Crystalline ground states for classical particles
Abstract
Pair interactions whose Fourier transform is nonnegative and vanishes above a wave number K0 are shown to give rise to periodic and aperiodic infinite volume ground state configurations (GSCs) in any dimension d. A typical three dimensional example is an interaction of asymptotic form cos(K0 r)/r4. The result is obtained for densities rho >= rhod where rho1=K0/2pi, rho2=(sqrt3/8)(K0/pi)2 and rho3=(1/8sqrt2)(K0/pi)3. At rhod there is a unique periodic GSC which is the uniform chain, the triangular lattice and the bcc lattice for d=1,2,3, respectively. For rho>rhod the GSC is nonunique and the degeneracy is continuous: Any periodic configuration of density rho with all reciprocal lattice vectors not smaller than K0, and any union of such configurations, is a GSC. The fcc lattice is a GSC only for rho>=(1/6 sqrt3)(K0/pi)3.
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