Representations of the Banach algebra \(\ell ^ 1(S)\) (Q1096142)
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scientific article; zbMATH DE number 4030264
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Representations of the Banach algebra \(\ell ^ 1(S)\) |
scientific article; zbMATH DE number 4030264 |
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Representations of the Banach algebra \(\ell ^ 1(S)\) (English)
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1988
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Let S be a monoid equipped with an involution *. Then the Banach space \(\ell^ 1(S)\) becomes a Banach *-algebra when multiplication is defined by convolution. This algebra is *-semisimple if and only if the bounded *-representation of S, on Hilbert spaces, separate points of S. We give a new proof of this result using properties of von Neumann algebras. It is also shown that when S is the free monoid on a countable set of generators then \(\ell^ 1(S)\) has a separating sequence of finite dimensional irreducible *-representations.
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monoid equipped with an involution *
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Banach *-algebra
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convolution
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*- semisimple
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bounded *-representation
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von Neumann algebras
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free monoid on a countable set of generators
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separating sequence of finite dimensional irreducible *-representations
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