Structure of n-quasi left m-invertible and related classes of operators

Abstract

Given Hilbert space operators T, S∈, let and δ∈ B() denote the elementary operators T,S(X)=(LTRS-I)(X)=TXS-X and δT,S(X)=(LT-RS)(X)=TX-XS. Let d= or δ. Assuming T commutes with S*, and choosing X to be the positive operator S*nSn for some positive integer n, this paper exploits properties of elementary operators to study the structure of n-quasi [m,d]-operators dmT,S(X)=0 to bring together, and improve upon, extant results for a number of classes of operators, amongst them n-quasi left m-invertible operators, n-quasi m-isometric operators, n-quasi m-selfadjoint operators and n-quasi (m,C) symmetric operators (for some conjugation C of ). It is proved that Sn is the perturbation by a nilpotent of the direct sum of an operator S1n=(S|Sn())n satisfying dmT1,S1(I1)=0, T1=T|Sn(), with the 0 operator; if also S is left invertible, then Sn is similar to an operator B such that dmB*,B(I)=0. For power bounded S and T such that ST*-T*S=0 and T,S(S*nSn)=0, S is polaroid (i.e., isolated points of the spectrum are poles). The product property, and the perturbation by a commuting nilpotent property, of operators T, S satisfying dmT,S(I)=0, given certain commutativity properties, transfers to operators satisfying S*ndmT,S(I)Sn=0.