Arazy-type decomposition theorem for bounded linear operators and commutators on the trace class

Abstract

The classical Arazy's decomposition theorem provides a powerful tool in the study of sequences in (and isomorphisms on) a separable operator ideal CE of the algebra B(H) of all bounded linear operators on the separable infinite-dimensional Hilbert space H. In this paper, we extend and strengthen Arazy's decomposition theorem to the setting of general bounded linear operators on a separable (quasi-Banach) operator ideal CE of B(H). Several applications are given to the study of CE-strictly singular operators, largest proper ideals in the algebra B( CE) of all bounded linear operators on CE and complementably homogeneous Banach spaces among others. Our versions of decomposition theorems supply tools for a noncommutative generalization of deep commutator theorems for operators on p and Lp, 1 p <∞ , due to Brown and Pearcy, Apostol, and Dosev, Johnson and Schechtman. We are able to characterize commutators on the Schatten-von Neumann class Cp, 1 p<∞ . For the crucial case, p=1, we establish that any operator T∈ B( C1) is a commutator if and only if T is not of the form λ I+K for some λ≠ 0 and C1-strictly singular operator K.