The disordered lattice free field pinning model approaching criticality

TL;DR

This paper analyzes the critical behavior of a disordered lattice free field near the pinning transition, providing precise asymptotics for free energy and field trajectories as the system approaches criticality.

Contribution

It derives the exact quadratic scaling of the free energy near the critical point and characterizes the field's spatial behavior in the critical regime.

Findings

The free energy scales quadratically near criticality.

The field's absolute value behaves like the square root of the log distance from criticality.

Precise description of the field's spatial trajectories at criticality.

Abstract

We continue the study, initiated in [Giacomin and Lacoin, JEMS 2018], of the localization transition of a lattice free field $\phi=(\phi(x))_{x \in Z^d}$, $d\ge 3$, in presence of a quenched disordered substrate. The presence of the substrate affects the interface at the spatial sites in which the interface height is close to zero. This corresponds to the Hamiltonian $$ \sum_{x\in Z^d }(\beta \omega_x+h)\delta_x,$$ where $\delta_x=1_{[-1,1]}(\phi(x))$, and $(\omega_x)_{x\in Z^d}$ is an IID centered field. A transition takes place when the average pinning potential $h$ goes past a threshold $h_c(\beta)$: from a delocalized phase $h<h_c(\beta)$, where the field is macroscopically repelled by the substrate, to a localized one $h>h_c(\beta)$ where the field sticks to the substrate. In [Giacomin and Lacoin, JEMS 2018] the critical value of $h$ is identified and it coincides, up to the sign, with the $\log$-Laplace transform of $\omega=\omega_x$, that is $-h_c(\beta)=\lambda(\beta):=\log E[e^{\beta\omega}]$. Here we obtain the sharp critical behavior of the free energy approaching criticality: $$\lim_{u\searrow 0} \frac{ F(\beta,h_c(\beta)+u)}{u^2}= \frac{1}{2\, \textrm{Var}\left(e^{\beta \omega-\lambda(\beta)}\right)}.$$ Moreover, we give a precise description of the trajectories of the field in the same regime: the absolute value of the field is $\sqrt{2\sigma_d^2\vert\log(h-h_c(\beta))\vert}$ to leading order when $h\searrow h_c(\beta)$ except on a vanishing fraction of sites ($\sigma_d^2$ is the single site variance of the free field).