Arens regularity of ideals in A(G), Acb(G) and AM(G)
Abstract
In this paper, we look at the question of when various ideals in the Fourier algebra A(G) or its closures AM(G) and Acb(G) in, respectively, its multiplier and cb-multiplier algebra are Arens regular. We show that in each case, if a non-zero ideal is Arens regular, then the underlying group G must be discrete. In addition, we show that if an ideal I in A(G) has a bounded approximate identity, then it is Arens regular if and only if it is finite-dimensional.
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