Abstract
We consider classical systems of particles in Rd interacting by a stable pair potential with finite range. We are engaged in subdividing every particle configuration into clusters of interacting particles and studying the cluster distributions corresponding to equilibrium particle distributions.
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References
Dobrushin, R. L.: Funkts. Anal. Ego Pril.2, 31–43 (1968);
2, 44–57 (1968);
3, 27–35 (1969)
Groeneveld, J.: Estimation methods for Mayer's graphical expansions. In: Harary, F. (Ed.): Graph theory and theoretical physics, pp. 229–259. London: Academic Press 1967
Hill, T. L.: Statistical mechanics. New York: McGraw-Hill 1956
Hunt, G. A.: Martingales et processus de Markov. Paris: Dunod 1966
Lanford, O. E.: Commun. math. Phys.11, 257–292 (1969)
Ruelle, D.: Statistical mechanics. New York: Benjamin 1969
Ruelle, D.: Commun. math. Phys.18, 127–159 (1970)
Sinai, Y. G.: Teor. i Mat. Fiz.11, 248–258 (1972)
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Communicated by G. Gallavotti
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Mürmann, M.G. Equilibrium distributions of physical clusters. Commun.Math. Phys. 45, 233–246 (1975). https://doi.org/10.1007/BF01608330
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DOI: https://doi.org/10.1007/BF01608330