Publication:
Generalized ellipsoids

dc.contributor.coauthorAhmadi, Amir Ali
dc.contributor.coauthorChaudhry, Abraar
dc.contributor.departmentDepartment of Industrial Engineering
dc.contributor.kuauthorDibek, Cemil
dc.contributor.schoolcollegeinstituteCollege of Engineering
dc.date.accessioned2026-07-02T07:02:59Z
dc.date.available2026-03-27
dc.date.issued2026
dc.description.abstractWe introduce a family of symmetric convex bodies called generalized ellipsoids of degree d (GE-ds), with ellipsoids corresponding to the case of d = 0. Generalized ellipsoids (GEs) retain many geometric, algebraic, and algorithmic properties of ellipsoids. We show that the conditions that the parameters of a GE must satisfy can be checked in strongly polynomial time and that one can search for GEs of a given degree by solving a semidefinite program whose size grows only linearly with dimension. We give an example of a GE that does not have a second-order cone representation, but we show that every GE has a semidefinite representation whose size depends linearly on both its dimension and its degree. In terms of expressiveness, we prove that for any integer m >= 2, every symmetric full-dimensional polytope with 2m facets and every intersection of m cocentered ellipsoids can be represented exactly as a GE-d with d <= 2m - 3. Using this result, we show that every symmetric convex body can be approximated arbitrarily well by a GE-d, and we quantify the quality of the approximation as a function of the degree d. Finally, we present applications of GEs to several areas, such as time-varying portfolio optimization, stability analysis of switched linear systems, robust-to-dynamics optimization, and robust polynomial regression.
dc.description.fulltextNo
dc.description.harvestedfromManual
dc.description.indexedbyWOS
dc.description.publisherscopeInternational
dc.description.readpublishN/A
dc.description.sponsoredbyTubitakEuN/A
dc.description.sponsorshipAir Force Office of Scientific Research [Grant MURI]; Sloan Fellowship(Alfred P. Sloan Foundation); Princeton [AI Lab Seed Grant and SEAS Innovation Grant]
dc.description.versionPublished Version
dc.identifier.WoSQuartileQ1
dc.identifier.doi10.1287/moor.2024.0643
dc.identifier.eissn1526-5471
dc.identifier.embargoNo
dc.identifier.issn0364-765X
dc.identifier.urihttp://dx.doi.org/10.1287/moor.2024.0643
dc.identifier.urihttps://hdl.handle.net/20.500.14288/32825
dc.identifier.wos001682076300001
dc.keywordsEllipsoids
dc.keywordsConvex bodies
dc.keywordsConic optimization
dc.keywordsSemidefinite representations
dc.keywordsPolynomial matrices
dc.languageeng
dc.publisherInforms
dc.relation.affiliationKoç University
dc.relation.collectionKoç University Institutional Repository
dc.relation.ispartofMathematics of Operations Research
dc.relation.openaccessN/A
dc.rightsN/A
dc.rights.uriN/A
dc.subjectOperations research
dc.subjectManagement science
dc.subjectMathematics
dc.titleGeneralized ellipsoids
dc.typeJournal Article
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