Abstract
We construct the time evolution for infinitely many particles in ℝv interacting by the hard-sphere potential
. Because there are abundant examples of hard-sphere configurations with more than one solution to the Newtonian equations of motion, we introduce the concept of aregular solution, in which the growth of velocities and crowding of particles at infinity are limited. We prove that (1) regular solutions exist with probability one in every equilibrium state, and (2) any configuration of the infinite system is the initial point of at most one regular solution. Equilibrium states are invariant under the time-evolution.
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Alexander, R.: The infinite hard-sphere system. Thesis, University of California, Berkeley, 1975
Bourbaki, N.: General topology, Part 2. Paris: Hermann 1966
Gowrisankaran, N. K.: Measurability of functions in product spaces. Proc. Amer. Math. Soc.31, 485–488 (1972)
Lanford, O. E. III: One-dimensional systems of infinitely many Particles I: An existence theorem. Commun. math. Phys.9, 169–181 (1968)
Lanford, O. E., III: One-dimensional systems of infinitely many particles II: Kinetic Theory. Commun. math. Phys.11, 257–292 (1969)
Lanford, O. E., III: Time evolution of large classical systems. In: Dynamical systems, theory and applications. Lecture Notes in Physics, Vol. 38, (ed. J. Moser). Berlin-Heidelberg-New York: Springer 1975
Marchioro, C., Pellegrinotti, A., Presutti, E.: Existence of time evolution forv-dimensional statistical mechanics. Commun. math. Phys.40, 175–186 (1975)
Ruelle, D.: Statistical mechanics. New York: Benjamin 1969
Schwartz, L.: Radon measures on arbitrary topological spaces and cylindrical measures. Oxford University Press, Tata Institute for Fundamental Research, 1973
Sinai, Ya. G.: Construction of the dynamics for one-dimensional systems of statistical mechanics. Teoret. Mat. Fiz.11, 248–258 (1972). English translation: Theoret. Math. Phys. 487–494 (1973)
Sinai, Ya. G.: The construction of cluster dynamics for dynamical systems of statistical mechanics. Vestn. Mosk. Univ. Ser. I: Mat.-Meh.29, 152–159 (1974). English translation: Mosc. Univ. Math. Bull.29, 124–130 (1974)
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Communicated by J. L. Lebowitz
Part of this work forms part of the author's doctoral dissertation written at the University of California, Berkeley, under the direction of O. E. Lanford III
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Alexander, R. Time evolution for infinitely many hard spheres. Commun.Math. Phys. 49, 217–232 (1976). https://doi.org/10.1007/BF01608728
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DOI: https://doi.org/10.1007/BF01608728