The cb-norm approximation of generalized skew derivations by elementary operators

Abstract

Let A be a ring and σ: A A a ring endomorphism. A generalized skew (or σ-)derivation of A is an additive map d: A A for which there exists a map δ:A A such that d(xy)=δ(x)y+σ(x)d(y) for all x,y ∈ A. If A is a prime C*-algebra and σ is surjective, we determine the structure of generalized σ-derivations of A that belong to the cb-norm closure of elementary operators E(A) on A; all such maps are of the form d(x)=bx+axc for suitable elements a,b,c of the multiplier algebra M(A). As a consequence, if an epimorphism σ: A A lies in the cb-norm closure of E(A), then σ must be an inner automorphism. We also show that these results cannot be extended even to relatively well-behaved non-prime C*-algebras like C(X,M2 ).