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Paper   IPM / M / 17874
School of Mathematics
  Title:   On the Bishop-Phelps-Bollobas property for positive functionals
  Author(s):  Maryam Soleimani-Mourchehkhorti (Joint with M. D. Acosta)
  Status:   Published
  Journal: Rev. Real Acad. Cienc. Exactas Fis. Nat. Ser. A-Mat.
  Vol.:  118
  Year:  2024
  Pages:   1-18
  Supported by:  IPM
  Abstract:
We introduce the so-called Bishop-Phelps- Bollob�¡s property for positive functionals, a particular case of the Bishop-Phelps- Bollob�¡s property for positive operators. First we show a version of the Bishop-Phelps- Bollob�¡s theorem â??where all the elements and functionals are positive. We also characterize the â??Bishop-Phelps- Bollob�¡s property for positive functionals and positive elements in a Banach lattice. We prove that any finite-dimensional Banach lattice â??has the Bishop-Phelps- Bollob�¡s â?? property for positive functionals. A sufficient condition and also a necessary condition to have the Bishop-Phelps- Bollob�¡s property for positive functionals are also provided. As a consequence of this result, we obtain that the spaces L_(p )(�¼) (1â?¤p<â??), for any positive measure �¼ ,C(K) and M(K), for any â??compact Hausdorff topological space K, satisfy the Bishop-Phelps- Bollob�¡s property for positive functionals. We also provide some more clarifying examples.

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