Quasi-multipliers of Hilbert and Banach $C^*$-bimodules

Alexander Pavlov; Ulrich Pennig; Thomas Schick

doi:10.7146/math.scand.a-15178

Authors

Alexander Pavlov
Ulrich Pennig
Thomas Schick

DOI:

https://doi.org/10.7146/math.scand.a-15178

Abstract

Quasi-multipliers for a Hilbert

$C^*$ -bimodule

$V$ were introduced by L. G. Brown, J. A. Mingo, and N.-T. Shen [3] as a certain subset of the Banach bidual module

$V^{**}$ . We give another (equivalent) definition of quasi-multipliers for Hilbert

$C^*$ -bimodules using the centralizer approach and then show that quasi-multipliers are, in fact, universal (maximal) objects of a certain category. We also introduce quasi-multipliers for bimodules in Kasparov's sense and even for Banach bimodules over

$C^*$ -algebras, provided these

$C^*$ -algebras act non-degenerately. A topological picture of quasi-multipliers via the quasi-strict topology is given. Finally, we describe quasi-multipliers in two main situations: for the standard Hilbert bimodule

$l_2(A)$ and for bimodules of sections of Hilbert

$C^*$ -bimodule bundles over locally compact spaces.

Quasi-multipliers of Hilbert and Banach $C^*$ -bimodules

Authors

DOI:

Abstract

Downloads

Published

How to Cite

Issue

Section

Current Issue

Subscription

Quasi-multipliers of Hilbert and Banach C∗C^*-bimodules

Authors

DOI:

Abstract

Downloads

Published

How to Cite

Issue

Section

Current Issue

Subscription

Quasi-multipliers of Hilbert and Banach $C^*$ -bimodules