A II1 factor approach to the Kadison-Singer problem

Abstract

We show that the Kadison-Singer problem, asking whether the pure states of the diagonal subalgebra ∞ N⊂ B(2 N) have unique state extensions to B(2 N), is equivalent to a similar statement in II1 factor framework, concerning the ultrapower inclusion Dω ⊂ Rω, where D is the Cartan subalgebra of the hyperfinite II1 factor R, and ω is a free ultraflter. While we do not settle the problem in this latter form, we prove that if A is any singular maximal abelian subalgebra of R, then the inclusion Aω ⊂ Rω does satisfy the Kadison-Singer property.