Non-cocycle-conjugate E0-semigroups on factors

Abstract

We investigate E0-semigroups on general factors, which are not necessarily of type I, and analyse associated invariants like product systems, super product systems etc. By tensoring E0-semigroups on type I factors with E0-semigroups on type II1 factor, we produce several families (both countable and uncountable), consisting of mutually non-cocycle-conjugate of E0-semigroups on the hyperfinite II∞ factor. Using CCR representations associated with quasi-free states, we construct for the first time, uncountable families consisting of mutually non-cocycle-conjugate E0-semigroups on all type IIIλ factors, for λ ∈ (0,1].