An O(n 2) Active Set Algorithm for Solving Two Related Box Constrained Parametric Quadratic Programs

Recently, O(n2) active set methods have been presented for minimizing the parametric quadratic functions (1/2)x′Dx−a′x+λ|γ′x−c| and (1/2)x′Dx−a′x+(λ/2)(γ′x−c)2, respectively, subject to l≤x≤b, for all nonnegative values of the parameter λ. Here, D is a positive diagonal n×n matrix, γ and a are arbit...

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Bibliographic Details
Published in	Numerical algorithms Vol. 27; no. 4; pp. 367 - 375
Main Author	Gómez, Manuel A.
Format	Journal Article
Language	English
Published	New York Springer Nature B.V 01.08.2001
Subjects	Algorithms Mathematical analysis Quadratic equations Quadratic programming
Online Access	Get full text
ISSN	1017-1398 1572-9265
DOI	10.1023/A:1013830414927

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Summary:	Recently, O(n2) active set methods have been presented for minimizing the parametric quadratic functions (1/2)x′Dx−a′x+λ\|γ′x−c\| and (1/2)x′Dx−a′x+(λ/2)(γ′x−c)2, respectively, subject to l≤x≤b, for all nonnegative values of the parameter λ. Here, D is a positive diagonal n×n matrix, γ and a are arbitrary n-vectors, c is an arbitrary scalar; l and b are arbitrary n-vectors such that l≤b. In this paper, we show that each one of these algorithms may be used to simultaneously solve both parametric programs withno additional computational cost.
Bibliography:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	1017-1398 1572-9265
DOI:	10.1023/A:1013830414927