Large Deviations of the $Φ^4_3$ Measure via Stochastic Quantisation

Tom Klose, Avi Mayorcas

Research output: Working paper / PreprintPreprint

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Abstract

The $\Phi^4_3$ measure is one of the easiest non-trivial examples of a Euclidean quantum field theory (EQFT) whose rigorous construction in the 1970's has been one of the celebrated achievements of constructive quantum field theory. In recent years, progress in the field of singular stochastic PDEs, initiated by the theory of regularity structures, has allowed for a new construction of the $\Phi^4_3$ EQFT as the invariant measure of a previously ill-posed Langevin dynamics, a strategy originally proposed by Parisi and Wu ('81) under the name stochastic quantisation. We apply the same methodology to obtain a large deviation principle (LDP) for the family of periodic $\Phi^4_3$ measures at varying temperature. In addition, we show that the rate functional of the LDP and the $\Phi^4_3$ action functional coincide up to a constant.
Original languageEnglish
PublisherarXiv
Publication statusPublished - 1 Feb 2024

Bibliographical note

66 pages, 5 figures

Keywords

  • math.PR
  • math-ph
  • math.AP
  • math.MP
  • Primary: 81S20, Secondary: 60F10, 60H17, 60L30

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