Crystallization in the Winterbottom shape and sharp fluctuation laws

Abstract

We address finite crystallization in two dimensions in the presence of a flat crystalline substrate. Particles interact through short-range two- and three-body potentials favoring local square-lattice arrangements. An additional interaction term of relative strength β>0 couples the particles and the substrate. Our first main result proves crystallization for all β>0, corresponding to the onset of discrete Winterbottom configurations. The proof relies on a stratification technique from [31], characterizing the topology of the bond graph of minimizing configurations. Our second main result concerns fluctuations estimates for β∈ (0,1). We obtain bounds on the distance between distinct minimizers with the same number N of particles, showing a sharp scaling law N3/4 when β is rational, and N1/3 when β is irrational and algebraic. This reveals a genuine substrate-driven effect on fluctuation laws. As a corollary, we derive a discrete-to-continuum convergence of minimizers towards the Winterbottom equilibrium shape in the large-particle limit.