Methods of Reduced Directions with Differential Cost Function for Nonlinear Programming

Izhutkin, Victor S.; Petropavlovskii, Mikchail V.

doi:10.1007/978-3-662-12629-5_55

Victor S. Izhutkin⁴ &
Mikchail V. Petropavlovskii⁴

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References

Biggs, M.C.; (1972), Constrained Minimization Using Reqursive Equality Quadratic Programming, Numerical Methods for Nonl. Opt., ed. by F.A. Lootsma, 1972, Academic Press (London)
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Bartholomew-Biggs, M.C.,(1980), Recursive Quadratic Programming Based on Penalty Functions for Constrained Minimization, Nonl. Opt. Theory and Alg., ed. by L.C.W. Dixon, Bakhauser Books, 1980.
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Department of Physics and Mathematics, Mary State University, Lenin sqr. 1, Yoshkar-Ola, 424001, Russia
Victor S. Izhutkin & Mikchail V. Petropavlovskii

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Victor S. Izhutkin
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Mikchail V. Petropavlovskii
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Sozialökonomisches Seminar, Universität Hamburg, Von-Melle-Park 5, D-2000, Hamburg 13, FRG
Alexander Karmann
Institut für Statistik und Quantitative Ökonomik, Universität Bundeswehr Hamburg, Holstenhofweg 85, D-2000, Hamburg 70, FRG
Karl Mosler & Götz Uebe &
Lehrstuhl für Wirtschaftsinformatik III, Universität Mannheim, Schloß, D-6800, Mannheim, FRG
Martin Schader

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Izhutkin, V.S., Petropavlovskii, M.V. (1993). Methods of Reduced Directions with Differential Cost Function for Nonlinear Programming. In: Karmann, A., Mosler, K., Schader, M., Uebe, G. (eds) Operations Research ’92. Physica, Heidelberg. https://doi.org/10.1007/978-3-662-12629-5_55

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DOI: https://doi.org/10.1007/978-3-662-12629-5_55
Publisher Name: Physica, Heidelberg
Print ISBN: 978-3-7908-0679-3
Online ISBN: 978-3-662-12629-5
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