The Banach Algebra L1(G) and Tame Functionals
Abstract
We give an affirmative answer to a question due to M. Megrelishvili, and show that for every locally compact group G we have Tame(L1(G)) = Tame(G), which means that a functional is tame over L1(G) if and only if it is tame as a function over G. In fact, it is proven that for every norm-saturated, convex vector bornology on RUCb(G), being small as a function and as a functional is the same. This proves that Asp(L1(G)) = Asp(G) and reaffirms a well-known, similar result which states that WAP(G) = WAP(L1(G)).
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