nLab modular theory

Redirected from "Tomita-Takesaki modular theory".
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Physics

physics, mathematical physics, philosophy of physics

Surveys, textbooks and lecture notes


theory (physics), model (physics)

experiment, measurement, computable physics

AQFT and operator algebra

algebraic quantum field theory (perturbative, on curved spacetimes, homotopical)

Introduction

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field theory:

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quantization

quantum mechanical system, quantum probability

free field quantization

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Contents

Idea

This page is about the modular theory introduced by Tomita for von Neumann-algebras. It is important both for the structure theory of von Neumann-algebras and in the Haag-Kastler approach to AQFT, one important example is the Bisognano-Wichmann theorem. It is often called Tomita-Takesaki theory, because the first presentation beyond a preprint is due to Masamichi Takesaki.

nPOV definition

The modern approach to defining the modular automorphism group is through the theory of noncommutative L_p-spaces?. This was pioneered by Haagerup in 1979 and Yamagami in 1992.

In this approach, given a von Neumann algebra MM, a faithful semifinite normal weight μ\mu on MM, and an imaginary number tt, the modular automorphism associated to MM, μ\mu, and tt is

σ μ t:MM,mμ tmμ t.\sigma_\mu^t\colon M\to M,\qquad m\mapsto \mu^t m \mu^{-t}.

This approach makes it easy to deduce various properties of the modular automorphism group.

For more details, see a MathOverflow answer.

Traditional definition

Let \mathcal{H} be a Hilbert space, \mathcal{M} a von Neumann-algebra with commutant \mathcal{M}' and a separating and cyclic vector Ω\Omega. Then there is a modular operator Δ\Delta and a modular conjugation JJ such that:

  1. Δ\Delta is self-adjoint, positive and invertible (but not bounded).

  2. ΔΩ=Ω\Delta\Omega = \Omega and JΩ=Ω J\Omega = \Omega

  3. JJ is antilinear, J *=J,J 2=𝟙J^* = J, J^2 = \mathbb{1}, JJ commutes with Δ it\Delta^{it}. This implies

    Ad(J)Δ=Δ 1 Ad(J) \Delta = \Delta^{-1}
  4. For every AA \in \mathcal{M} the vector AΩA\Omega is in the domain of Δ 12\Delta^{\frac{1}{2}} and

    JΔ 12AΩ=A *Ω=:SAΩ J \Delta^{\frac{1}{2}} A \Omega = A^* \Omega =: SA \Omega
  5. The unitary group Δ it\Delta^{it} defines a group automorphism of \mathcal{M}:

    Ad(Δ it)=for allt Ad(\Delta^{it}) \mathcal{M} = \mathcal{M} \; \; \text{for all} \; t \in \mathbb{R}
  6. JJ maps \mathcal{M} to \mathcal{M}'.

References

General

Introduction:

  • Stephen J. Summers: “Tomita-Takesaki Modular Theory” (arXiv)

Role in algebraic quantum field theory:

  • Hans-Jürgen Borchers, On Revolutionizing of Quantum Field Theory with Tomita’s Modular Theory, ESI Preprint 773 (1999) [pdf]

Many textbooks on operator algebras contain a chapter about modular theory.

MathOverflow question tomita-takesaki-versus-frobenius-where-is-the-similarity

Discussion in terms of topos theory is in

  • Simon Henry, From toposes to non-commutative geometry through the study of internal Hilbert spaces, 2014 (pdf)

See also

Modular flow

On Tomita-Takesaki modular flow as emergent time evolution in quantum physics (AQFT):

Videos of lecture series on modular theory by Masamichi Takesaki and Serban Stratila:

Noncommutative Integration

A very detailed overview of modular flow, non-commutative L pL_p-spaces, etc. which includes many further references:

  • Ryszard Paweł Kostecki W *W^{*}-algebras and noncommutative integration arXiv:1307.4818

Last revised on August 5, 2024 at 00:19:45. See the history of this page for a list of all contributions to it.