Mean field theory for a general class of short-range interaction functionals

Abstract

In models of N interacting particles in d as in Density Functional Theory or crowd motion, the repulsive cost is usually described by a two-point function c(x,y) =(|x-y|) where : + [0,∞] is decreasing to zero at infinity and parameter >0 scales the interaction distance. In this paper we identify the mean-field energy of such a model in the short-range regime 1 under the sole assumption that ∃ r0>0 \ : \ ∫r0∞ (r) rd-1\, dr <+∞. This extends recent results hardin2021, HardSerfLebl, Lewin obtained in the homogeneous case (r) = r-s where s>d.

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