Convergence of nonlocal threshold dynamics approximations to front propagation
Abstract
In this note we prove that appropriately scaled threshold dynamics-type algorithms corresponding to the fractional Laplacian of order α ∈ (0,2) converge to moving fronts. When α ≥q 1 the resulting interface moves by weighted mean curvature, while for α <1 the normal velocity is nonlocal of ``fractional-type.'' The results easily extend to general nonlocal anisotropic threshold dynamics schemes.
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