Hilbert C*-modules over monotone complete C*-algebras

Abstract

The aim of the present paper is to describe self-duality and C*- reflexivity of Hilbert A-modules M over monotone complete C*-algebras A by the completeness of the unit ball of M with respect to two types of convergence being defined, and by a structural criterion. The derived results generalize earlier results of H.~Widom [Duke Math.~J.~23, 309-324, MR 17 \# 1228] and W.~L.~Paschke [Trans. Amer.~Math.~Soc.~182, 443-468, MR 50 \# 8087, Canadian J.~Math.~26, 1272-1280, MR 57 \# 10433]. For Hilbert C*-modules over commutative AW*-algebras the equivalence of the self-duality property and of the Kaplansky-Hilbert property is reproved, (cf. M.~Ozawa [J.~Math.~Soc.~Japan 36, 589-609, MR 85m:46068] ). Especially, one derives that for a C*-algebra A the A-valued inner pro\-duct of every Hilbert A-module M can be continued to an A-valued inner product on it's A-dual Banach A-module M' turning M' to a self-dual Hilbert A-module if and only if A is monotone complete (or, equivalently, additively complete) generalizing a result of M.~Hamana [Internat.~J.~Math.~3(1992), 185-204]. A classification of countably generated self-dual Hilbert A-modules over monotone complete C*-algebras A is established. The set of all bounded module operators EndA ( M) on self-dual Hilbert A-modules M over monotone complete C*-algebras A is proved again to be a monotone complete

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