Back to matchesWe found a matchYour institution may have access to this item. Find your institution then sign in to continue.TitleSuperefficiency in Vector Optimization with Nearly Subconvexlike Set-Valued Maps.AuthorsXia, L. Y.; Qiu, J. H.AbstractIn the framework of locally convex topological vector spaces, we establish a scalarization theorem, a Lagrange multiplier theorem and duality theorems for superefficiency in vector optimization involving nearly subconvexlike set-valued maps.SubjectsVECTOR analysis; MATHEMATICAL optimization; CONVEX functions; VECTOR spaces; LAGRANGIAN functions; SET-valued maps; MATHEMATICAL mappings; SET theory; FUNCTIONAL analysisPublicationJournal of Optimization Theory & Applications, 2008, Vol 136, Issue 1, p125ISSN0022-3239Publication typeArticleDOI10.1007/s10957-007-9291-0