As shown in [8], the semismooth Newton method lacks of convergence if the parameter is not sufficiently large. This is, however, in contrast with typical applications, where a sufficiently small is required [6, 8]. The goal of this paper is to tackle this problem by using a nonlinear preconditioning technique based on an overlapping optimized waveform-relaxation method (WRM) characterized by Robin transmission conditions [2, 3]
Optimal control problems with partial differential equations as constraints play an important role i...
Abstract: This paper surveys the family of Waveform Relaxation Methods for solving large systems of ...
This thesis contributes to develop a new class of methods for the numerical solution of partial diff...
We discuss preconditioning and overlapping of waveform relaxation methods for sparse linear differen...
This paper is concerned with a novel convergence analysis of the optimized Schwarz waveform relaxati...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
This thesis contributes to develop a new class of methods for the numerical solution of partial diff...
Abstract. In this paper optimal control problems governed by the wave equation with control constrai...
Abstract. In this paper optimal control problems governed by the wave equation with control constrai...
In the integrated design of complex technical systems the coupling of highly developed specialized s...
While optimality conditions for optimal control problems with state constraints have been extensivel...
Optimal control problems with partial differential equations play an important role in many applicat...
Recent results in the study of the Hamilton Jacobi Bellman (HJB) equation have led to the discovery ...
Optimal control problems with partial differential equations as constraints play an important role i...
We deal with methods of parameter continuation in applied optimal control problem using the maximum ...
Optimal control problems with partial differential equations as constraints play an important role i...
Abstract: This paper surveys the family of Waveform Relaxation Methods for solving large systems of ...
This thesis contributes to develop a new class of methods for the numerical solution of partial diff...
We discuss preconditioning and overlapping of waveform relaxation methods for sparse linear differen...
This paper is concerned with a novel convergence analysis of the optimized Schwarz waveform relaxati...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
This thesis contributes to develop a new class of methods for the numerical solution of partial diff...
Abstract. In this paper optimal control problems governed by the wave equation with control constrai...
Abstract. In this paper optimal control problems governed by the wave equation with control constrai...
In the integrated design of complex technical systems the coupling of highly developed specialized s...
While optimality conditions for optimal control problems with state constraints have been extensivel...
Optimal control problems with partial differential equations play an important role in many applicat...
Recent results in the study of the Hamilton Jacobi Bellman (HJB) equation have led to the discovery ...
Optimal control problems with partial differential equations as constraints play an important role i...
We deal with methods of parameter continuation in applied optimal control problem using the maximum ...
Optimal control problems with partial differential equations as constraints play an important role i...
Abstract: This paper surveys the family of Waveform Relaxation Methods for solving large systems of ...
This thesis contributes to develop a new class of methods for the numerical solution of partial diff...