Infinite order decompositions of C*-algebras
Abstract
In the given article infinite order decompositions of C*-algebras are investigated. We give complete proofs of the following statements: 1) If the order unit space Σ,η p Apη is monotone complete in B(H) (i.e. ultraweakly closed), then Σ,η p Apη is a C*-algebra. 2) If A is monotone complete in B(H) (i.e. a von Neumann algebra), then A=Σ,η p Apη. 3) If Σ,η p Apη is a C*-algebra then this algebra is a von Neumann algebra.
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