On (n,k)-quasi-*-paranormal operators

Abstract

For nonnegative integers n and k, we introduce in this paper a new class of (n,k)-quasi-*-paranormal operators satisfying ||T1+n(Tkx)||1/(1+n)||Tkx||n/(1+n) ≥ ||T*(Tkx)|| \ for all x ∈ H. This class includes the class of n-*-paranormal operators and the class of (1,k)-quasi-*-paranormal operators contains the class of k-quasi-*-class A operators. We study basic properties of (n,k)-quasi-*-paranormal operators: (1) inclusion relations and examples; (2) a matrix representation; (3) joint (approximate) point spectrum and single valued extension property.