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Item Details
| Title:
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THE SECOND DUALS OF BEURLING ALGEBRAS
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| By: |
H. G. Dales, Anthony To-Ming Lau |
| Format: |
Paperback |
| List price:
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£74.95 |
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We currently do not stock this item, please contact the publisher directly for
further information.
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| ISBN 10: |
0821837745 |
| ISBN 13: |
9780821837740 |
| Publisher: |
AMERICAN MATHEMATICAL SOCIETY |
| Pub. date: |
15 August, 2005 |
| Edition: |
Illustrated edition |
| Series: |
Memoirs of the American Mathematical Society No. 177 |
| Pages: |
191 |
| Description: |
Let $A$ be a Banach algebra, with second dual space $A""$. We propose to study the space $A""$ as a Banach algebra. There are two Banach algebra products on $A""$, denoted by $\,\Box\,$ and $\,\Diamond\,$. The Banach algebra $A$ is Arens regular if the two products $\Box$ and $\Diamond$ coincide on $A""$. |
| Synopsis: |
Let $A$ be a Banach algebra, with second dual space $A""$. We propose to study the space $A""$ as a Banach algebra. There are two Banach algebra products on $A""$, denoted by $\,\Box\,$ and $\,\Diamond\,$. The Banach algebra $A$ is Arens regular if the two products $\Box$ and $\Diamond$ coincide on $A""$. In fact, $A""$ has two topological centers denoted by $\mathfrak{Z}^{(1)}_t(A"")$ and $\mathfrak{Z}^{(2)}_t(A"")$ with $A \subset \mathfrak{Z}^{(j)}_t(A"")\subset A""\;\,(j=1,2)$, and $A$ is Arens regular if and only if $\mathfrak{Z}^{(1)}_t(A"")=\mathfrak{Z}^{(2)}_t(A"")=A""$. At the other extreme, $A$ is strongly Arens irregular if $\mathfrak{Z}^{(1)}_t(A"")=\mathfrak{Z}^{(2)}_t(A"")=A$. We shall give many examples to show that these two topological centers can be different, and can lie strictly between $A$ and $A""$.We shall discuss the algebraic structure of the Banach algebra $(A"",\,\Box\,)V$; in particular, we shall seek to determine its radical and when this algebra has a strong Wedderburn decomposition. We are also particularly concerned to discuss the algebraic relationship between the two algebras $(A"",\,\Box\,)$ and $(A"",\,\Diamond\,)$.Most of our theory and examples will be based on a study of the weighted Beurling algebras $L^1(G,\omega)$, where $\omega$ is a weight function on the locally compact group $G$. The case where $G$ is discrete and the algebra is ${\ell}^{\,1}(G, \omega)$ is particularly important.We shall also discuss a large variety of other examples. These include a weight $\omega$ on $\mathbb{Z}$ such that $\ell^{\,1}(\mathbb{Z},\omega)$ is neither Arens regular nor strongly Arens irregular, and such that the radical of $(\ell^{\,1}(\mathbb{Z},\omega)"", \,\Box\,)$ is a nilpotent ideal of index exactly $3$, and a weight $\omega$ on $\mathbb{F}_2$ such that two topological centers of the second dual of $\ell^{\,1}(\mathbb{F}_2, \omega)$ may be different, and that the radicals of the two second duals may have different indices of nilpotence. |
| Illustrations: |
Illustrations |
| Publication: |
US |
| Imprint: |
American Mathematical Society |
| Returns: |
Returnable |
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