Picard groups of certain stably projectionless C*-algebras

Abstract

We compute Picard groups of several nuclear and non-nuclear simple stably projectionless C*-algebras. In particular, the Picard group of Razak-Jacelon algebra W2 is isomorphic to a semidirect product of Out(W2) with R+×. Moreover, for any separable simple nuclear stably projectionless C*-algebra with a finite dimensional lattice of densely defined lower semicontinuous traces, we show that Z-stability and strict comparison are equivalent. (This is essentially based on the result of Matui and Sato, and Kirchberg's central sequence algebras.) This shows if A is a separable simple nuclear stably projectionless C*-algebra with a unique tracial state (and no unbounded trace) and has strict comparison, the following sequence is exact: [CD 1 @>>> Out(A) @>>> Pic(A) @>>> F(A) @>>> 1 CD] where F(A) is the fundamental group of A.