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A Newton-type univariate optimization algorithm for locating the nearest extremum

✍ Scribed by Chung-Li Tseng

Book ID
104339481
Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
738 KB
Volume
105
Category
Article
ISSN
0377-2217

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✦ Synopsis

This paper introduces an algorithm for univariate optimization using linear lower bounding functions (LLBF's). An LLBF over an interval is a linear function which lies below the given function over an interval and matches the given function at one end point of the interval. We first present an algorithm using LLBF's for finding the nearest root of a function in a search direction. When the root-finding method is applied to the derivative of an objective function, it is an optimization algorithm which guarantees to locate the nearest extremum along a search direction. For univariate optimization, we show that this approach is a Newton-type method, which is globally convergent with superlinear convergence rate. The applications of this algorithm to global optimization and other optimization problems are also discussed. (~ 1998 Elsevier Science B.V.

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