A Radon-Nikod\'ym theorem for local completely positive invariant multilinear maps

TL;DR

This paper extends the Radon-Nikodým theorem to unbounded operator-valued local completely positive invariant multilinear maps between locally C*-algebras, providing a minimal Stinespring-type representation and a Radon-Nikodým derivative.

Contribution

It introduces a Radon-Nikodým theorem for unbounded local completely positive invariant multilinear maps, including a minimal representation and a Radon-Nikodým derivative in this context.

Findings

Established a Stinespring-type representation for these maps.

Proved the Radon-Nikodým theorem in this setting.

Identified the Radon-Nikodým derivative as a positive contraction with reducing subspaces.

Abstract

In this article, we introduce local completely positive $k$-linear maps between locally $C^{\ast}$-algebras and obtain Stinespring type representation by adopting the notion of "invariance" defined by J. Heo for $k$-linear maps between $C^{\ast}$-algebras. Also, we supply the minimality condition to make certain that minimal representation is unique up to unitary equivalence. As a consequence, we prove Radon-Nikod\'{y}m theorem for unbounded operator-valued local completely positive invariant $k$-linear maps. The obtained Radon-Nikod\'{y}m derivative is a positive contraction on some Hilbert space with several reducing subspaces.