Irreducible operators in von Neumann algebras
Abstract
Let M be a separable von Neumann algebra with center Z(M). An operator T in M is called irreducible if the von Neumann algebra W*(T) generated by T has trivial relative commutant, i.e., W*(T)'=Z(M). In this paper, we show that irreducible operators in M form a norm-dense Gδ set, which is a generalization of Halmos' theorem. Moreover, we prove that every operator in M is the sum of two irreducible operators, which is an analogue of Radjavi's theorem.
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