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Abstract

Having a convex cone K in an infinite-dimensional real linear space X,  Adán and Novo stated (in J Optim Theory Appl 121:515–540, 2004) that the relative algebraic interior of K is nonempty if and only if the relative algebraic interior of the positive dual cone of K is nonempty. In this paper, we show that the direct implication is not true even if K is closed with respect to the finest locally convex topology τc on X,  while the reverse implication is not true if K is not τc-closed. However, in the main result of this paper, we prove that the latter implication is true if the algebraic interior of the positive dual cone of K is nonempty; the general case remains an open problem. As a by-product, a result about separation of cones is obtained that improves Theorem 2.2 of the work mentioned above.

Details

Title
On Relatively Solid Convex Cones in Real Linear Spaces
Author
Novo Vicente 1   VIAFID ORCID Logo  ; Zălinescu Constantin 2   VIAFID ORCID Logo 

 Universidad Nacional de Educación a Distancia, Departamento de Matemática Aplicada, E.T.S.I. Industriales, Madrid, Spain (GRID:grid.10702.34) (ISNI:0000 0001 2308 8920) 
 Iaşi Branch of Romanian Academy, Octav Mayer Institute of Mathematics, Iasi, Romania (GRID:grid.10702.34) 
Pages
277-290
Publication year
2021
Publication date
Jan 2021
Publisher
Springer Nature B.V.
ISSN
00223239
e-ISSN
15732878
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1007/s10957-020-01773-z
ProQuest document ID
2478286082
Copyright
© Springer Science+Business Media, LLC, part of Springer Nature 2020.