This paper presents an iterative method for solving bound-constrained systems of nonlinear equations. It combines ideas from the classical trust-region Newton method for unconstrained nonlinear equations and the recent interior affine scaling approach for constrained optimization problems. The method generates feasible iterates and handles the bounds implicitly. It reduces to a standard trust-region method for unconstrained problems when there are no upper or lower bounds on the variables. Global and local fast convergence properties are obtained. The numerical performance of the method is shown on a large number of test problems

An affine scaling trust-region approach to bound-constrained nonlinear systems / BELLAVIA S.; MACCONI M.; B. MORINI. - In: APPLIED NUMERICAL MATHEMATICS. - ISSN 0168-9274. - STAMPA. - 44:(2003), pp. 257-280. [10.1016/S0168-9274(02)00170-8]

An affine scaling trust-region approach to bound-constrained nonlinear systems.

BELLAVIA, STEFANIA;MACCONI, MARIA;MORINI, BENEDETTA
2003

Abstract

This paper presents an iterative method for solving bound-constrained systems of nonlinear equations. It combines ideas from the classical trust-region Newton method for unconstrained nonlinear equations and the recent interior affine scaling approach for constrained optimization problems. The method generates feasible iterates and handles the bounds implicitly. It reduces to a standard trust-region method for unconstrained problems when there are no upper or lower bounds on the variables. Global and local fast convergence properties are obtained. The numerical performance of the method is shown on a large number of test problems
2003
44
257
280
BELLAVIA S.; MACCONI M.; B. MORINI
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Utilizza questo identificatore per citare o creare un link a questa risorsa: https://hdl.handle.net/2158/310979
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