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BANACH ALGEBRAS WEAK* GENERATED BY THEIR IDEMPOTENTS

Published online by Cambridge University Press:  14 October 2002

Thomas Vils Pedersen
Affiliation:
Laboratoire de Mathématiques Pures, Université Bordeaux 1, 351 Cours de la Libération, F-33405 Talence Cédex, France
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Abstract

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For a closed set $E$ contained in the closed unit interval, we show that the big Lipschitz algebra $\varLambda_{\gamma}(E)$ $(0\lt\gamma\lt1)$ is sequentially weak$^{\ast}$ generated by its idempotents if and only if it is weak$^{\ast}$ generated by its idempotents if and only if the little Lipschitz algebra $\lambda_{\gamma}(E)$ is generated by its idempotents, and we describe a class of perfect symmetric sets for which this holds. Moreover, we prove that $\varLambda_1(E)$ is sequentially weak$^{\ast}$ generated by its idempotents if and only if $E$ is of measure zero. Finally, we show that the quotient algebras

$$ \mathcal{A}_{\beta}/\overline{J_{\beta}(E)}^{\text{weak}^{\ast}} $$

of the Beurling algebras need not be weak$^{\ast}$ generated by their idempotents, when $E$ is of measure zero and $\beta\ge\tfrac{1}{2}$.

AMS 2000 Mathematics subject classification: Primary 46J10; 46J30; 26A16; 42A16

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2002