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Sequential Quadratic Programming

Sequential Quadratic Programming <jats:p>Since its popularization in the late 1970s, Sequential Quadratic Programming (SQP) has arguably become the most successful method for solving nonlinearly constrained optimization problems. As with most optimization methods, SQP is not a single algorithm, but rather a conceptual method from which numerous specific algorithms have evolved. Backed by a solid theoretical and computational foundation, both commercial and public-domain SQP algorithms have been developed and used to solve a remarkably large set of important practical problems. Recently large-scale versions have been devised and tested with promising results.</jats:p> http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Acta Numerica CrossRef

Sequential Quadratic Programming

Acta Numerica , Volume 4: 1-51 – Jan 1, 1995

Sequential Quadratic Programming


Abstract

<jats:p>Since its popularization in the late 1970s, Sequential Quadratic Programming (SQP) has arguably become the most successful method for solving nonlinearly constrained optimization problems. As with most optimization methods, SQP is not a single algorithm, but rather a conceptual method from which numerous specific algorithms have evolved. Backed by a solid theoretical and computational foundation, both commercial and public-domain SQP algorithms have been developed and used to solve a remarkably large set of important practical problems. Recently large-scale versions have been devised and tested with promising results.</jats:p>

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Publisher
CrossRef
ISSN
0962-4929
DOI
10.1017/s0962492900002518
Publisher site
See Article on Publisher Site

Abstract

<jats:p>Since its popularization in the late 1970s, Sequential Quadratic Programming (SQP) has arguably become the most successful method for solving nonlinearly constrained optimization problems. As with most optimization methods, SQP is not a single algorithm, but rather a conceptual method from which numerous specific algorithms have evolved. Backed by a solid theoretical and computational foundation, both commercial and public-domain SQP algorithms have been developed and used to solve a remarkably large set of important practical problems. Recently large-scale versions have been devised and tested with promising results.</jats:p>

Journal

Acta NumericaCrossRef

Published: Jan 1, 1995

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