Exponential decay of correlations at high temperature in $H^{2|2n}$ nonlinear sigma models

TL;DR

This paper proves exponential decay of correlations in hyperbolic supermanifold sigma models at high temperature, extending results to models with long-range interactions.

Contribution

It establishes exponential decay of correlations for a family of hyperbolic supermanifold sigma models at high temperature, including long-range interaction cases.

Findings

Exponential decay of two-point correlations at high temperature.

Decay holds for models with long-range interactions.

Results are valid for any dimension and target space parameter n>1.

Abstract

We consider a family of nonlinear sigma models on $\mathbb{Z}^{d}$ whose target space is the hyperbolic super manifold $H^{2|2n}$, $n >1$, introduced by Crawford as an extension of Zirnbauer's $H^{2|2}$ model for disordered systems. We prove exponential decay of the two-point correlation function in the high-temperature regime $\beta \leq C n^{-1}$, with $C>0$ a universal constant, for any $n>1$ and any dimension $d\geq 1$, with mass $\log \beta^{-1}$. We also consider models with long-range interaction and prove fast decay in the same high-temperature regime. The proof is based on the reduction to a marginal fermionic theory and combines a high-temperature cluster expansion, exact combinatorics and bounds derived via Grassmann norms.