On nth roots of normal operators
Abstract
For n-normal operators A [2, 4, 5], equivalently n-th roots A of normal Hilbert space operators, both A and A* satisfy the Bishop--Eschmeier--Putinar property (β)ε, A is decomposable and the quasi-nilpotent part H0(A-λ) of A satisfies H0(A-λ)-1(0)=(A-λ)-1(0) for every non-zero complex λ. A satisfies every Weyl and Browder type theorem, and a sufficient condition for A to be normal is that either A is dominant or A is a class A(1,1) operator.
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