Characterizations of Jordan derivations on algebras of locally measurable operators

Abstract

We prove that if M is a properly infinite von Neumann algebra and LS( M) is the local measurable operator algebra affiliated with M, then every Jordan derivation from LS( M) into itself is continuous with respect to the local measure topology t( M). We construct an extension of a Jordan derivation from M into LS( M) up to a Jordan derivation from LS( M) into itself. Moreover, we prove that if M is a properly von Neumann algebra and A is a subalgebra of LS( M) such that M⊂ A, then every Jordan derivation from A into LS( M) is continuous with respect to the local measure topology t( M).