Berezin density and planar orthogonal polynomials
Abstract
We introduce a nonlinear potential theory problem for the Laplacian, the solution of which characterizes the Berezin density for the polynomial Bergman space, where the point is fixed. When , the Berezin density is expressed in terms of the squared modulus of the corresponding normalized orthogonal polynomial . We use an approximate version of this characterization to study the asymptotics of the orthogonal polynomials in the context of exponentially varying weights. This builds on earlier works by Its-Takhtajan and by the first author on a soft Riemann-Hilbert problem for planar orthogonal polynomials, where in place of the Laplacian we have the -operator. We adapt the soft Riemann-Hilbert approach to the nonlinear potential problem, where the nonlinearity is due to the appearance of in place of . Moreover, we suggest how to adapt the potential theory method to the study of the asymptotics of more general Berezin densities in the off-spectral regime, that is, when is fixed outside the droplet. This is a first installment in a program to obtain an explicit global expansion formula for the polynomial Bergman kernel, and, in particular, of the one-point function of the associated random normal matrix ensemble.
Cite
@article{arxiv.2203.02254,
title = {Berezin density and planar orthogonal polynomials},
author = {Haakan Hedenmalm and Aron Wennman},
journal= {arXiv preprint arXiv:2203.02254},
year = {2026}
}
Comments
39 pages. V2: Updated title, added section on the Berezin potential and its connection to Ward identities. To appear in Trans. Amer. Math. Soc