On the singular abelian rank of ultraproduct II1 factors
Abstract
We prove that, under the continuum hypothesis c=1, any ultraproduct II1 factor M= Πω Mn of separable finite factors Mn contains more than c many mutually disjoint singular MASAs, in other words the singular abelian rank of M, r(M), is larger than c. Moreover, if the strong continuum hypothesis 2 c=2 is assumed, then r(M) = 2 c. More generally, these results hold true for any II1 factor M with unitary group of cardinality c that satisfies the bicommutant condition (A0' M)' M=M, for all A0⊂ M separable abelian.
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