A non-diagonalizable pure state

Abstract

We construct a pure state on the C*-algebra B(2) of all bounded linear operators on 2 which is not diagonalizable, i.e., it is not of the form u T(ek), ek for any orthonormal basis (ek)k∈ N of 2 and an ultrafilter u on N. This constitutes a counterexample to Anderson's conjecture without additional hypothesis and improves results of C. Akemann, N. Weaver, I. Farah and I. Smythe who constructed such states making additional set-theoretic assumptions. It follows from results of J. Anderson and the positive solution to the Kadison-Singer problem due to A. Marcus, D. Spielman, N. Srivastava that the restriction of our pure state to any atomic masa D((ek)k∈ N) of diagonal operators with respect to an orthonormal basis (ek)k∈ N is not multiplicative on D((ek)k∈ N).