English

Normal Typicality and von Neumann's Quantum Ergodic Theorem

Quantum Physics 2010-12-02 v3 Statistical Mechanics

Abstract

We discuss the content and significance of John von Neumann's quantum ergodic theorem (QET) of 1929, a strong result arising from the mere mathematical structure of quantum mechanics. The QET is a precise formulation of what we call normal typicality, i.e., the statement that, for typical large systems, every initial wave function ψ0\psi_0 from an energy shell is "normal": it evolves in such a way that ψt><ψt|\psi_t> <\psi_t| is, for most tt, macroscopically equivalent to the micro-canonical density matrix. The QET has been mostly forgotten after it was criticized as a dynamically vacuous statement in several papers in the 1950s. However, we point out that this criticism does not apply to the actual QET, a correct statement of which does not appear in these papers, but to a different (indeed weaker) statement. Furthermore, we formulate a stronger statement of normal typicality, based on the observation that the bound on the deviations from the average specified by von Neumann is unnecessarily coarse and a much tighter (and more relevant) bound actually follows from his proof.

Cite

@article{arxiv.0907.0108,
  title  = {Normal Typicality and von Neumann's Quantum Ergodic Theorem},
  author = {Sheldon Goldstein and Joel L. Lebowitz and Christian Mastrodonato and Roderich Tumulka and Nino Zanghi},
  journal= {arXiv preprint arXiv:0907.0108},
  year   = {2010}
}

Comments

18 pages LaTeX, no figures

R2 v1 2026-06-21T13:19:59.605Z