A dichotomy for derivations and automorphisms of C*-algebras

Abstract

Building on previous work of Kadison--Ringrose, Elliott, Akemann--Pedersen, and this author, we prove a dichotomy for the relation of outer equivalence of derivations and unitary equivalence of derivable automorphisms for a separable C*-algebra A: either such relations are trivial, or the relation E0N of tail equivalence of countably many binary sequences is reducible to them. When A is furthermore unital, this implies that A has no outer derivation if and only if the group Inn( A) of inner automorphisms is 20 in Aut( A) , if and only if it is 30 in Aut( A) . Furthermore, one has that the space of inner derivations is norm-closed if and only if Inn(A) is norm-closed, if and only if Inn( A) is 30 in Aut( A) . This provides a complexity-theoretic characterization of C*-algebras with only inner derivations, which as a by-product rules out D( 20) as a possible complexity class for Inn( A) in Aut( A) for a separable unital C*-algebra A.