Gamma-Convergence of Higher-Order Phase Transition Models
Abstract
We investigate the asymptotic behavior as 0 of singularly perturbed phase transition models of order n ≥ 2, given by align Gλ,n[u] := ∫I 1 W(u) -λ2n-3 (u(n-1))2 + 2n-1 (u(n))2 \ dx, u ∈ Wn,2(I), align where λ >0 is fixed, I ⊂ R is an open bounded interval, and W ∈ C0(R) is a suitable double-well potential. We find that there exists a positive critical parameter depending on W and n, such that the -limit of Gλ,n with respect to the L1-topology is given by a sharp interface functional in the subcritical regime. The cornerstone for the corresponding compactness property is a novel nonlinear interpolation inequality involving higher-order derivatives, which is based on Gagliardo-Nirenberg type inequalities.
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