Open AccessGlobal Convergence of General Derivative-Free Trust-Region Algorithms to First- and Second-Order Critical Points
Author(s) -
Andrew R. Conn,
Katya Scheinberg,
L. N. Vicente
Publication year - 2009
Publication title -
siam journal on optimization
Language(s) - English
Resource type - Journals
eISSN - 1095-7189
pISSN - 1052-6234
DOI - 10.1137/060673424
Subject(s) - trust region , mathematics , convergence (economics) , iterated function , radius of convergence , global optimization , mathematical optimization , function (biology) , convergence tests , derivative (finance) , local convergence , quadratic equation , derivative free optimization , algorithm , optimization problem , radius , rate of convergence , iterative method , computer science , mathematical analysis , channel (broadcasting) , computer security , economic growth , computer network , financial economics , biology , power series , geometry , evolutionary biology , economics , multi swarm optimization
In this paper we prove global convergence for first- and second-order stationary points of a class of derivative-free trust-region methods for unconstrained optimization. These methods are based on the sequential minimization of quadratic (or linear) models built from evaluating the objective function at sample sets. The derivative-free models are required to satisfy Taylor-type bounds, but, apart from that, the analysis is independent of the sampling techniques. A number of new issues are addressed, including global convergence when acceptance of iterates is based on simple decrease of the objective function, trust-region radius maintenance at the criticality step, and global convergence for second-order critical points.
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