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On the configuration of systems of interacting particle with minimum potential energy per particle

โœ Scribed by W.J. Ventevogel; B.R.A. Nijboer

Publisher
Elsevier Science
Year
1979
Tongue
English
Weight
636 KB
Volume
98
Category
Article
ISSN
0378-4371

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โœฆ Synopsis

In continuation of previous work we extend the class of two-body potentials, either repulsive or of generalized LennardJones type, for which it can be proved that among all configurations of an infinite one-dimensional system of interacting particles (with fixed density in the case of repulsive interaction) the configuration where all particles are equidistant has the minimum potential energy per particle. It is shown that this property does not hold for the repulsive potential 4(x) = (1 +x4)-'.

For infinite systems in n-dimensions it is stated that a necessary condition for an analogous property is that the Fourier transform 4(k) of the potential be non-negative for all k. The proof of this statement will be given in a subsequent publication.

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