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Parameter estimation of ordinary differential equations

dc.contributor.authorLi, Zheng Feng
dc.contributor.authorOsborne, Michael
dc.contributor.authorPrvan, Tania
dc.date.accessioned2015-12-13T22:45:35Z
dc.date.issued2005
dc.date.updated2015-12-11T10:23:53Z
dc.description.abstractThis paper addresses the development of a new algorithm for parameter estimation of ordinary differential equations. Here, we show that (1) the simultaneous approach combined with orthogonal cyclic reduction can be used to reduce the estimation problem to an optimization problem subject to a fixed number of equality constraints without the need for structural information to devise a stable embedding in the case of non-trivial dichotomy and (2) the Newton approximation of the Hessian information of the Lagrangian function of the estimation problem should be used in cases where hypothesized models are incorrect or only a limited amount of sample data is available. A new algorithm is proposed which includes the use of the sequential quadratic programming (SQP) Gauss-Newton approximation but also encompasses the SQP Newton approximation along with tests of when to use this approximation. This composite approach relaxes the restrictions on the SQP Gauss-Newton approximation that the hypothesized model should be correct and the sample data set large enough. This new algorithm has been tested on two standard problems.
dc.identifier.issn0272-4979
dc.identifier.urihttp://hdl.handle.net/1885/79855
dc.publisherOxford University Press
dc.sourceIMA Journal of Numerical Analysis
dc.subjectKeywords: Constrained optimization; Data fitting; Gauss-Newton approximation; Ordinary differential equations; Orthogonal cyclic reduction; Parameter estimation; SQP methods
dc.titleParameter estimation of ordinary differential equations
dc.typeJournal article
local.bibliographicCitation.issue2
local.bibliographicCitation.lastpage285
local.bibliographicCitation.startpage264
local.contributor.affiliationLi, Zheng Feng, College of Medicine, Biology and Environment, ANU
local.contributor.affiliationOsborne, Michael, College of Physical and Mathematical Sciences, ANU
local.contributor.affiliationPrvan, Tania, Macquarie University
local.contributor.authoruidLi, Zheng Feng, u4024853
local.contributor.authoruidOsborne, Michael, u4592503
local.description.embargo2037-12-31
local.description.notesImported from ARIES
local.description.refereedYes
local.identifier.absfor010301 - Numerical Analysis
local.identifier.ariespublicationMigratedxPub8225
local.identifier.citationvolume25
local.identifier.doi10.1093/imanum/drh016
local.identifier.scopusID2-s2.0-25844445254
local.type.statusPublished Version

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