Multipliers over Fourier algebras of ultraspherical hypergroups

Abstract

Let H be an ultraspherical hypergroup associated to a locally compact group G and let A(H) be the Fourier algebra of H. For a left Banach A(H)-submodule X of VN(H), define QX to be the norm closure of the linear span of the set \uf: u∈ A(H), f∈ X\ in BA(H)(A(H), X*)*. We will show that BA(H)(A(H), X*) is a dual Banach space with predual QX, we characterize QX in terms of elements in A(H) and X. Applications obtained on the multiplier algebra M(A(H)) of the Fourier algebra A(H). In particular, we prove that G is amenable if and only if M(A(H))= Bλ(H), where Bλ(H) is the reduced Fourier-Stieltjes algebra of H . Finally, we investigate some characterizations for an ultraspherical hypergroup to be discrete.