The optimization of functions subject to partial differential equations (PDE) plays an important role in many areas of science and industry. In this paper we introduce the basic concepts of PDE-constrained optimization and show how the all-at-once approach will lead to linear systems in saddle point form. We will discuss implementation details and different boundary conditions. We then show how these system can be solved efficiently and discuss methods and preconditioners also in the case when bound constraints for the control are introduced. Numerical results will illustrate the competitiveness of our techniques

Anderson E.

Bangerth W.

Becker R.

G. Kanschat

Hartmann R.

Kanschat G.

R. Hartmann

W. Bangerth

English

Rees, Tyrone

Stoll, Martin

Wathen, A. J.

Oxford University Research Archive (ORA)

All-at-once preconditioning in PDE-constrained optimization

An overview of the software design and data abstraction decisions chosen for deal.II, a general purpose finite element library written in C++, is given. The library uses advanced object-oriented and data encapsulation techniques to break finite element implementations into smaller blocks that can be arranged to fit users requirements. Through this approach, deal.II supports a large number of different applications covering a wide range of scientific areas, programming methodologies, and application-specific algorithms, without imposing a rigid framework into which they have to fit. A judicious use of programming techniques allows to avoid the computational costs frequently associated with abstract object-oriented class libraries. The paper presents a detailed description of the abstractions chosen for defining geometric information of meshes and the handling of degrees of freedom associated with finite element spaces, as well as of linear algebra, input/output capabilities and of interfaces to other software, such as visualization tools. Finally, some results obtained with applications built atop deal.II are shown to demonstrate the powerful capabilities of this toolbox

CiteSeerX

deal.II --– a general purpose object oriented finite element library

Tyrone Rees

Martin Stoll

Andy Wathen

An overview of the software design and data abstraction   decisions chosen for deal.II, a general purpose finite element   library written in C++, is given. The library uses advanced   object-oriented and data encapsulation techniques to break finite   element implementations into smaller blocks that can be arranged   to fit users requirements. Through this approach, deal.II supports a large number of   different applications covering a wide range of scientific areas,   programming methodologies, and application-specific algorithms, without imposing   a rigid framework into which they have to fit. A judicious use of   programming techniques allows to avoid the computational costs frequently   associated with abstract object-oriented class libraries.   The paper presents a detailed description of the abstractions chosen for   defining geometric information of meshes and the handling of degrees   of freedom associated with finite element spaces, as well as   of linear algebra, input/output capabilities and of   interfaces to other software, such as visualization tools.  Finally,   some results obtained with applications built atop   deal.II are shown to demonstrate the powerful capabilities of this toolbox

Bangerth, Wolfgang

Kanschat, Guido

Hartmann, Ralf

Heidelberger Dokumentenserver

deal.II -- a General Purpose Object Oriented Finite Element Library

Oxford University Research Archive

summary:The optimization of functions subject to partial differential equations (PDE) plays an important role in many areas of science and industry. In this paper we introduce the basic concepts of PDE-constrained optimization and show how the all-at-once approach will lead to linear systems in saddle point form. We will discuss implementation details and different boundary conditions. We then show how these system can be solved efficiently and discuss methods and preconditioners also in the case when bound constraints for the control are introduced. Numerical results will illustrate the competitiveness of our techniques

Wathen, Andy

Czech digital mathematics library

Institute of Mathematics AS CR, v. v. i.

An overview of the software design and data abstraction decisions chosen for 

deal.II, a general purpose finite element library written in C++, is given. The library uses advanced object-oriented and data encapsulation techniques to break finite element implementations into smaller blocks that can be arranged to fit users requirements. Through this approach, deal.II supports a large number of different applications covering a wide range of scientific areas, programming methodologies, and application-specific algorithms, without imposing a rigid framework into which they have to fit. A judicious use of programming techniques allows us to avoid the computational costs frequently associated with abstract object-oriented class libraries. The paper presents a detailed description of the abstractions chosen for defining geometric information of meshes and the handling of degrees of freedom associated with finite element spaces, as well as of linear algebra, input/output capabilities and of interfaces to other software, such as visualization tools. Finally, some results obtained with applications built atop deal.II are shown to demonstrate the powerful capabilities of this toolbox

Guido, Kanschat

Institute of Transport Research:Publications

deal.II --- a General Purpose Object Oriented Finite Element Library

A multigrid method for constrained optimal control problems, SFB-Preprint 406, Sonderforschungsbereich 611, Rheinische Friedrich-WilhelmsUniversita¨t Bonn,

A note on preconditioning for indefinite linear systems,

A preconditioning technique for indefinite systems resulting from mixed approximations of elliptic problems,

Analysis of the streamline upwind/Petrov Galerkin method applied to the solution of optimal control problems,

Block triangular preconditioners for PDE constrained optimization, Submitted to Numer. Linear Algebra Appl.,

Chebyshev Semi-iteration in Preconditioning, ETNA, to appear,

Chebyshev semi-iterative methods, successive over-relaxation iterative methods, and second order Richardson iterative methods.

Chebyshev semi-iterative methods, successive overrelaxation iterative methods, and second order Richardson iterative methods.

deal.II—a general-purpose objectoriented finite element library,

Finite elements and fast iterative solvers: with applications in incompressible fluid dynamics, Numerical Mathematics and Scientific Computation,

Iterative methods for solving linear systems,

Iterative methods for sparse linear systems,

Lagrange multiplier approach to variational problems and applications,

Methods of conjugate gradients for solving linear systems,

Numerical optimization,

Numerical solution of saddle point problems,

On the numerical solution of the biharmonic equation and the role of squaring matrices for preconditioning,

Optimal solvers for PDE-Constrained Optimization,

Optimale Steuerung partieller Differentialgleichungen: Theorie, Verfahren und Anwendungen, Vieweg Verlag,

Practical optimization,

Preconditioning for PDE constrained optimization with control constraints,

Primal-dual strategy for constrained optimal control problems,

Projected Newton methods for optimization problems with simple constraints,

smoothed aggregation user’s guide,

Solutions of sparse indefinite systems of linear equations,

The primal-dual active set strategy as a semismooth Newton method,

http://dml.cz/bitstream/handle/10338.dmlcz/140748/Kybernetika_46-2010-2_9.pdf

All-at-once preconditioning in PDE-constrained optimization

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Oxford University Research Archive (ORA)

CiteSeerX

CiteSeerX

Heidelberger Dokumentenserver

Oxford University Research Archive

Czech digital mathematics library

Institute of Mathematics AS CR, v. v. i.

Institute of Transport Research:Publications