Block quantum dynamical semigroups of completely positive definite kernels

Abstract

Kolmogorov decomposition for a given completely positive definite kernel is a generalization of Paschke's GNS construction for the completely positive map. Using Kolmogorov decomposition, to every quantum dynamical semigroup (QDS) for completely positive definite kernels over a set S on given C*-algebra A, we shall assign an inclusion system F = (Fs)s 0 of Hilbert bimodules over A with a generating unit σ=(σs)s 0. Consider a von Neumann algebra B, and let T=(Ts)s 0 be a QDS over a set S on the algebra M2(B) with Ts=pmatrixKs,1 & Ls\\Ls*& Ks,2 pmatrix which acts block-wise. Further, suppose that (Fis )s 0 is the inclusion system affiliated to the diagonal QDS (Ks,i)s 0 along with the generating unit (σs,i )s 0, σ∈ S,i∈ \1,2\, then we prove that there exists a unique contractive (weak) morphism V = (Vs)s 0:F2s F1s such that Lsσ,σ'(b)= s,1σ,Vs bs,2σ' for every σ',σ∈ S and b∈ B. We also study the semigroup version of a factorization theorem for K-families.