Phase transition and uniqueness of levelset percolation

TL;DR

This paper extends classical Boolean percolation by replacing balls with a general attenuation function, analyzing phase transitions and uniqueness of level set percolation in the resulting random field.

Contribution

It introduces a generalized percolation model with unbounded support attenuation functions and establishes conditions for phase transitions and component uniqueness.

Findings

Exact conditions for percolation phase transition in unbounded support cases.

Almost sure continuity of the random potential field.

Uniqueness of the infinite component in two-dimensional cases.

Abstract

The main purpose of this paper is to introduce and establish basic results of a natural extension of the classical Boolean percolation model (also known as the Gilbert disc model). We replace the balls of that model by a positive non-increasing attenuation function $l:(0,\infty) \to (0,\infty)$ to create the random field $\Psi(y)=\sum_{x\in \eta}l(|x-y|),$ where $\eta$ is a homogeneous Poisson process in ${\mathbb R}^d.$ The field $\Psi$ is then a random potential field with infinite range dependencies whenever the support of the function $l$ is unbounded. In particular, we study the level sets $\Psi_{\geq h}(y)$ containing the points $y\in {\mathbb R}^d$ such that $\Psi(y)\geq h.$ In the case where $l$ has unbounded support, we give, for any $d\geq 2,$ exact conditions on $l$ for $\Psi_{\geq h}(y)$ to have a percolative phase transition as a function of $h.$ We also prove that when $l$ is continuous then so is $\Psi$ almost surely. Moreover, in this case and for $d=2,$ we prove uniqueness of the infinite component of $\Psi_{\geq h}$ when such exists, and we also show that the so-called percolation function is continuous below the critical value $h_c$.