A renorming characterization of Banach spaces containing ℓ1(κ)

Antonio Avilés; Gonzalo Martínez Cervantes; Abraham Rueda Zoca

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A renorming characterization of Banach spaces containing ℓ1(κ)

Avilés, Antonio ^[1] ; Martínez-Cervantes, Gonzalo ^[2] ; Rueda Zoca, Abraham ^[3]
1. [1] Universidad de Murcia
  
  Universidad de Murcia
  
  Murcia, España
2. [2] Universitat d'Alacant
  
  Universitat d'Alacant
  
  Alicante, España
3. [3] Universidad de Granada
  
  Universidad de Granada
  
  Granada, España
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Localización: Publicacions matematiques, ISSN 0214-1493, Vol. 67, Nº 0, 2023, págs. 601-609
Idioma: inglés
DOI: 10.5565/publmat6722305
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Resumen
- A result of G. Godefroy asserts that a Banach space X contains an isomorphic copy of `1 if and only if there is an equivalent norm ||| · ||| such that, for every finite-dimensional subspace Y of X and every ε > 0, there exists x ∈ SX so that |||y+rx||| ≥ (1−ε)(|||y|||+|r|) for every y ∈ Y and every r ∈ R. In this paper we generalise this result to larger cardinals, showing that if κ is an uncountable cardinal, then a Banach space X contains a copy of `1(κ) if and only if there is an equivalent norm ||| · ||| on X such that for every subspace Y of X with dens(Y ) < κ there exists a norm-one vector x so that |||y + rx||| = |||y||| + |r| whenever y ∈ Y and r ∈ R. This result answers a question posed by S. Ciaci, J. Langemets, and A. Lissitsin, where the authors wonder whether the above statement holds for infinite successor cardinals. We also show that, in the countable case, the result of Godefroy cannot be improved to take ε = 0.
Referencias bibliográficas
- S. Ciaci, J. Langemets, and A. Lissitsin, A characterization of Banach spaces containing `1(κ) via ball-covering properties, Israel J....
- M. Fabian, P. Habala, P. Hajek, V. Montesinos Santalucía, J. Pelant, and V. Zizler, “Functional Analysis and Infinite-Dimensional Geometry”,...
- G. Godefroy, Metric characterization of first Baire class linear forms and octahedral norms, Studia Math. 95(1) (1989), 1–15. DOI: 10.4064/sm-95-1-1-15
- A. J. Guirao, A. Lissitsin, and V. Montesinos, Some remarks on the ballcovering property, J. Math. Anal. Appl. 479(1) (2019), 608–620. DOI:...
- V. Kadets, V. Shepelska, and D. Werner, Thickness of the unit sphere, `1-types, and the almost Daugavet property, Houston J. Math. 37(3)...
- J. L. Kelley, Banach spaces with the extension property, Trans. Amer. Math. Soc. 72 (1952), 323–326. DOI: 10.2307/1990758
- B. Maurey, Types and l1-subspaces, in: “Texas Functional Analysis Seminar 1982–1983” (Austin, Tex.), Longhorn Notes, Univ. Texas Press, Austin,...
- J. D. Monk, Continuum cardinals generalized to Boolean algebras, J. Symbolic Logic 66(4) (2001), 1928–1958. DOI: 10.2307/2694986
- H. P. Rosenthal, A characterization of Banach spaces containing l1, Proc. Nat. Acad. Sci. U.S.A. 71(6) (1974), 2411–2413. DOI: 10.1073/pnas.71.6.2411