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High-low temperature dualities for the classical $\beta$-ensembles

Mathematical Physics 2023-04-21 v2 math.MP

Abstract

The loop equations for the β\beta-ensembles are conventionally solved in terms of a 1/N1/N expansion. We observe that it is also possible to fix NN and expand in inverse powers of β\beta. At leading order, for the one-point function W1(x)W_1(x) corresponding to the average of the linear statistic A=j=1N1/(xλj)A = \sum_{j=1}^N 1/(x - \lambda_j), and specialising the classical weights, this reclaims well known results of Stieltjes relating the zeros of the classical polynomials to the minimum energy configuration of certain log-gas potential energies. Moreover, it is observed that the differential equations satisfied by W1(x)W_1(x) in the case of classical weights -- which are particular Riccati equations -- are simply related to the differential equations satisfied by W1(x)W_1(x) in the high temperature scaled limit β=2α/N\beta = 2\alpha/N (α\alpha fixed, NN \to \infty), implying a certain high-low temperature duality. A generalisation of this duality, valid without any limiting procedure, is shown to hold for W1(x)W_1(x) and all its higher point analogues in the classical β\beta-ensembles.

Keywords

Cite

@article{arxiv.2103.11250,
  title  = {High-low temperature dualities for the classical $\beta$-ensembles},
  author = {Peter J. Forrester},
  journal= {arXiv preprint arXiv:2103.11250},
  year   = {2023}
}

Comments

19 pages

R2 v1 2026-06-24T00:23:10.876Z