Exact first-passage exponents of 1D domain growth: relation to a reaction diffusion model

Abstract

In the zero temperature Glauber dynamics of the ferromagnetic Ising or q-state Potts model, the size of domains is known to grow like t1/2. Recent simulations have shown that the fraction r(q,t) of spins which have never flipped up to time t decays like a power law r(q,t) t-θ(q) with a non-trivial dependence of the exponent θ(q) on q and on space dimension. By mapping the problem on an exactly soluble one-species coagulation model (A+A→ A), we obtain the exact expression of θ(q) in dimension one.

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