Automorphisms of central extensions of type I von Neumann algebras

Abstract

Given a von Neumann algebra M we consider the central extension E(M) of M. For type I von Neumann algebras E(M) coincides with the algebra LS(M) of all locally measurable operators affiliated with M. In this case we show that an arbitrary automorphism T of E(M) can be decomposed as T=Ta Tφ, where Ta(x)=axa-1 is an inner automorphism implemented by an element a∈ E(M), and Tφ is a special automorphism generated by an automorphism φ of the center of E(M). In particular if M is of type I∞ then every band preserving automorphism of E(M) is inner.