The scaling limit for zero temperature planar Ising droplets: with and without magnetic fields

Abstract

We consider the continuous time, zero-temperature heat-bath dynamics for the nearest-neighbor Ising model on Z2 with positive magnetic field. For a system of size L∈ N, we start with initial condition σ such that σx=-1 if x∈[-L,L]2 and σx=+1 and investigate the scaling limit of the set of - spins when both time and space are rescaled by L. We compare the obtained result and its proof with the case of zero-magnetic fields, for which a scaling result was proved in arXiv:1112.3160. In that case, the time-scaling is diffusive and the scaling limit is given by anisotropic motion by curvature.