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DOI: 10.23671/VNC.2019.21.44621 Lexicographic Structures on Vector Spaces
Abstract:
Basic properties are described of the Archimedean equivalence and dominance in a totally ordered vector space. The notion of (pre)lexicographic structure on a vector space is introduced and studied. A lexicographic structure is a duality between vectors and points which makes it possible to represent an abstract ordered vector space as an isomorphic space of realvalued functions endowed with a lexicographic order. The notions of function and basic lexicographic structures are introduced. Interrelations are clarified between an ordered vector space and its function lexicographic representation. A new proof is presented for the theorem on isomorphic embedding of a totally ordered vector space into a lexicographically ordered space of realvalued functions with wellordered supports. A criterion is obtained for denseness of a maximal cone with respect to the strongest locally convex topology. Basic maximal cones are described in terms of sets constituted by pairwise nonequivalent vectors. The class is characterized of vector spaces in which there exist nonbasic maximal cones.
Keywords: maximal cone, dense cone, totally ordered vector space, Archimedean equivalence, Archimedean dominance, lexicographic order, Hamel basis, locally convex space.
Language: Russian
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For citation: Gutman, A. E. and Emelyanenkov, I. A. Lexicographic Structures on Vector Spaces,Vladikavkaz Math. J., 2019, vol. 21, no. 4, pp. 4255 (in Russian). DOI 10.23671/VNC.2019.21.44621 ← Contents of issue 
 

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