Zero-temperature Glauber dynamics on Zd

Abstract

We study zero-temperature Glauber dynamics on d, which is a dynamic version of the Ising model of ferromagnetism. Spins are initially chosen according to a Bernoulli distribution with density p, and then the states are continuously (and randomly) updated according to the majority rule. This corresponds to the sudden quenching of a ferromagnetic system at high temperature with an external field, to one at zero temperature with no external field. Define pc(d) to be the infimum over p such that the system fixates at '+' with probability 1. It is a folklore conjecture that pc(d) = 1/2 for every 2 d ∈ . We prove that pc(d) 1/2 as d ∞.