Spatiality of derivations of Fréchet \(\mathrm{GB}^{*}\)-algebras (Q2804300)
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scientific article; zbMATH DE number 6575014
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Spatiality of derivations of Fréchet \(\mathrm{GB}^{*}\)-algebras |
scientific article; zbMATH DE number 6575014 |
Statements
28 April 2016
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\(\mathrm{GB}^{*}\)-algebras
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topological algebra
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derivation
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Spatiality of derivations of Fréchet \(\mathrm{GB}^{*}\)-algebras (English)
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The authors show that, if \(A[\tau]\) is a Fréchet countably dominated \(\mathrm{GB}^{*}\)-algebra which is also an \(\mathrm{AO}^{*}\)-algebra, then every \( \tau-\tau\) continuous derivation on \(A\) is spatial and implemented by an element of the bidual \(A^{**}\) of \(A\). Moreover, the authors provide an example of a countably dominated Fréchet \(\mathrm{GB}^{*}\)-algebra which is an \(\mathrm{AO}^{*}\) algebra, but is not a \(C^*\)-algebra.
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