From bcc to fcc: interplay between oscillating long-range and repulsive short-range forces
Abstract
This paper supplements and partly extends an earlier publication, Phys. Rev. Lett. 95, 265501 (2005). In d-dimensional continuous space we describe the infinite volume ground state configurations (GSCs) of pair interactions and +, where is the inverse Fourier transform of a nonnegative function vanishing outside the sphere of radius K0, and is any nonnegative finite-range interaction of range r0≤γd/K0, where γ3=6π. In three dimensions the decay of can be as slow as r-2, and an interaction of asymptotic form (K0r+π/2)/r3 is among the examples. At a dimension-dependent density d the ground state of is a unique Bravais lattice, and for higher densities it is continuously degenerate: any union of Bravais lattices whose reciprocal lattice vectors are not shorter than K0 is a GSC. Adding decreases the ground state degeneracy which, nonetheless, remains continuous in the open interval (d,d'), where d' is the close-packing density of hard balls of diameter r0. The ground state is unique at both ends of the interval. In three dimensions this unique GSC is the bcc lattice at 3 and the fcc lattice at 3'=2/r03.
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