Superimposed particles in 1D ground states
Mathematical Physics
2011-07-21 v3 Statistical Mechanics
math.MP
Abstract
For a class of nonnegative, range-1 pair potentials in one dimensional continuous space we prove that any classical ground state of lower density >=1 is a tower-lattice, i.e., a lattice formed by towers of particles the heights of which can differ only by one, and the lattice constant is 1. The potential may be flat or may have a cusp at the origin, it can be continuous, but its derivative has a jump at 1. The result is valid on finite intervals or rings of integer length and on the whole line.
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@article{arxiv.1009.0431,
title = {Superimposed particles in 1D ground states},
author = {Andras Suto},
journal= {arXiv preprint arXiv:1009.0431},
year = {2011}
}
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