Left m-invertibility by the adjoint of Drazin inverse and m-selfadjointness of Hilbert space operators

Abstract

A Hilbert space operator A∈ is left (X,m)-invertible by B∈ (resp., B∈ is an (X,m)-adjoint of A∈) for some operator X∈ if B,Am(X)=Σj=0m(-1)j(arrayclcrm\array)Bm-jXAm-j=0 (resp., δB,Am(X)=Σj=0m(-1)j(arrayclcrm\array)B(m-j)XAj=0). No Drazin invertible operator A∈, with Drazin inverse Ad, can be left (I,m)-invertible (equivalently, m-invertible) by its adjoint or its Drazin inverse or the adjoint of its Drazin inverse. For Drazin inverrtible operators A, it is seen that the existence of an X acts as a conduit for implications B,A(X)=0 δmC,A(X)=0, where the pair (B,C)= either (A,Ad) or (Ad,A) or (A*,A*d) or (A*d,A*). Reverse implications fail. Assuming certain commutativity conditions, it is seen that A*d,Am(X)=0=nB*d,B(Y) implies δm+n-1A*B*,AB(XY)=0=δm+n-1A*+B*,A+B(XY).