Abstract. Semi-smooth Newton methods for elliptic equations with gradi-ent constraints are investigated. The one- and multi-dimensional cases are treated separately. Numerical examples illustrate the approach and as well as structural features of the solution.
A class of semismooth Newton methods for quadratic minimization problems subject to non-negativity c...
A class of semilinear elliptic equations with dependence on the gradient is considered. The existenc...
Newton’s iteration is studied for the numerical solution of an elliptic PDE with nonlinear boundary ...
This paper gives a common theoretical treatment for gradient and Newton type methods for general cl...
In dieser Dissertationsarbeit wurde ein neuer Algorithmus zur numerischen Lösung des Minimierungspro...
Abstract. The paper gives a common theoretical treatment for gradient and Newton type methods for ge...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
AbstractThe coupling of the Sobolev space gradient method and the finite element method is developed...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gra-dient constraints...
The semi-smooth Newton method for optimal control problemsfor systems of partial differential equati...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gradientconstraints i...
In this short manuscript, we briefly recall some well-known methods for obtaining gradient bounds of...
Optimal control for an elliptic system with pointwise Euclidean norm constraints on the control vari...
In the paper, a Newton-type method for the solution of generalized equations (GEs) is derived, where...
Abstract In this paper, we consider the numerical method for solving finite-dimensional quasi-variat...
A class of semismooth Newton methods for quadratic minimization problems subject to non-negativity c...
A class of semilinear elliptic equations with dependence on the gradient is considered. The existenc...
Newton’s iteration is studied for the numerical solution of an elliptic PDE with nonlinear boundary ...
This paper gives a common theoretical treatment for gradient and Newton type methods for general cl...
In dieser Dissertationsarbeit wurde ein neuer Algorithmus zur numerischen Lösung des Minimierungspro...
Abstract. The paper gives a common theoretical treatment for gradient and Newton type methods for ge...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
AbstractThe coupling of the Sobolev space gradient method and the finite element method is developed...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gra-dient constraints...
The semi-smooth Newton method for optimal control problemsfor systems of partial differential equati...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gradientconstraints i...
In this short manuscript, we briefly recall some well-known methods for obtaining gradient bounds of...
Optimal control for an elliptic system with pointwise Euclidean norm constraints on the control vari...
In the paper, a Newton-type method for the solution of generalized equations (GEs) is derived, where...
Abstract In this paper, we consider the numerical method for solving finite-dimensional quasi-variat...
A class of semismooth Newton methods for quadratic minimization problems subject to non-negativity c...
A class of semilinear elliptic equations with dependence on the gradient is considered. The existenc...
Newton’s iteration is studied for the numerical solution of an elliptic PDE with nonlinear boundary ...