Multiscale homogenization of non-local energies of convolution-type

Abstract

We analyze a family of non-local integral functionals of convolution-type depending on two small positive parameters ,δ: the first rules the length-scale of the non-local interactions and produces a `localization' effect as it tends to 0, the second is the scale of oscillation of a finely inhomogeneous periodic structure in the domain. We prove that a separation of the two scales occurs and that the interplay between the localization and homogenization effects in the asymptotic analysis is determined by the parameter λ defined as the limit of the ratio /δ. We compute the -limit of the functionals with respect to the strong Lp-topology for each possible value of λ and detect three different regimes, the critical scale being obtained when λ∈(0,+∞).

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