Long-Range Energy-Level Interaction in Small Metallic Particles
Abstract
We consider the energy level statistics of non-interacting electrons which diffuse in a d -dimensional disordered metallic conductor of characteristic Thouless energy Ec. We assume that the level distribution can be written as the Gibbs distribution of a classical one-dimensional gas of fictitious particles with a pairwise additive interaction potential f( ). We show that the interaction which is consistent with the known correlation function of pairs of energy levels is a logarithmic repulsion for level separations <Ec, in agreement with Random Matrix Theory. When >Ec, f( ) vanishes as a power law in /Ec with exponents -1 2,-2, and -3 2 for d=1,2, and 3, respectively. While for d=1,2 the energy-level interaction is always repulsive, in three dimensions there is long-range level attraction after the short-range logarithmic repulsion.
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