Operator E-norms and their use

Abstract

We consider a family of norms (called operator E-norms) on the algebra B(H) of all bounded operators on a separable Hilbert space H induced by a positive densely defined operator G on H. Each norm of this family produces the same topology on B(H) depending on G. By choosing different generating operator G one can obtain operator E-norms producing different topologies, in particular, the strong operator topology on bounded subsets of B(H). We obtain a generalised version of the Kretschmann-Schlingemann-Werner theorem, which shows continuity of the Stinespring representation of CP linear maps w.r.t. the energy-constrained cb-norm (diamond norm) on the set of CP linear maps and the operator E-norm on the set of Stinespring operators. The operator E-norms induced by a positive operator G are well defined for linear operators relatively bounded w.r.t. the operator G and the linear space of such operators equipped with any of these norms is a Banach space. We obtain explicit relations between the operator E-norms and the standard characteristics of G-bounded operators. The operator E-norms allow to obtain simple upper bounds and continuity bounds for some functions depending on G-bounded operators used in applications.