S-numbers of elementary operators on C*-algebras

Abstract

We study the s-numbers of elementary operators acting on C*-algebras. The main results are the following: If τ is any tensor norm and a,b∈ B(H) are such that the sequences s(a),s(b) of their singular numbers belong to a stable Calkin space J then the sequence of approximation numbers of aτ b belongs to J. If A is a C*-algebra, J is a stable Calkin space, s is an s-number function, and ai, bi ∈ A, i=1,...,m are such that s(π(ai)), s(π(bi)) ∈ J, i=1,...,m for some faithful representation π of A then s(Σi=1m Mai,bi)∈ J. The converse implication holds if and only if the ideal of compact elements of A has finite spectrum. We also prove a quantitative version of a result of Ylinen.