Access the full text.
Sign up today, get DeepDyve free for 14 days.
Loading next page...
/lp/springer-journals/optimal-control-of-elliptic-variational-inequalities-dlEXTJMuJD
References (7)
-
Kazufumi Ito, K. Kunisch (1990)
The augmented lagrangian method for equality and inequality constraints in hilbert spacesMathematical Programming, 46
-
V. Barbu (1984)
Optimal control of variational inequalities -
V. Barbu, P. Neittaanmäki, A. Niemistö (1994)
Approximating optimal control problems governed by variational inequalitiesNumerical Functional Analysis and Optimization, 15
-
J. Outrata, J. Zowe (1995)
A numerical approach to optimization problems with variational inequality constraintsMathematical Programming, 68
-
Kazufumi Ito, K. Kunisch (1996)
Augmented Lagrangian-SQP-Methods in Hilbert Spaces and Application to Control in the Coefficients ProblemsSIAM J. Optim., 6
-
Kazufumi Ito, K. Kunisch (1996)
Augmented Lagrangian--SQP Methods for Nonlinear OptimalControl Problems of Tracking TypeSiam Journal on Control and Optimization, 34
-
G. Troianiello (1987)
Elliptic Differential Equations and Obstacle Problems
- Publisher
- Springer Journals
- Copyright
- 2000 Springer-Verlag New York Inc.
- Subject
- Mathematics; Calculus of Variations and Optimal Control; Optimization; Systems Theory, Control; Theoretical, Mathematical and Computational Physics; Mathematical Methods in Physics; Numerical and Computational Physics, Simulation
- ISSN
- 0095-4616
- eISSN
- 1432-0606
- DOI
- 10.1007/s002459911017
- Publisher site
- See Article on Publisher Site
Abstract
Abstract. Optimality systems for optimal control problems governed by elliptic variational inequalities are derived. Existence of appropriately defined Lagrange multipliers is proved. A primal—dual active set method is proposed to solve the optimality systems numerically. Examples with and without lack of strict complementarity are included.
Journal
Applied Mathematics and Optimization – Springer Journals
Published: Jun 1, 2000