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Authors:	Zhiguo Hu

Institution:	Department of Mathematics and Statistics, University of Windsor, Windsor, Ontario, Canada N9B 3P4

Abstract:	Let be a locally compact group and let $C_{\delta }^{}(G)$ denote the $C^{}$ -algebra generated by left translation operators on $L^{2}(G)$ . Let $AP(\hat {G})$ and $WAP(\hat {G})$ be the spaces of almost periodic and weakly almost periodic functionals on the Fourier algebra , respectively. It is shown that if contains an open abelian subgroup, then (1) $AP(\hat {G}) = C_{\delta }^{}(G)$ if and only if $AP(\hat {G})_{c}$ is norm dense in $AP(\hat {G})$ ; (2) $WAP(\hat {G})$ is a $C^{}$ -algebra if $WAP(\hat {G})_{c}$ is norm dense in $WAP(\hat {G})$ , where $X_{c}$ denotes the set of elements in with compact support. In particular, for any amenable locally compact group which contains an open abelian subgroup, has the dual Bohr approximation property and $WAP(\hat {G})$ is a $C^{*}$ -algebra.

Keywords:	Locally compact groups left regular representation Fourier and Fourier-Stieltjes algebras almost periodic functionals weakly almost periodic functionals amenable groups

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