Measures of noncompactness on the standard Hilbert C*-module

Abstract

We define a measure of noncompactness λ on the standard Hilbert C*-module l2( A) over a unital C*-algebra, such that λ(E)=0 if and only if E is A-precompact (i.e.\ it is -close to a finitely generated projective submodule for any >0) and derive its properties. Further, we consider the known, Kuratowski, Hausdorff and Istratescu measure of noncomapctnes on l2( A) regarded as a locally convex space with respect to a suitable topology, and obtain their properties as well as some relationship between them and introduced measure of noncompactness λ.