Product of nonnegative selfadjoint operators in unbounded settings

Abstract

In this paper, necessary and sufficient conditions are established for the factorization of a closed, in general, unbounded operator T=AB into a product of two nonnegative selfadjoint operators A and B. Already the special case, where A or B is bounded, leads to new results and is of wider interest, since the problem is connected to the notion of similarity of the operator T to a selfadjoint one, but, in fact, goes beyond this case. It is proved that this subclass of operators can be characterized not only by means of quasi-affinity of T* to an operator S=S* ≥ 0, but also via Sebesty\'en inequality, a result known in the setting of bounded operators T. Another subclass of operators T, where A or B has a bounded inverse, leads to a similar analysis. This gives rise to a reversed version of Sebesty\'en inequality which is introduced in the present paper. It is shown that this second subclass, where A-1 or B-1 is bounded, can be characterized in a similar way by means of quasi-affinity of T, rather that T*, to an operator S=S*≥ 0. Furthermore, the connection between these two classes and weak-similarity as well as quasi-similarity to some S=S*≥ 0 is investigated. Finally, the special case where S is bounded is considered.