Superconcentration for minimal surfaces in first passage percolation and disordered Ising ferromagnets

Abstract

We consider the standard first passage percolation model on Z d with a distribution G taking two values 0<a<b. We study the maximal flow through the cylinder [0,n] d-1× [0,hn] between its top and bottom as well as its associated minimal surface(s). We prove that the variance of the maximal flow is superconcentrated, i.e. in O( nd-1 n), for h≥ h0 (for a large enough constant h0=h0(a,b)). Equivalently, we obtain that the ground state energy of a disordered Ising ferromagnet in a cylinder [0,n] d-1× [0,hn] is superconcentrated when opposite boundary conditions are applied at the top and bottom faces and for a large enough constant h≥ h0 (which depends on the law of the coupling constants). Our proof is inspired by the proof of Benjamini--Kalai--Schramm. Yet, one major difficulty in this setting is to control the influence of the edges since the averaging trick used in the proof of Benjamini--Kalai--Schramm fails for surfaces. Of independent interest, we prove that minimal surfaces (in the present discrete setting) cannot have long thin chimneys.