Existence and nonexistence of minimizer for Thomas-Fermi-Dirac-Von Weizs\"acker model on lattice graph

Abstract

The focus of our paper is to investigate the possibility of a minimizer for the Thomas-Fermi-Dirac-von Weizs\"acker model on the lattice graph Z3. The model is described by the following functional: equation* E()=Σy∈Z3(|∇(y)|2+ ((y))103-((y))83)+ Σx,y∈Z3 ~\ y≠ x2(x)2(y)|x-y|, equation* with the additional constraint that Σy∈Z3 2(y)=m is sufficiently small. We also prove the nonexistence of a minimizer provided the mass m is adequately large. Furthermore, we extend our analysis to a subset ⊂ Z3 and prove the nonexistence of a minimizer for the following functional: equation* E()=|∂|+Σx,y∈ ~y≠ x1|x-y|, equation* under the constraint that ||=V is sufficiently large.