Generalized Hirano inverses in Banach Algebra
Abstract
Let A be a Banach Algebra, we say that a∈ A has generalized Hirano inverse if there exists some b ∈ A such that b=b.a.b, a.b=b.a and a-a2.b is quasi nil potent, if and only if there exists some p=p3∈ A such that a-p is quasi nil potent.
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