Abstract
We study the thermodynamic limit for a classical system of particles on a lattice and prove the existence of infinite volume correlation functions for a “large” set of potentials and temperatures.
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Yang, C. N., andT. D. Lee: Phys. Rev.87, 404 (1952).
Ruelle, D.: Helv. Phys. Acta36, 183 (1963).
Fisher, M. E.: Arch. Rat. Mech. Anal.17, 377 (1964).
Griffiths, R.: J. Math. Phys.5, 1215 (1964).
Dobrushin, R. L.: Teoriya Veroyatnostei i ee Primeneniya9, 626 (1964).
van Hove, L.: Physica15, 951 (1949).
Robinson, D., andD. Ruelle: Commun. math. Phys.5, 288 (1967).
Fisher, M. E.: J. Math. Phys.6, 1643 (1965).
Bourbaki, N.: Topologie générale, fascicule des resultats. §1, 17. Paris: Hermann 1953.
Dunford, N., andJ. Schwartz: Linear operators. V. 9.8. New York: Interscience 1958.
—— —— Linear operators. II.4.7; II.4.9. New York: Interscience 1958.
—— —— Linear operators. III.11.27. New York: Interscience 1958.
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On partial leave from the University of Aix-Marseille.
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Gallavotti, G., Miracle-Sole, S. Statistical mechanics of lattice systems. Commun.Math. Phys. 5, 317–323 (1967). https://doi.org/10.1007/BF01646445
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DOI: https://doi.org/10.1007/BF01646445