Structural Properties and Normality Criteria for Subclasses of Normaloid Operators

Abstract

We investigate structural properties and normality criteria for certain classes of bounded linear operators on a Hilbert space. We show that an operator T with polar decomposition T = U|T| is self-adjoint if and only if T is absolute-(p,r)-paranormal and the partial isometry U is self-adjoint. Extending Ando's Theorem, we prove that if T is absolute-(p,r)-paranormal and Tn is normal for some n ∈ N, then T itself is normal. We further show that if T is absolute-(p,r)-paranormal and T2 is compact, then T is a compact normal operator. Finally, we obtain several characterizations of quasinormal partial isometries within the normaloid hierarchy.