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On different concepts of closedness of linear operators

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dc.contributor.author Messirdi, Sanaa
dc.contributor.author Messirdi, Bekkai
dc.contributor.author Messirdi, Miloud
dc.date.accessioned 2019-06-23T09:22:46Z
dc.date.available 2019-06-23T09:22:46Z
dc.date.issued 2014-03-01
dc.identifier.uri http://e-biblio.univ-mosta.dz/handle/123456789/11043
dc.description.abstract The purpose of this paper is to introduce, by means of the extensions of almost closed operators, the notion of almost closable linear operator acting in a Hilbert or Banach space. This class of operators is strictly included in the class of all unbounded linear operators, it contains the set of all closable operators and that of all almost closed operators and is invariant under finite and countable sums, finite products, limits and integrals. We also present some fundamental properties relative to almost closability and we define a locally convex Hausdorff topology in the set of all almost closable operators. en_US
dc.publisher OaM, Oper. Matrices en_US
dc.subject Almost closed extensions en_US
dc.subject almost closable operators en_US
dc.subject sums en_US
dc.subject products en_US
dc.subject limits en_US
dc.subject integrals en_US
dc.subject locally convex Hausdorff topology en_US
dc.title On different concepts of closedness of linear operators en_US
dc.type Article en_US


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