Phase transitions for fractional $\Phi^3_d$ on the torus

Niko Nikov

arXiv:2501.17669·math.PR·January 30, 2025

Phase transitions for fractional $\Phi^3_d$ on the torus

Niko Nikov

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TL;DR

This paper investigates phase transitions in the fractional $\

Contribution

It extends the understanding of $\

Findings

01

Constructs and normalizes the fractional $\

02

Identifies phase transition at $d=3\alpha$ in measure behavior

03

Shows measure singularity or non-normalizability depending on nonlinearity size

Abstract

We consider the fractional $Φ_{d}^{3}$ -measure on the $d$ -dimensional torus, with Gaussian free field having inverse covariance $(1 - Δ)^{α}$ , and show a phase transition at $d = 3 α$ . More precisely, in a regular regime $d < 3 α$ , one can construct and normalise this measure, and obtain a measure which is absolutely continuous with respect to the Gaussian free field $μ$ . At $d = 3 α$ , the behaviour depends on the size $∣ σ ∣$ of the nonlinearity: for $∣ σ ∣ ≪ 1$ , the measure exists, but is singular with respect to $μ$ , whereas for $∣ σ ∣ ≫ 1$ , the measure is not normalisable. This generalises a result of Oh, Okamoto, and Tolomeo (2025) on the $Φ_{3}^{3}$ -measure.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Stochastic processes and financial applications · Quantum chaos and dynamical systems