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 $Q_X$ to be the norm closure of the linear span of the set ${uf: u\in A(H), f\in X}$ in $B_{A(H)}(A(H), X^)^$. We will show that $B_{A(H)}(A(H), X^*)$ is a dual Banach space with predual $Q_X$, we characterize $Q_X$ 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))= B_{\lambda}(H)$, where $B_{\lambda}(H) $ is the reduced Fourier-Stieltjes algebra of $ H $. Finally, we investigate some characterizations for an ultraspherical hypergroup to be discrete.