Heteroclinic connections for fractional Allen-Cahn equations with degenerate potentials
Abstract
We investigate existence, uniqueness and asymptotic behavior of minimizers of a family of non-local energy functionals of the type 14R2n (Rn )2|u(x)-u(y)|2 K(x-y) \,dx dy + ∫ W(u(x)) \,dx. Here, W is a possibly degenerate double well potential with a polynomial control on its second derivative near the wells. Also, K belongs to a wide class of measurable kernels and is modeled on that of the fractional Laplacian.
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