Commutators Close to the Identity in Unital C*-Algebras
Abstract
Let H be an infinite dimensional Hilbert space and B(H) be the C*-algebra of all bounded linear operators on H, equipped with the operator-norm. By improving the Brown-Pearcy construction, Terence Tao in 2018, extended the result of Popa [1981] which reads as : For each 0<≤ 1/2, there exist D,X ∈ B(H) with \|[D,X]-1B(H)\|≤ such that \|D\|\|X\|=O(51), where [D,X]:= DX-XD. In this paper, we show that Tao's result still holds for certain class of unital C*-algebras which include B(H) as well as the Cuntz algebra O2.
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