Add to ORKGMotivated by an obstacle problem for a membrane subject to cohesion forces, constrained minimization problems involving a nonconvex and nondifferentiable objective functional representing the total potential energy are considered. The associated first-order optimality system leads to a hemivariational inequality, which can also be interpreted as a special complementarity problem in function space. Besides an analytical investigation of first-order optimality, a primal-dual active set solver is introduced. It is associated to a limit case of a semismooth Newton method for a regularized version of the underlying problem class. For the numerical algorithms studied in this paper, global as well as local convergence properties are derived and ve...
The paper investigates an inverse problem for a stationary variational-hemivariational inequality. T...
Abstract A semismooth Newton method, based on variational inequalities and generalized derivative, i...
We study the equilibrium position ofN elastic membranes attached to rigid supports and submitted to ...
Abstract. Motivated by an obstacle problem for a membrane subject to cohesion forces, constrained mi...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
In this paper, we consider a new kind of obstacle problem for the elastic membrane. The obstacle is ...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
We develop the complete free boundary analysis for solutions to classical obstacle problems related ...
The obstacle problem consists in computing equilibrium shapes of elastic membranes in contact with r...
AbstractIn this paper, we use the variational inequality theory coupled with finite difference techn...
The aim of this paper is to study an elliptic bilateral obstacle system (EBOS, for short) involving ...
A class of semismooth Newton methods for quadratic minimization problems subject to non-negativity c...
Abstract. We discuss a special mathematical programming problem with equilibrium constraints (MPEC),...
In this work we consider the numerical resolution of the bilateral obstacle optimal control problem ...
AbstractIn this paper we discuss the problem of computing and analyzing the static equilibrium of a ...
The paper investigates an inverse problem for a stationary variational-hemivariational inequality. T...
Abstract A semismooth Newton method, based on variational inequalities and generalized derivative, i...
We study the equilibrium position ofN elastic membranes attached to rigid supports and submitted to ...
Abstract. Motivated by an obstacle problem for a membrane subject to cohesion forces, constrained mi...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
In this paper, we consider a new kind of obstacle problem for the elastic membrane. The obstacle is ...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
We develop the complete free boundary analysis for solutions to classical obstacle problems related ...
The obstacle problem consists in computing equilibrium shapes of elastic membranes in contact with r...
AbstractIn this paper, we use the variational inequality theory coupled with finite difference techn...
The aim of this paper is to study an elliptic bilateral obstacle system (EBOS, for short) involving ...
A class of semismooth Newton methods for quadratic minimization problems subject to non-negativity c...
Abstract. We discuss a special mathematical programming problem with equilibrium constraints (MPEC),...
In this work we consider the numerical resolution of the bilateral obstacle optimal control problem ...
AbstractIn this paper we discuss the problem of computing and analyzing the static equilibrium of a ...
The paper investigates an inverse problem for a stationary variational-hemivariational inequality. T...
Abstract A semismooth Newton method, based on variational inequalities and generalized derivative, i...
We study the equilibrium position ofN elastic membranes attached to rigid supports and submitted to ...