The Operator Norm on Weighted Discrete Semigroup Algebras 1(S, ω)

Abstract

Let ω be a weight on a right cancellative semigroup S. Let \|·\|ω be the weighted norm on the weighted discrete semigroup algebra 1(S, ω). In this paper, we prove that the weight ω satisfies F-property if and only if the operator norm \| · \|ω op of \| · \|ω is exactly equal to another weighted norm \| · \|ω1 [Theorem 2.5 (iii)]. Though its proof is elementary, the result is unexpectedly surprising. In particular, \| · \|1 op is same as \| · \|1 on 1(S). Moreover, various examples are discussed to understand the relating among \| · \|ω op, \| · \|ω, and 1(S, ω).