-convergence for nonlocal phase transitions

Abstract

We discuss the -convergence, under the appropriate scaling, of the energy functional \|u\|Hs()2+∫ W(u)dx, with s ∈ (0,1), where \|u\|Hs() denotes the total contribution from in the Hs norm of u, and W is a double-well potential. When s∈ [1/2,\,1), we show that the energy -converges to the classical minimal surface functional -- while, when s∈(0,\,1/2), it is easy to see that the functional -converges to the nonlocal minimal surface functional.