On \(\chi \otimes \eta\)-strong Connes amenability of certain dual Banach algebras (Q6546081)
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scientific article; zbMATH DE number 7855526
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On \(\chi \otimes \eta\)-strong Connes amenability of certain dual Banach algebras |
scientific article; zbMATH DE number 7855526 |
Statements
On \(\chi \otimes \eta\)-strong Connes amenability of certain dual Banach algebras (English)
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29 May 2024
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Let \(\mathbb K\) and \(\mathbb H\) be dual Banach algebras, and let \(\chi\) and \(\eta\) be normal characters on \(\mathbb K\) and \(\mathbb H\) respectively. The authors study the \(\chi\otimes \eta\)-strong Connes amenability of the projective tensor product algebra \(\mathbb K\hat\otimes\mathbb H\). They further study the \((\chi, \eta)\)-strong Connes amenability of the Lau-product algebra \(\mathbb K\times_\eta \mathbb H\). For a normal dual \(\mathbb K\)-module \(X\), the \(\chi\)-strong Connes amenability of the module extension dual Banach algebra \(\mathbb K\oplus X\) is also investigated.
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\(\chi\)-strong Connes amenability
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projective tensor product
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\(\theta\)-Lau product
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\(\chi\)-\(\sigma \mathrm{wc}\) virtual diagonal
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module extension of dual Banach algebra
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