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For two Banach algebras and ℬ, an interesting product $\times_{θ} ℬ$ , called the θ-Lau product, was recently introduced and studied for some nonzero characters θ on ℬ. Here, we characterize some notions of amenability as approximate amenability, essential amenability, n-weak amenability and cyclic amenability between and ℬ and their θ-Lau product.

Spectral extension and power independence in measure algebras

Gavin Brown (1981)

Studia Mathematica

Spectres joints et prolongement des caractères

Bernard Host, François Parreau (1982)

Studia Mathematica

Spectrum of commutative Banach algebras and isomorphism of C*-algebras related to locally compact groups

Zhiguo Hu (1998)

Studia Mathematica

Let A be a semisimple commutative regular tauberian Banach algebra with spectrum $Σ_{A}$ . In this paper, we study the norm spectra of elements of $\bar{s p a n} Σ_{A}$ and present some applications. In particular, we characterize the discreteness of $Σ_{A}$ in terms of norm spectra. The algebra A is said to have property (S) if, for all $φ \in \bar{} Σ_{A} 0$ , φ has a nonempty norm spectrum. For a locally compact group G, let $ℳ_{2}^{d} (Ĝ)$ denote the C*-algebra generated by left translation operators on $L^{2} (G)$ and $G_{d}$ denote the discrete group G. We prove that the Fourier...

Sur le comportement asymptotique des puissances de convolution d'une probabilité

Y. Derriennic, M. Lin (1984)

Annales de l'I.H.P. Probabilités et statistiques

Sur les mesures quasi-idempotentes et la fermeture de $μ * L^{1}$

B. Host, F. Parreau (1977/1978)

Séminaire Analyse fonctionnelle (dit "Maurey-Schwartz")

Sur un problème de I. Glicksberg : les idéaux fermés de type fini de $M (G)$

Bernard Host, François Parreau (1978)

Annales de l'institut Fourier

Soit $μ \in M (G)$ , algèbre de convolution des mesures de Radon bornées sur le groupe abélien localement compact $G$ . Pour que $μ * M (G)$ soit fermé dans $M (G)$ (ou, ce qui revient au même, pour que $μ * L^{1} (G)$ soit fermé), il faut et il suffit que $μ$ soit la convolution d’une mesure inversible et d’une mesure idempotente.

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Second duals of measure algebras [Book]

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