On the Arens regularity of the Herz Algebra

Abstract

Let G be a locally compact group, Ap (G) be the Herz algebra of G associated with 1 <p< ∞. We show that Ap (G) is Arens regular if and only if G is a discrete group and for each countable subgroup H of G, Ap (H) is Arens regular. In the case G is a countable discrete group we investigate the relations between Arens regularity of Ap (G) and the iterated limit condition. We consider the problem of Arens regularity of l1 (G) as a subspace of Ap (G). A few related results when the unit ball of (l1 (G),.,Ap(G)) is bounded under \|.\|1-norm are also determined.