Saturated actions by finite dimensional Hopf *-algebras on C*-algebras

Abstract

If a finite group action α on a unital C*-algebra M is saturated, the canonical conditional expectation E:M Mα onto the fixed point algebra is known to be of index finite type with Index(E)=|G| in the sense of Watatani. More generally if a finite dimensional Hopf *-algebra A acts on M and the action is saturated, the same is true with Index (E)=(A). In this paper we prove that the converse is true. Especially in case M is a commutative C*-algebra C(X) and α is a finite group action, we give an equivalent condition in order that the expectation E:C(X) C(X)α is of index finite type, from which we obtain that α is saturated if and only if G acts freely on X. Actions by compact groups are also considered to show that the gauge action γ on a graph C*-algebra C*(E) associated with a locally finite directed graph E is saturated.