Domination of semigroups on standard forms of von Neumann algebras

Abstract

Consider (Tt)t 0 and (St)t 0 as real C0-semigroups generated by closed and symmetric sesquilinear forms on a standard form of a von Neumann algebra. We provide a characterisation for the domination of the semigroup (Tt)t 0 by (St)t 0, which means that -St v Tt u St v holds for all t 0 and all real u and v that satisfy -v u v. This characterisation extends the Ouhabaz characterisation for semigroup domination to the non-commutative L2 spaces. Additionally, we present a simpler characterisation when both semigroups are positive as well as consider the setting in which (Tt)t 0 need not be real.