Upper bounds on Liouville first passage percolation and Watabiki's prediction

TL;DR

This paper establishes upper bounds on Liouville first passage percolation distances in Gaussian free fields, providing insights that challenge Watabiki's predictions about Liouville quantum gravity at high temperatures.

Contribution

The authors derive explicit upper bounds for Liouville first passage percolation distances, including in discrete settings, and compare these results with theoretical predictions.

Findings

Distance scales as δ^{c* γ^{4/3}/log γ^{-1}} for small γ

Upper bounds hold for both continuum and discrete Gaussian free fields

Results contradict some interpretations of Watabiki's prediction

Abstract

Given a planar continuum Gaussian free field $h^{\mathcal U}$ in a domain $\mathcal U$ with Dirichlet boundary condition and any $\delta>0$, we let $\{h_\delta^{\mathcal U}(v): v\in \mathcal U\}$ be a real-valued smooth Gaussian process where $h_\delta^{\mathcal U}(v)$ is the average of $h^{\mathcal U}$ along a circle of radius $\delta$ with center $v$. For $\gamma > 0$, we study the Liouville first passage percolation (in scale $\delta$), i.e., the shortest path distance in $\mathcal U$ where the weight of each path $P$ is given by $\int_P \mathrm{e}^{\gamma h_\delta^{\mathcal U}(z)} |dz|$. We show that the distance between two typical points is $O(\delta^{c^* \gamma^{4/3}/\log \gamma^{-1}})$ for all sufficiently small but fixed $\gamma>0$ and some constant $c^* > 0$. In addition, we obtain similar upper bounds on the Liouville first passage percolation for discrete Gaussian free fields, as well as the Liouville graph distance which roughly speaking is the minimal number of Euclidean balls with comparable Liouville quantum gravity measure whose union contains a continuous path between two endpoints. Our results contradict with some reasonable interpretations of Watabiki's prediction (1993) on the random distance of Liouville quantum gravity at high temperatures.