A class of nonlinear lagrangians: theory and algorithm
A class of nonlinear lagrangians: theory and algorithm
This paper establishes a theory framework of a class of nonlinear Lagrangians for solving nonlinear programming problems with inequality constraints. A set of conditions are proposed to guarantee the convergence of nonlinear Lagrangian algorithms, to analyze condition numbers of nonlinear Lagrangian Hessians as well as to develop the dual approaches. These conditions are satisfied by well-known nonlinear Lagrangians appearing in literature. The convergence theorem shows that the dual algorithm based on any nonlinear Lagrangian in the class is locally convergent when the penalty parameter is less than a threshold under a set of suitable conditions on problem functions and the error bound solution, depending on the penalty parameter, is also established. The paper also develops the dual problems based on the proposed nonlinear Lagrangians, and the related duality theorem and saddle point theorem are demonstrated. Furthermore, it is shown that the condition numbers of Lagrangian Hessians at optimal solutions are proportional to the controlling penalty parameters. We report some numerical results obtained by using nonlinear Lagrangians.
nonconvex optimization, nonlinear lagrangian, dual algorithm, condition number, dual function
327-371
Zhang, L.-W.
62c54450-d06f-4e46-9636-2b2142fdeaff
Ren, Y.-H.
4edc2cf0-c985-4fe2-b4fe-c8b378cc18bb
Wu, Y.
e279101b-b392-45c4-b894-187e2ded6a5c
Xiao, X.-T.
41e687bb-144c-4f59-a181-7e692a116ec4
June 2008
Zhang, L.-W.
62c54450-d06f-4e46-9636-2b2142fdeaff
Ren, Y.-H.
4edc2cf0-c985-4fe2-b4fe-c8b378cc18bb
Wu, Y.
e279101b-b392-45c4-b894-187e2ded6a5c
Xiao, X.-T.
41e687bb-144c-4f59-a181-7e692a116ec4
Zhang, L.-W., Ren, Y.-H., Wu, Y. and Xiao, X.-T.
(2008)
A class of nonlinear lagrangians: theory and algorithm.
Asia-Pacific Journal of Operational Research, 25 (3), .
(doi:10.1142/S021759590800178X).
Abstract
This paper establishes a theory framework of a class of nonlinear Lagrangians for solving nonlinear programming problems with inequality constraints. A set of conditions are proposed to guarantee the convergence of nonlinear Lagrangian algorithms, to analyze condition numbers of nonlinear Lagrangian Hessians as well as to develop the dual approaches. These conditions are satisfied by well-known nonlinear Lagrangians appearing in literature. The convergence theorem shows that the dual algorithm based on any nonlinear Lagrangian in the class is locally convergent when the penalty parameter is less than a threshold under a set of suitable conditions on problem functions and the error bound solution, depending on the penalty parameter, is also established. The paper also develops the dual problems based on the proposed nonlinear Lagrangians, and the related duality theorem and saddle point theorem are demonstrated. Furthermore, it is shown that the condition numbers of Lagrangian Hessians at optimal solutions are proportional to the controlling penalty parameters. We report some numerical results obtained by using nonlinear Lagrangians.
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Published date: June 2008
Keywords:
nonconvex optimization, nonlinear lagrangian, dual algorithm, condition number, dual function
Identifiers
Local EPrints ID: 186591
URI: http://eprints.soton.ac.uk/id/eprint/186591
ISSN: 0217-5959
PURE UUID: 60f34211-3150-4fd1-b6d9-aa83b62e252a
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Date deposited: 13 May 2011 13:31
Last modified: 15 Mar 2024 03:20
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Author:
L.-W. Zhang
Author:
Y.-H. Ren
Author:
X.-T. Xiao
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