Orthogonal ℓ1-sets and extreme non-Arens regularity of preduals of von Neumann algebras
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Título
Orthogonal ℓ1-sets and extreme non-Arens regularity of preduals of von Neumann algebrasFecha de publicación
2022-03-04Editor
Elsevier; Academic PressISSN
0022-247XCita bibliográfica
Filali, M., & Galindo, J. (2022). Orthogonal ℓ1-sets and extreme non-Arens regularity of preduals of von Neumann algebras. Journal of Mathematical Analysis and Applications, 512(1), 126137.Tipo de documento
info:eu-repo/semantics/articleVersión
info:eu-repo/semantics/publishedVersionPalabras clave / Materias
Resumen
A Banach algebra is Arens-regular when all its continuous functionals are weakly almost periodic, in symbols when
⁎
. To identify the opposite behaviour, Granirer called a Banach algebra extremely non-Arens regular ... [+]
A Banach algebra is Arens-regular when all its continuous functionals are weakly almost periodic, in symbols when
⁎
. To identify the opposite behaviour, Granirer called a Banach algebra extremely non-Arens regular (enAr, for short) when the quotient
⁎
contains a closed subspace that has
⁎
as a quotient. In this paper we propose a simplification and a quantification of this concept. We say that a Banach algebra is r-enAr, with , when there is an isomorphism with distortion r of
⁎
into
⁎
. When , we obtain an isometric isomorphism and we say that is isometrically enAr. We then identify sufficient conditions for the predual
⁎
of a von Neumann algebra to be r-enAr or isometrically enAr. With the aid of these conditions, the following algebras are shown to be r-enAr:
(i)
the weighted semigroup algebra of any weakly cancellative discrete semigroup, when the weight is diagonally bounded with diagonal bound . When the weight is multiplicative, i.e., when , the algebra is isometrically enAr,
(ii)
the weighted group algebra of any non-discrete locally compact infinite group and for any weight,
(iii)
the weighted measure algebra of any locally compact infinite group, when the weight is diagonally bounded with diagonal bound . When the weight is multiplicative, i.e., when , the algebra is isometrically enAr.
The Fourier algebra of a locally compact infinite group G is shown to be isometrically enAr provided that (1) the local weight of G is greater or equal than its compact covering number, or (2) G is countable and contains an infinite amenable subgroup. [-]
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J. Math. Anal. Appl. 512 (2022) 126137Derechos de acceso
info:eu-repo/semantics/openAccess
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Excepto si se señala otra cosa, la licencia del ítem se describe como: 0022-247X/© 2022 The Author(s). Published by Elsevier Inc. This is an open access article under the CC BY-NC-ND license
(http://creativecommons.org/licenses/by-nc-nd/4.0/).
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