Asymmetric Fuglede-Putnam Theorem for Unbounded M-Hyponormal Operators

Abstract

A closed densely defined operator T on a Hilbert space H is callled M-hyponormal if D(T) ⊂ D(T*) and there exists M > 0 for which (T-zI)*x ≤ M (T-zI)x for all z ∈ C and for all x∈ D(T). In this paper, we prove that if bounded linear operator A : H → K is such that AB*⊂eq TA , where B is a closed subnormal (resp. a closed M -hyponormal) on H, T is a closed M -hyponormal (resp. a closed subnormal) on H, then (i) AB⊂eq T*A, (ii) ran(A*) reduces B to the normal operator Bran(A*), and (iii) ran(A) reduces T to the normal operator Tran(A).