The strongly nonlocal Allen-Cahn problem
Abstract
We study the sharp interface limit of the fractional Allen-Cahn equation ∂t u = Isn [u] -1 2s W'(u) in~(0,∞)×Rn, ~n ≥ 2, where >0, Isn=-cn,s(- )s is the fractional Laplacian of order 2s∈(0,1) in Rn, and W is a smooth double-well potential with minima at 0 and 1. We focus on the singular regime s∈(0,12), corresponding to strongly nonlocal diffusion. For suitably prepared initial data, we prove that the solution u converges, as 0, to the minima of W with the interface evolving by fractional mean curvature flow. This establishes the first rigorous convergence result in this regime, complementing and completing previous work for s≥ 12.
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