Structure of block quantum dynamical semigroups and their product systems

Abstract

W. Paschke's version of Stinespring's theorem associates a Hilbert C*-module along with a generating vector to every completely positive map. Building on this, to every quantum dynamical semigroup (QDS) on a C*-algebra A one may associate an inclusion system E=(Et) of Hilbert A- A-modules with a generating unit =(t). Suppose B is a von Neumann algebra, consider M2( B), the von Neumann algebra of 2× 2 matrices with entries from B. Suppose (t)t 0 with t=pmatrix φt1& t t*&φt2 pmatrix, is a QDS on M2(B) which acts block-wise and let (Eit)t 0 be the inclusion system associated to the diagonal QDS (φit)t 0 with the generating unit (ti)t 0, i=1,2. It is shown that there is a contractive (bilinear) morphism T=(Tt)t0 from (E2t)t 0 to (E1t)t 0 such that t(a)= 1t, Tt a2t for all a∈ B. We also prove that any contractive morphism between inclusion systems of von Neumann B- B-modules can be lifted as a morphism between the product systems generated by them. We observe that the E0-dilation of a block quantum Markov semigroup (QMS) on a unital C*-algebra is again a semigroup of block maps.