Perturbation of l1-copies and measure convergence in preduals of von Neumann algebras

Abstract

Let L1 be the predual of a von Neumann algebra with a finite faithful normal trace. We show that a bounded sequence in L1 converges to 0 in measure if and only if each of its subsequences admits another subsequence which converges to 0 in norm or spans l1 "almost isometrically". Furthermore we give a quantitative version of an essentially known result concerning the perturbation of a sequence spanning l1 isomorphically in the dual of a C*-algebra.

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