Classification of q-pure q-weight maps over finite dimensional Hilbert spaces

TL;DR

This paper classifies all q-pure E_0-semigroups induced by CP-flows over finite-dimensional Hilbert spaces, providing a comprehensive understanding of their structure and cocycle conjugacy classes.

Contribution

It introduces a classification framework for q-pure E_0-semigroups over finite-dimensional spaces, extending the understanding of their structure and interrelations.

Findings

Constructed all q-pure E_0-semigroups over finite-dimensional Hilbert spaces.

Provided a classification up to cocycle conjugacy.

Linked q-purity to the ordering of CP-subordinates.

Abstract

An $E_0$-semigroup of $B(H)$ is a one parameter strongly continuous semigroup of $*$-endomorphisms of $B(H)$ that preserve the identity. Every $E_0$-semigroup that possesses a strongly continuous intertwining semigroup of isometries is cocycle conjugate to an $E_0$-semigroup induced by the Bhat induction of a $CP$-flow over a separable Hilbert space $K$. We say an $E_0$-semigroup $\alpha$ is $q$-pure if the $CP$-subordinates $\beta$ of norm one (i.e. $\Vert\beta_t(I)\Vert = 1$ and $\alpha_t-\beta_t$ is completely positive for all $t \geq 0$) are totally ordered in the sense that if $\beta$ and $\gamma$ are two $CP$-subordinates of $\alpha$ of norm one, then $\beta \geq \gamma$ or $\gamma \geq \beta$. This paper shows how to construct and classify all $q$-pure $E_0$-semigroups induced by $CP$-flows over a finite-dimensional Hilbert space $K$ up to cocycle conjugacy.