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AuthorAlmaadeed, T.A.
AuthorTaati, A.
AuthorSalahi, M.
AuthorHamdi, A.
Available date2023-09-24T07:55:31Z
Publication Date2020
Publication NameSymmetry
ResourceScopus
URIhttp://dx.doi.org/10.3390/SYM12081369
URIhttp://hdl.handle.net/10576/47872
AbstractIn this paper, we study the problem of minimizing a general quadratic function subject to a quadratic inequality constraint with a fixed number of additional linear inequality constraints. Under a regularity condition, we first introduce two convex quadratic relaxations (CQRs), under two different conditions, that are minimizing a linear objective function over two convex quadratic constraints with additional linear inequality constraints. Then, we discuss cases where the CQRs return the optimal solution of the problem, revealing new conditions under which the underlying problem admits strong Lagrangian duality and enjoys exact semidefinite optimization relaxation. Finally, under the given sufficient conditions, we present necessary and sufficient conditions for global optimality of the problem and obtain a form of S-lemma for a system of two quadratic and a fixed number of linear inequalities. 2020 by the authors.
SponsorFunding: The authors would like to express their thanks to Qatar University for supporting their project under Grant NCBP-QUCP-CAS-2020-1.
Languageen
PublisherMDPI AG
SubjectConvex quadratic relaxation
SDO-relaxation
Strong duality
The generalized trust-region sub-problem
TitleThe generalized trust-region sub-problem with additional linear inequality constraints-Two convex quadratic relaxations and strong duality
TypeArticle
Issue Number8
Volume Number12
dc.accessType Abstract Only


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