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dc.contributor.authorLiu, X.
dc.contributor.authorSun, Jie
dc.date.accessioned2023-04-16T10:51:26Z
dc.date.available2023-04-16T10:51:26Z
dc.date.issued2004
dc.identifier.citationLiu, X. and Sun, J. 2004. A robust primal-dual interior-point algorithm for nonlinear programs. SIAM Journal on Optimization. 14 (4): pp. 1163-1186.
dc.identifier.urihttp://hdl.handle.net/20.500.11937/91442
dc.identifier.doi10.1137/S1052623402400641
dc.description.abstract

We present a primal-dual interior-point algorithm for solving optimization problems with nonlinear inequality constraints. The algorithm has some of the theoretical properties of trust region methods, but works entirely by line search. Global convergence properties are derived without assuming regularity conditions. The penalty parameter p in the merit function is updated adaptively and plays two roles in the algorithm. First, it guarantees that the search directions are descent directions of the updated merit function. Second, it helps to determine a suitable search direction in a decomposed SQP step. It is shown that if ρ is bounded for each barrier parameter μ, then every limit point of the sequence generated by the algorithm is a Karush Kuhn-Tucker point, whereas if ρ is unbounded for some μ, then the sequence has a limit point which is either a Fritz-John point or a stationary point of a function measuring the violation of the constraints. Numerical results confirm that the algorithm produces the correct results for some hard problems, including the example provided by Wächter and Biegler, for which many of the existing line search-based interior-point methods have failed to find the right answers.

dc.languageEnglish
dc.publisherSociety for Industrial and Applied Mathematics
dc.subjectScience & Technology
dc.subjectPhysical Sciences
dc.subjectMathematics, Applied
dc.subjectMathematics
dc.subjectnonlinear optimization
dc.subjectinterior-point method
dc.subjectglobal convergence
dc.subjectregularity conditions
dc.subjectREGION-BASED ALGORITHMS
dc.subjectGLOBAL CONVERGENCE
dc.subjectEQUALITY
dc.subjectOPTIMIZATION
dc.titleA robust primal-dual interior-point algorithm for nonlinear programs
dc.typeJournal Article
dcterms.source.volume14
dcterms.source.number4
dcterms.source.startPage1163
dcterms.source.endPage1186
dcterms.source.issn1052-6234
dcterms.source.titleSIAM Journal on Optimization
dcterms.source.placeUnited States
dc.date.updated2023-04-16T10:51:26Z
curtin.departmentSchool of Elec Eng, Comp and Math Sci (EECMS)
curtin.accessStatusOpen access
curtin.facultyFaculty of Science and Engineering
curtin.contributor.orcidSun, Jie [0000-0001-5611-1672]
curtin.contributor.researcheridSun, Jie [B-7926-2016] [G-3522-2010]
dcterms.source.eissn1095-7189
curtin.contributor.scopusauthoridSun, Jie [16312754600] [57190212842]
curtin.repositoryagreementV3


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