A Remark on Contractible Banach Algebras of Operators

Abstract

For a Banach algebra A, we say that an element M in Aγ A is a hyper-commutator if (a 1)M=M(1 a) for every a∈ A. A diagonal for a Banach algebra is a hyper-commutator which its image under diagonal mapping is 1. It is well-known that a Banach algebra is contractible iff it has a diagonal. The main aim of this note is to show that for any Banach subalgebra A⊂eqL(X) of bounded linear operators on infinite-dimensional Banach space X, which contains the ideal of finite-rank operators, the image of any hyper-commutator of A under the canonical algebra-morphism L(X)γL(X)(Xγ X), vanishes.

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