Innerness of continuous derivations on algebras of locally measurable operators

Abstract

It is established that every derivation continuous with respect to the local measure topology acting on the *-algebra LS(M) of all locally measurable operators affiliated with a von Neumann algebra M is necessary inner. If M is a properly infinite von Neumann algebra, then every derivation on LS(M) is inner. In addition, it is proved that any derivation on M with values in Banach M-bimodule of locally measurable operators is inner.