Regularity and amenability of weighted Banach algebras and their second dual on locally compact groups
Abstract
Let ω be a weight function on a locally compact group G mand let M* (G, ω ) be the subspace of M(G , ω )* consisting of all functionals that vanish at infinity. In this paper, we first investigate the Arens regularity of M* (G, ω )* and show that M* (G, ω )* is Arnes regular if and only if G is finite or ω is zero cluster. This result is an answer to the question posed and it improves some well-known results. We also give necessary and sufficient criteria for the weight function spaces Wap(G , 1/ ω ) and Wap(G , 1/ ω ) to be equal to Cb (G , 1/ ω ) . We prove that for non-compact group G, the Banach algebra M* (G, ω )* is Arnes regular if and only if Wap(G , 1/ ω ) = Cb (G , 1/ ω ) . We then investigate amenability of M* (G, ω )* and prove that M* (G, ω )* is amenable and Arnes regular if and only if G is finite.
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