Title :
Dual techniques for constrained optimization. II
Author :
Hager, William W.
Author_Institution :
Dept. of Math., Florida Univ., Gainesville, FL, USA
Abstract :
For pt.I see J. Optim. Theory Appl., vol.55, p.37-71 (1987). An algorithm for constrained optimization that combines an unconstrained minimization scheme like the conjugate gradient method, an augmented Lagrangian, and multiplier updates to obtain global quadratic convergence was presented in part I. Issues related to the numerical implementation of the algorithm are considered here. The convergence theory is extended to handle the rigid constraints that are not violated during the iterations. A strategy is developed for balancing the error associated with constraint violation with the error associated with optimality. Various numerical linear algebra techniques required for the efficient implementation of the algorithm are also developed, and the convergence properties of the algorithm are illustrated using some standard test problems
Keywords :
convergence; duality (mathematics); linear algebra; optimisation; augmented Lagrangian; balancing; conjugate gradient method; constrained optimization; dual techniques; global quadratic convergence; multiplier updates; numerical linear algebra; unconstrained minimization; Constraint optimization; Constraint theory; Convergence; Gradient methods; Lagrangian functions; Linear algebra; Mathematics; Minimization methods; Standards development; Upper bound;
Conference_Titel :
Decision and Control, 1989., Proceedings of the 28th IEEE Conference on
Conference_Location :
Tampa, FL
DOI :
10.1109/CDC.1989.70138
