Double duals and Hilbert modules
Abstract
Let A be a C*-algebra, H be a Hilbert A-module and K(H) be the closure of the set of finite rank module maps. We show that the W*-algebra of all bounded A**-module maps on the smallest self-dual Hilbert A**-module containing H is isomorphic to K(H)** as W*-algebras. We also show that the unit ball of H is closed in H, the dual of H, in an A-weak topology of H as well as dense in the unit ball of H in a weak*-topology and some versions of Kaplansky density theorem for Hilbert C*-modules.
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