Fourier and Fourier-Stieltjes algebra of Fell bundles over discrete groups

Abstract

For a Fell bundle B=\Bs\s ∈ G over a discrete group G, we use representations theory of B to construct the Fourier and Fourier-Stieltjes spaces A(B) and B(B) of B. When B is saturated we show B(B) is canonically isomorphic to the dual space of the cross sectional C*-algebra C*(B) of B. When there is a compatible family of co-multiplications on the fibers we show that B(B) and A(B) are Banach algebras. This holds in particular if either the fiber Be at identity is a Hopf C*-algebra or B is the Fell bundle of a C*-dynamical system. When A(B) is a Banach algebra with bounded approximate identity, we show that B(B) is the multiplier algebra of A(B). We prove a Leptin type theorem by showing that amenability of G implies the existence of bounded approximate identity for A(B) for bundles coming from a C*-dynamical system (A,G,γ). The converse is left as an open problem.