Mathematics – Operator Algebras
Scientific paper
2006-02-08
J. London Math. Soc. (2) 75 (2007) 243-254
Mathematics
Operator Algebras
18 pages
Scientific paper
10.1112/jlms/jdl019
Using methods of R.J.Tauer we exhibit an uncountable family of singular masas in the hyperfinite $\textrm{II}_1$ factor $\R$ all with Puk\'anszky invariant $\{1\}$, no pair of which are conjugate by an automorphism of $R$. This is done by introducing an invariant $\Gamma(A)$ for a masa $A$ in a \IIi factor $N$ as the maximal size of a projection $e\in A$ for which $A e$ contains non-trivial centralising sequences for $eN e$. The masas produced give rise to a continuous map from the interval $[0,1]$ into the singular masas in $\R$ equiped with the $d_{\infty,2}$-metric. A result is also given showing that the Puk\'anszky invariant is $d_{\infty,2}$-upper semi-continuous. As a consequence, the sets of masas with Puk\'anszky invariant $\{n\}$ are all closed.
Sinclair Allan
White Stuart
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