The Kadison-Singer problem for the direct sum of matrix algebras

Abstract

Let Mn denote the algebra of complex n× n matrices and write M for the direct sum of the Mn. So a typical element of M has the form \[x = x1 x2 \... xn \...,\] where xn ∈ Mn and \|x\| = n\|xn\|. We set D= \\xn\ ∈ M: xn is diagonal for all N\. We conjecture (contra Kadison and Singer (1959)) that every pure state of D extends uniquely to a pure state of M. This is known for the normal pure states of D, and we show that this is true for a (weak*) open, dense subset of all the singular pure states of D. We also show that (assuming the Continuum hypothesis) M has pure states that are not multiplicative on any maximal abelian *-subalgebra of M.