-convergence for higher order nonlocal phase transitions
Abstract
For every 0 < s <3/4, we study the asymptotic behavior of the -rescaled sum of the s-fractional Allen-Cahn energy and the squared L2-norm of its first variation. We prove that the contribution of the first variation vanishes as 0. This implies the Gamma-convergence of the initial sum to either the classical perimeter or to the 2s-fractional perimeter, depending on whether s 1/2 or not. This contradicts the expectation of finding curvature-dependent terms in the limit, as suggested by the regime 3/4 s < 1, and as known to hold in low dimensions in the local case.
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