English

Phase transitions for $\phi^4_3$

Probability 2020-08-21 v2 Mathematical Physics math.MP

Abstract

We establish a surface order large deviation estimate for the magnetisation of low temperature ϕ34\phi^4_3. As a byproduct, we obtain a decay of spectral gap for its Glauber dynamics given by the ϕ34\phi^4_3 singular stochastic PDE. Our main technical contributions are contour bounds for ϕ34\phi^4_3, which extends 2D results by Glimm, Jaffe, and Spencer (1975). We adapt an argument by Bodineau, Velenik, and Ioffe (2000) to use these contour bounds to study phase segregation. The main challenge to obtain the contour bounds is to handle the ultraviolet divergences of ϕ34\phi^4_3 whilst preserving the structure of the low temperature potential. To do this, we build on the variational approach to ultraviolet stability for ϕ34\phi^4_3 developed recently by Barashkov and Gubinelli (2019).

Cite

@article{arxiv.2006.15933,
  title  = {Phase transitions for $\phi^4_3$},
  author = {Ajay Chandra and Trishen S. Gunaratnam and Hendrik Weber},
  journal= {arXiv preprint arXiv:2006.15933},
  year   = {2020}
}

Comments

92 pages. Version 2 fixes minor typos (incl. replacing $\beta$ by $\sqrt\beta$ in Theorem 1.2) and includes a small technical result about block averaging Wick square field (Remark 3.3 and Proposition 5.23)

R2 v1 2026-06-23T16:41:42.878Z