1D log gases and the renormalized energy: crystallization at vanishing temperature

Article

Sandier, Etienne; Serfaty, Sylvia

Centre National de la Recherche Scientifique (CNRS); CNRS - National Institute for Mathematical Sciences (INSMI); Universite Gustave-Eiffel; Universite Paris-Est-Creteil-Val-de-Marne (UPEC); Institut Universitaire de France; Universite Paris Cite; Centre National de la Recherche Scientifique (CNRS); CNRS - National Institute for Mathematical Sciences (INSMI); Sorbonne Universite; Universite Paris Cite; Centre National de la Recherche Scientifique (CNRS); CNRS - National Institute for Mathematical Sciences (INSMI); New York University

PROBABILITY THEORY AND RELATED FIELDS

0178-8051

10.1007/s00440-014-0585-5

2015

795-846

We study the statistical mechanics of a one-dimensional log gas or -ensemble with general potential and arbitrary , the inverse of temperature, according to the method we introduced for two-dimensional Coulomb gases in Sandier and Serfaty (Ann Probab, 2014). Such ensembles correspond to random matrix models in some particular cases. The formal limit corresponds to weighted Fekete sets and is also treated. We introduce a one-dimensional version of the renormalized energy of Sandier and Serfaty (Commun Math Phys 313(3):635-743, 2012), measuring the total logarithmic interaction of an infinite set of points on the real line in a uniform neutralizing background. We show that this energy is minimized when the points are on a lattice. By a suitable splitting of the Hamiltonian we connect the full statistical mechanics problem to this renormalized energy , and this allows us to obtain new results on the distribution of the points at the microscopic scale: in particular we show that configurations whose is above a certain threshold (which tends to as ) have exponentially small probability. This shows that the configurations have increasing order and crystallize as the temperature goes to zero.

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