Radicals of Biduals of Beurling Algebras Can Be Different for the Two Arens Products
Abstract
Let rad denote the Jacobson radical of a Banach algebra, and let and denote the two Arens products on its bidual. We give an example of a Beurling algebra A for which rad(A**, ) ≠ rad(A**, ), answering a question of Dales and Lau. The underlying group in our example is the free group on three generators.
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