Long-range phase coexistence models with degenerate potentials
Abstract
This survey offers an overview of recent advances in nonlocal phase transition problems, modeled by Ginzburg--Landau type energies of the form \[ 142n (n )2 |u(x)-u(y)|2|x-y|n+2s\,dx\,dy \;+\; ∫ W(u(x))\,dx. \] Here,~W is a smooth and possibly degenerate double well potential, with a polynomial control on its second derivatives near the wells. The emphasis is on qualitative properties of minimizers and critical points of the energy functional.
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