Abstract
We consider planar Coulomb systems consisting of a large number n of repelling point charges in the low temperature regime, where the inverse temperature β grows at least logarithmically in n as n ! 1, i.e., β ≳ log n. Under suitable conditions on an external potential, we prove results to the effect that the gas is with high probability uniformly separated and equidistributed with respect to the corresponding equilibrium measure (in the given external field). Our results generalize earlier results about Fekete configurations, i.e., the case β D 1. There are also several auxiliary results which could be of independent interest. For example, our method of proof of equidistribution (a variant of “Landau’s method”) works for general families of configurations which are uniformly separated and which satisfy certain sampling and interpolation inequalities.
Original language | English |
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Pages (from-to) | 611-648 |
Number of pages | 38 |
Journal | Revista Matematica Iberoamericana |
Volume | 39 |
Issue number | 2 |
DOIs | |
Publication status | Published - 2023 |
Austrian Fields of Science 2012
- 101024 Probability theory
Keywords
- math.PR
- math-ph
- math.CV
- math.MP
- 60K35, 82B26, 94A20, 31C20
- Planar Coulomb gas
- freezing
- separation
- external potential
- low temperature
- equidistribution
- Fekete configuration