An intuitive construction of modular flow

Author(s)

Sorce, Jonathan

Abstract

The theory of modular flow has proved extremely useful for applying thermodynamic reasoning to out-of-equilibrium states in quantum field theory. However, the standard proofs of the fundamental theorems of modular flow use machinery from Fourier analysis on Banach spaces, and as such are not especially transparent to an audience of physicists. In this article, I present a construction of modular flow that differs from existing treatments. The main pedagogical contribution is that I start with thermal physics via the KMS condition, and derive the modular operator as the only operator that could generate a thermal time-evolution map, rather than starting with the modular operator as the fundamental object of the theory. The main technical contribution is a new proof of the fundamental theorem stating that modular flow is a symmetry. The new proof circumvents the delicate issues of Fourier analysis that appear in previous treatments, but is still mathematically rigorous.

Date issued

2023-12-12

URI

https://hdl.handle.net/1721.1/153211

Department

Massachusetts Institute of Technology. Department of Physics

Publisher

Springer Berlin Heidelberg

Citation

Journal of High Energy Physics. 2023 Dec 12;2023(12):79

Version: Final published version