ExplorerQuantum ComputingQuantum Physics
Research PaperResearchia:202607.07078

Integral representations of $f$-divergences for general von Neumann algebras

Ricardo Correa da Silva

Abstract

We define and analyze hockeystick divergences and $f$-divergences for normal positive functionals on general von Neumann algebras, generalizing and unifying previous work in classical probability and finite-dimensional von Neumann algebras. All the main properties of these state distinguishability measures (including in particular monotonicity, convexity, semicontinuity, bounds, state discrimination, data processing inequality) are derived from properties of the Jordan decomposition of selfadjoi...

Submitted: July 7, 2026Subjects: Quantum Physics; Quantum Computing

Description / Details

We define and analyze hockeystick divergences and ff-divergences for normal positive functionals on general von Neumann algebras, generalizing and unifying previous work in classical probability and finite-dimensional von Neumann algebras. All the main properties of these state distinguishability measures (including in particular monotonicity, convexity, semicontinuity, bounds, state discrimination, data processing inequality) are derived from properties of the Jordan decomposition of selfadjoint normal functionals. This is done by representing the ff-divergences as integrals over hockeystick divergences, and their significance in quantum hypothesis testing is reviewed. The f0f_0-divergence given by the information function f0(t)=tlntf_0(t) = t \ln t is shown to coincide with Araki's relative entropy, extending results of Frenkel to general von Neumann algebras.


Source: arXiv:2607.05195v1 - http://arxiv.org/abs/2607.05195v1 PDF: https://arxiv.org/pdf/2607.05195v1 Original Link: http://arxiv.org/abs/2607.05195v1

Please sign in to join the discussion.

No comments yet. Be the first to share your thoughts!

Access Paper
View Source PDF
Submission Info
Date:
Jul 7, 2026
Topic:
Quantum Computing
Area:
Quantum Physics
Comments:
0
Bookmark