Generalized Hirano inverses in Banach Algebra (1812.11618v1)

Abstract: Let $A$ be a Banach Algebra, we say that $a\in A$ has generalized Hirano inverse if there exists some $b \in A$ such that $b=b.a.b, a.b=b.a$ and $a-a^2.b$ is quasi nil potent, if and only if there exists some $p=p^3\in A$ such that $a-p$ is quasi nil potent.