Power-norms based on Hilbert C*-modules

Abstract

Suppose that E and F are Hilbert C*-modules. We present a power-norm (\|·\|En:n∈N) based on E and obtain some of its fundamental properties. We introduce a new definition of the absolutely (2,2)-summing operators from E to F, and denote the set of such operators by 2(E,F) with the convention 2(E)=2(E,E). It is known that the class of all Hilbert--Schmidt operators on a Hilbert space H is the same as the space 2(H). We show that the class of Hilbert--Schmidt operators introduced by Frank and Larson coincides with the space 2(E) for a countably generated Hilbert C*-module E over a unital commutative C*-algebra. These results motivate us to investigate the properties of the space 2(E,F).