Compactness by coarse-graining in long-range lattice systems

Abstract

We consider energies on a periodic set L of Rd of the form Σi,j∈ L aij|ui-uj|, defined on spin functions ui∈\0,1\, and we suppose that the typical range of the interactions is R with R +∞, i.e., if \|i-j\| R then aij c>0. In a discrete-to-continuum analysis, we prove that the overall behaviour as 0 of such functionals is that of an interfacial energy. The proof is performed using a coarse-graining procedure which associates to scaled functions defined on L with equibounded energy a family of sets with equibounded perimeter. This agrees with the case of equibounded R and can be seen as an extension of coerciveness result for short-range interactions, but is different from that of other long-range interaction energies, whose limit exits the class of surface energies. A computation of the limit energy is performed in the case L= Zd.