We address the solution of constrained nonlinear systems by new linesearch quasi-Newton methods. These methods are based on a proper use of the projection map onto the convex constraint set and on a derivative-free and nonmonotone linesearch strategy. The convergence properties of the proposed methods are presented along with a worst-case iteration complexity bound. Several implementations of the proposed scheme are discussed and validated on bound-constrained problems including gas distribution network models. The results reported show that the new methods are very efficient and competitive with an existing affine-scaling procedure.
Quasi-Newton methods for constrained nonlinear systems: complexity analysis and applications / Leopoldo Marini, Benedetta Morini, Margherita Porcelli. - In: COMPUTATIONAL OPTIMIZATION AND APPLICATIONS. - ISSN 1573-2894. - STAMPA. - 71:(2018), pp. 147-170. [10.1007/s10589-018-9980-7]
Quasi-Newton methods for constrained nonlinear systems: complexity analysis and applications
Leopoldo Marini;Benedetta Morini
;Margherita Porcelli
2018
Abstract
We address the solution of constrained nonlinear systems by new linesearch quasi-Newton methods. These methods are based on a proper use of the projection map onto the convex constraint set and on a derivative-free and nonmonotone linesearch strategy. The convergence properties of the proposed methods are presented along with a worst-case iteration complexity bound. Several implementations of the proposed scheme are discussed and validated on bound-constrained problems including gas distribution network models. The results reported show that the new methods are very efficient and competitive with an existing affine-scaling procedure.
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