Four-dimensional operator systems without the lifting property

Abstract

The purpose of this note is to provide a family of explicit examples of 4-dimensional operator systems contained in the Calkin algebra Q(H) on a separable infinite-dimensional Hilbert space H for which the identity map has no unital completely positive (ucp) lift to B(H) with respect to the canonical quotient map π:B(H) Q(H). More specifically, to each unital C*-algebra A generated by n unitaries and unital *-homomorphism ρ:A Q(H) with no ucp lift, we construct a four-dimensional operator subsystem S of Mn+1(A) without the lifting property. As a result, for each n ≥ 2 we exhibit a four-dimensional operator system S in Mn+1(Cr*(Fn)) without the lifting property. We also obtain explicit examples where the generalized Smith-Ward problem for liftings of joint matrix ranges for three self-adjoint operators has a negative answer.