities with a set-valued, nonmonotone mappin...
We consider here a generalization of exact penalty functions approach to solution of variational ine...
AbstractThis paper presents a new class of projection and contraction methods for solving monotone v...
In this paper, we describe a class of combined relaxation methods for the non strictly monotone nonl...
Real-life problems are governed by equations which are nonlinear in nature. Nonlinear equations occu...
© 2013, © 2013 Taylor & Francis. We consider a class of non-linear problems which is intermediate be...
We consider mixed variational inequalities involving a non-strictly monotone, differentiable cost ma...
We solve a general variational inequality problem in a finite-dimensional setting, where only approx...
When applied to variational inequalities, combined relaxation (CR) methods are convergent under mild...
For monotone mixed variational inequalities, a solution method is proposed that combines regularizat...
. We propose new methods for solving the variational inequality problem where the underlying functio...
. The paper considers two cases of variational inequality problems. The first case involves an affin...
AbstractIn this paper, we suggest and analyze a new projection-type method for solving monotone vari...
The method of multipliers for variational inequalities with nonstrictly monotone cost mappings and c...
For variational inequalities with the feasible set given by linear or nonlinear convex constraints, ...
A simple iterative method for solving variational inequalities with a set-valued, nonmonotone mappin...
We consider here a generalization of exact penalty functions approach to solution of variational ine...
AbstractThis paper presents a new class of projection and contraction methods for solving monotone v...
In this paper, we describe a class of combined relaxation methods for the non strictly monotone nonl...
Real-life problems are governed by equations which are nonlinear in nature. Nonlinear equations occu...
© 2013, © 2013 Taylor & Francis. We consider a class of non-linear problems which is intermediate be...
We consider mixed variational inequalities involving a non-strictly monotone, differentiable cost ma...
We solve a general variational inequality problem in a finite-dimensional setting, where only approx...
When applied to variational inequalities, combined relaxation (CR) methods are convergent under mild...
For monotone mixed variational inequalities, a solution method is proposed that combines regularizat...
. We propose new methods for solving the variational inequality problem where the underlying functio...
. The paper considers two cases of variational inequality problems. The first case involves an affin...
AbstractIn this paper, we suggest and analyze a new projection-type method for solving monotone vari...