On the Lifting Property for C*-algebras

Abstract

We characterize the lifting property (LP) of a separable C*-algebra A by a property of its maximal tensor product with other C*-algebras, namely we prove that A has the LP if and only if for any family (\Di i∈ I\ of C*-algebras the canonical map ∞(\Di\) A ∞(\Di A\) is isometric. Equivalently, this holds if and only if M A= M nor A for any von Neumann algebra M.