Two Modified Hybrid Conjugate Gradient Methods Based on a Hybrid Secant Equation

Two Modified Hybrid Conjugate Gradient Methods Based on a Hybrid Secant Equation

Taking advantage of the attractive features of Hestenes-Stiefel and Dai-Yuan conjugate gradient methods, we suggest two globally convergent hybridizations of these methods following Andrei's approach of hybridizing the conjugate gradient parameters convexly and Powell's approach of nonnega...

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Veröffentlicht in:Mathematical modelling and analysis 2013-02, Vol.18 (1), p.32-52
Hauptverfasser: Babaie-Kafaki, Saman, Mahdavi-Amiri, Nezam
Format: Artikel
Sprache:eng
Schlagworte:
Conjugate gradient method
Conjugate gradients
Constrictions
global convergence
large-scale optimization
Mathematical analysis
Mathematical models
Modelling
secant equation
unconstrained optimization
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Zusammenfassung:Taking advantage of the attractive features of Hestenes-Stiefel and Dai-Yuan conjugate gradient methods, we suggest two globally convergent hybridizations of these methods following Andrei's approach of hybridizing the conjugate gradient parameters convexly and Powell's approach of nonnegative restriction of the conjugate gradient parameters. In our methods, the hybridization parameter is obtained based on a recently proposed hybrid secant equation. Numerical results demonstrating the efficiency of the proposed methods are reported.
ISSN:1392-6292
1648-3510
DOI:10.3846/13926292.2013.756832