Pure inductive limit state and Kolmogorov's property-II

Abstract

A translation invariant state ω on C*-algebra =k ∈ M(k), where M(k)=Md() is the d-dimensional matrices over field of complex numbers, give rises a stationary quantum Markov chain and associates canonically a unital completely positive normal map τ on a von-Neumann algebra with a faithful normal invariant state φ. We give an asymptotic criteria on the Markov map (,τ,φ) for purity of ω. Such a pure ω gives only type-I or type-III factor ωR once restricted to one side of the chain R=_+M(k). In case ωR is type-I, ω admits Kolmogorov's property.