Bound on the Excess Charge of Generalized Thomas-Fermi-Weizs\"acker Functionals

Abstract

We bound the number of electrons Q that an atom can bind in excess of neutrality for density functionals generalizing the classical Thomas-Fermi-Weizs\"acker functional: instead of the classical power 5/3 more general powers p are considered. For 3/2<p<2 we prove the excess charge conjecture, i.e., that Q is uniformly bounded in the atomic number Z. The case p=3/2 is critical: the behavior changes from a uniform bound in Z to a linear bound at the critical coupling 4π of the nonlinear term. We also improve the linear bound for all p≥6/5.

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