The radical of the bidual of a Beurling algebra
Abstract
We prove that the bidual of a Beurling algebra on Z, considered as a Banach algebra with the first Arens product, can never be semisimple. We then show that rad\,(\, 1(i=1∞ Z)") contains nilpotent elements of every index. Each of these results settles a question of Dales and Lau. Finally we show that there exists a weight ω on Z such that the bidual of \, 1(Z, ω) contains a radical element which is not nilpotent.
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