Add to ORKG© 2015, walter de gruyter gmbh. All rights reserved. New iterative solution methods are proposed for the finite element approximation of a class of variational inequalities with nonlinear diffusion-convection operator and constraints to the gradient of solution. Implementation of every iteration of these methods reduces to the solution of a system of linear equations and a set of two-dimensional minimization problems. Convergence is proved by the application of a general result on the convergence of the iterative methods for a nonlinear constrained saddle point problem
An optimal control problem with distributed control in the right-hand side of Poisson equation is co...
We consider nonlinear algebraic systems resulting from numerical discretizations of nonlinear partia...
Abstract. A class of globally convergent iterative methods for solving nonlinear projection equation...
© 2015, walter de gruyter gmbh. All rights reserved. New iterative solution methods are proposed for...
Convergence of the preconditioned Uzawa-type and Arrow-Hurwitz-type iterative methods for nonlinear ...
© 2015, Allerton Press, Inc. We construct and investigate a new iterative solution method for a fini...
Abstract Non-overlapping domain decomposition method is applied to a variational inequality with no...
AbstractIn this paper, we introduce and study a new class of nonlinear variational inequalities. Thi...
This report concerns with the numerical solution of nonlinear reaction diffusion equations at the st...
A variational principle is proposed that under certain restrictions is shown to be equivalent to the...
summary:The present paper deals with the numerical solution of the nonlinear heat equation. An itera...
For the case of approximation of convection diffusion equations using piecewise affine continuous fi...
In this paper, we introduce a new method to analyze the convergence of the standard finite element m...
A finite element Galerkin method for a diffusion equation with constrained energy and nonlinear boun...
AbstractWe present new linear convergence results for iterative methods for solving the variational ...
An optimal control problem with distributed control in the right-hand side of Poisson equation is co...
We consider nonlinear algebraic systems resulting from numerical discretizations of nonlinear partia...
Abstract. A class of globally convergent iterative methods for solving nonlinear projection equation...
© 2015, walter de gruyter gmbh. All rights reserved. New iterative solution methods are proposed for...
Convergence of the preconditioned Uzawa-type and Arrow-Hurwitz-type iterative methods for nonlinear ...
© 2015, Allerton Press, Inc. We construct and investigate a new iterative solution method for a fini...
Abstract Non-overlapping domain decomposition method is applied to a variational inequality with no...
AbstractIn this paper, we introduce and study a new class of nonlinear variational inequalities. Thi...
This report concerns with the numerical solution of nonlinear reaction diffusion equations at the st...
A variational principle is proposed that under certain restrictions is shown to be equivalent to the...
summary:The present paper deals with the numerical solution of the nonlinear heat equation. An itera...
For the case of approximation of convection diffusion equations using piecewise affine continuous fi...
In this paper, we introduce a new method to analyze the convergence of the standard finite element m...
A finite element Galerkin method for a diffusion equation with constrained energy and nonlinear boun...
AbstractWe present new linear convergence results for iterative methods for solving the variational ...
An optimal control problem with distributed control in the right-hand side of Poisson equation is co...
We consider nonlinear algebraic systems resulting from numerical discretizations of nonlinear partia...
Abstract. A class of globally convergent iterative methods for solving nonlinear projection equation...