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   <ow:Publication rdf:about="oai:digibug.ugr.es:10481/98237">
      <dc:title>Bidual octahedral renormings and strong regularity in banach spaces</dc:title>
      <dc:creator>López Pérez, Ginés</dc:creator>
      <dc:creator>Langemets, Johann</dc:creator>
      <dc:description>We prove that every separable Banach space containing&#xd;
`1 can be equivalently renormed so that its bidual space is octahedral,&#xd;
which answers, in the separable case, a question in Godefroy&#xd;
(1989) [5]. As a direct consequence, we obtain that every dual&#xd;
Banach space, with a separable predual, failing to be strongly regular&#xd;
(that is, without convex combinations of slices with diameter&#xd;
arbitrarily small for some closed, convex and bounded subset) can&#xd;
be equivalently renormed with a dual norm to satisfy the strong diameter&#xd;
two property (that is, such that every convex combination&#xd;
of slices in its unit ball has diameter two).</dc:description>
      <dc:date>2024-12-18T12:30:41Z</dc:date>
      <dc:date>2024-12-18T12:30:41Z</dc:date>
      <dc:date>2021</dc:date>
      <dc:type>preprint</dc:type>
      <dc:identifier>https://hdl.handle.net/10481/98237</dc:identifier>
      <dc:language>eng</dc:language>
      <dc:rights>http://creativecommons.org/licenses/by-nd/4.0/</dc:rights>
      <dc:rights>open access</dc:rights>
      <dc:rights>Attribution-NoDerivatives 4.0 Internacional</dc:rights>
   </ow:Publication>
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