The paper is devoted to local derivations on the algebra S(M, T) of T-measurable operators affiliated with a von Neumann algebra M and a faithful normal semi-finite trace T. We prove that every local derivation on S(M, T) which is continuous in the measure topology, is in fact a derivation. In the particular case of type I von Neumann algebras, they all are inner derivations. It is proved that for type I finite von Neumann algebras without an abelian direct summand, and also for von Neumann algebras with the atomic lattice of projections, the continuity condition on local derivations in the above results is redundant. Finally we give necessary and sufficient conditions on a commutative von Neumann algebra M for the algebra S(M, T) to admit local derivations which are not derivations.

• 出版日期2011-8