Singular perturbations models in phase transitions for anisotropic higher-order materials

Abstract

We discuss a model for phase transitions in which a double-well potential is singularly perturbed by possibly several terms involving different, arbitrarily high orders of derivation. We study by -convergence the asymptotic behaviour as 0 of the functionals equation* F(u):=∫ [1W(u)+Σ=1kq2-1|∇()u|2]\,dx, u∈ Hk(), equation* for fixed k>1 integer, addressing also to the case in which the coefficients q1,...,qk-1 are negative and |·| is any norm on the space of symmetric -tensors for each ∈\1,...,k\. The negativity of the coefficients leads to the lack of a priori bounds on the functionals; such issue is overcome by proving a nonlinear interpolation inequality. With this inequality at our disposal, a compactness result is achieved by resorting to the recent paper [10]. A further difficulty is the presence of general tensor norms which carry anisotropies, making standard slicing arguments not suitable. We prove that the -limit is finite only on sharp interfaces and that it equals an anisotropic perimeter, with a surface energy density described by a cell formula.

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