Induction, absorption and weak containment of *-representations of Banach *-algebraic bundles

Abstract

Given a Fell bundle B=\Bt\t∈ G over a LCH group and a closed subgroup H⊂ G, we show that all the *-representations of BH:=\Bt\t∈ H can be induced to *-representations of B by means of Fell's induction process; which we describe as induction via a *-homomorphism qBH C*(B) B(XC*(BH)). The quotients C*H(B):=qBH(C*(B)) are intermediate to C*(B)= C*G(B) and C*r(B)=C*\e\(B) because every inclusion of subgroups H⊂ K⊂ G gives a unique quotient map qBHK C*K(B) C*H(B) such that qBHK qBK=qBH. All along the article we try to find conditions on B, G,\ H and K (e.g. saturation, nuclearity or weak containment) that imply qBHK is faithful. One of our main tools is a blend of Fell's absorption principle (for saturated bundles) and a result of Exel and Ng for reduced cross sectional C*-algebras. We also show that given an imprimitivity system T,P for B over G/H, if H is open or has open normalizer in G, then T is weakly contained in a *-representation induced from BH (even if B is not saturated). Given normal and closed subgroups of G, H⊂ K, we construct a Fell bundle C over G/K such that C*r(C)=C*H(B). We show that qBH is faithful if and only if both qC\e\ and qBKH are.