English

Renormalized energy concentration in random matrices

Probability 2015-06-03 v3 Mathematical Physics math.MP

Abstract

We define a "renormalized energy" as an explicit functional on arbitrary point configurations of constant average density in the plane and on the real line. The definition is inspired by ideas of [SS1,SS3]. Roughly speaking, it is obtained by subtracting two leading terms from the Coulomb potential on a growing number of charges. The functional is expected to be a good measure of disorder of a configuration of points. We give certain formulas for its expectation for general stationary random point processes. For the random matrix β\beta-sine processes on the real line (beta=1,2,4), and Ginibre point process and zeros of Gaussian analytic functions process in the plane, we compute the expectation explicitly. Moreover, we prove that for these processes the variance of the renormalized energy vanishes, which shows concentration near the expected value. We also prove that the beta=2 sine process minimizes the renormalized energy in the class of determinantal point processes with translation invariant correlation kernels.

Keywords

Cite

@article{arxiv.1201.2853,
  title  = {Renormalized energy concentration in random matrices},
  author = {Alexei Borodin and Sylvia Serfaty},
  journal= {arXiv preprint arXiv:1201.2853},
  year   = {2015}
}

Comments

last version, to appear in Communications in Mathematical Physics

R2 v1 2026-06-21T20:04:17.974Z