 The Fixed Point Property in ð ‘ ð ŸŽ with an Equivalent NormBerta Gamboa de Buen and Fernando Núñez-Medina Abstract and Applied Analysis, 2011, vol. 2011, 1-19 Abstract: We study the fixed point property (FPP) in the Banach space ð ‘ 0 with the equivalent norm ‖ â‹… ‖ ð · . The space ð ‘ 0 with this norm has the weak fixed point property. We prove that every infinite-dimensional subspace of ( ð ‘ 0 , ‖ â‹… ‖ ð · ) contains a complemented asymptotically isometric copy of ð ‘ 0 , and thus does not have the FPP, but there exist nonempty closed convex and bounded subsets of ( ð ‘ 0 , ‖ â‹… ‖ ð · ) which are not 𠜔 -compact and do not contain asymptotically isometric ð ‘ 0 —summing basis sequences. Then we define a family of sequences which are asymptotically isometric to different bases equivalent to the summing basis in the space ( ð ‘ 0 , ‖ â‹… ‖ ð · ) , and we give some of its properties. We also prove that the dual space of ( ð ‘ 0 , ‖ â‹… ‖ ð · ) over the reals is the Bynum space ð ‘™ 1 ∞ and that every infinite-dimensional subspace of ð ‘™ 1 ∞ does not have the fixed point property. Date: 2011 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jnlaaa:574614 DOI: 10.1155/2011/574614 Access Statistics for this article More articles in Abstract and Applied Analysis from Hindawi |
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