Products of commutators in simple algebras
Abstract
Let A be a finite-dimensional simple algebra that is not a field. We show that every a∈ A can be written as a=(bc-cb)(de-ed) for some b,c,d,e∈ A. This is not always true for infinite-dimensional simple algebras. In fact, for any m∈ N we provide an example of an infinite-dimensional simple unital C*-algebra A in which 1 cannot be written as Σi=1m xi(aibi-biai)yi for some xi,ai,bi,yi∈ A.
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