An Ergodic Dilation of Completely Positive Maps

TL;DR

This paper proves a Stinespring-type dilation theorem for unital completely positive maps on C*-algebras, constructing an ergodic dilation that preserves certain invariance properties using Nagy’s dilation theorem.

Contribution

It introduces a novel ergodic dilation framework for completely positive maps on C*-algebras, extending the classical Stinespring theorem with ergodic properties.

Findings

Constructed a dilation of ucp-map with ergodic properties

Established a connection between dilation and invariant states

Applied Nagy dilation theorem to isometries in this context

Abstract

We shall prove the following Stinespring-type theorem: there exists a triple $(\pi,\mathcal{H},\mathbf{V})$ associated with an unital completely positive map $\Phi:\mathfrak{A}\rightarrow \mathfrak{A}$ on C* algebra $\mathfrak{A}$ with unit, where $\mathcal{H}$ is a Hilbert space, $\pi:\mathfrak{A\rightarrow B}(\mathcal{H})$ is a faithful representation and $\mathbf{V}$ is a linear isometry on $\mathcal{H}$ such that $\pi(\Phi(a)=\mathbf{V}^*\pi(a)\mathbf{V}$ for all $a$ belong to $\mathfrak{A}$. The Nagy dilation theorem, applied to isometry $\mathbf{V}$, allows to construct a dilation of ucp-map, $\Phi$, in the sense of Arveson, that satisfies ergodic properties of a $\Phi $-invariante state $\phi$ on $\mathfrak{A}$, if $\Phi$ admit a $\phi $-adjoint.