On the ideal structure of some Banach algebras related to convolution operators on $L^{p}(G)$ (Q1888365)

scientific article; zbMATH DE number 2117858

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English	On the ideal structure of some Banach algebras related to convolution operators on $L^{p}(G)$	scientific article; zbMATH DE number 2117858

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scholarly article

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title

On the ideal structure of some Banach algebras related to convolution operators on $L^{p}(G)$ (English)

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Journal of Functional Analysis

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publication date

23 November 2004

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review text

For a locally compact group $G$ the authors study properties of various spaces of convolution operators on $L^p(G)$.

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reviewed by

Vladimir V. Peller

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zbMATH Keywords

generalized Fourier algebras

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$p$-convolution operators

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maximal regular ideals

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minimal ideals

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amenability

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MaRDI profile type

Publication

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full work available at URL

https://doi.org/10.1016/j.jfa.2004.02.011

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cites work

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L'algèbre de Fourier d'un groupe localement compact

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Some results on $A_p(G)$ submodules of $PM_p(G)$

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On the set of topologically invariant means on an algebra of convolution operators on 𝐿^{𝑝}(𝐺)

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Uniformly Continuous Functionals on the Fourier Algebra of Any Locally Compact Group

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The Second Conjugate Algebra of the Fourier Algebra of a Locally Compact Group

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The $C^ \ast$-algebra generated by operators with compact support on a locally compact group

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Weak amenability of Banach algebras on locally compact groups

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Amenability for discrete convolution semigroup algebras.

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Q3994443

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Identifiers

zbMATH Open document ID

1062.43004

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Mathematics Subject Classification ID

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10.1016/J.JFA.2004.02.011

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Mathematics(1 entry)

mardi Publication:1888365

On the ideal structure of some Banach algebras related to convolution operators on \(L^{p}(G)\) (Q1888365)

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Mathematics(1 entry)