AI Chat AI Image Generator AI Video Text to Speech

The Category of von Neumann Algebras

04/06/2018
by   Abraham A. Westerbaan, et al.
0

In this dissertation we study the category of completely positive normal contractive maps between von Neumann algebras. It includes an extensive introduction to the basic theory of C^*-algebras and von Neumann algebras.

READ FULL TEXT

page 1

page 2

page 3

page 4

Related Research

research
01/29/2019

Universal Properties in Quantum Theory

We argue that notions in quantum theory should have universal properties...
0 Mathieu Huot, et al.
research
06/09/2009

Toward a Category Theory Design of Ontological Knowledge Bases

I discuss (ontologies_and_ontological_knowledge_bases / formal_methods_a...
0 Nikolaj Glazunov, et al.
research
07/19/2021

Strong shift equivalence as a category notion

In this paper, we present a completely radical way to investigate the ma...
0 Emmanuel Jeandel, et al.
research
09/04/2019

Bisimulation maps in presheaf categories

The category of presheaves on a (small) category is a suitable semantic ...
0 Harsh Beohar, et al.
research
02/26/2018

Self-organizing maps and generalization: an algorithmic description of Numerosity and Variability Effects

Category, or property generalization is a central function in the human ...
0 Valentina Gliozzi, et al.
research
07/27/2022

Categorification of Negative Information using Enrichment

In many applications of category theory it is useful to reason about "ne...
0 Andrea Censi, et al.
research
09/03/2023

The Information Geometry of UMAP

In this note we highlight some connections of UMAP to the basic principl...
0 Alexander Kolpakov, et al.

Please sign up or login with your details

Forgot password? Click here to reset

Out of credits

Refill your membership to continue using DeepAI

Stripe
Paypal