The amenability constant of the Fourier algebra
Abstract
For a locally compact group G, let A(G) denote its Fourier algebra and G its dual object, i.e. the collection of equivalence classes of unitary represenations of G. We show that the amenability constant of A(G) is less than or equal to \(π) : π ∈ G \ and that it is equal to one if and only if G is abelian.
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