On Arveson's Boundary Theorem

Kei Hasegawa; Yoshimichi Ueda

arXiv:1810.10689·math.OA·May 21, 2019

On Arveson's Boundary Theorem

Kei Hasegawa, Yoshimichi Ueda

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TL;DR

This paper provides an insightful perspective on Arveson's boundary theorem using non-commutative Poisson boundaries, highlighting its applications in operator algebra theory.

Contribution

It introduces a novel approach to understanding Arveson's boundary theorem through non-commutative Poisson boundaries.

Findings

01

Clarifies the connection between boundary theory and non-commutative Poisson boundaries

02

Demonstrates applications in operator algebra contexts

03

Provides new insights into the structure of boundary representations

Abstract

This short note aims to give an insight to Arveson's boundary theorem by means of non-commutative Poisson boundaries and its applications.

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