Hua-Pickrell diffusions and differential equations related with pseudo-Jacobi polynomials
Abstract
Following Assiotis (2020), we study general -Hua-Pickrell diffusions of particles on as solutions of the stochastic differential equations (SDEs) with . These processes form a subclass of the Pearson diffusions which are defined as solutions of algebraic SDEs where the moments of the empirical distributions can be computed inductively. This Pearson class also contains other well known diffusions like Dyson Brownian motions, and multivariate Laguerre and Jacobi processes After the time normalization , the SDEs above degenerate in the frozen case for into ordinary differential equations which are related to pseudo-Jacobi polynomials. For and under suitable initial conditions, the empirical distributions converge weakly almost surely for to some limit which is independent from . For , we describe the limit explicitly via free convolutions. Moreover, if for some , the solutions of our SDEs converge for to stationary distributions, which are Hua-Pickrell (or Cauchy) measures. We thus obtain connections between known results for the empirical distributions of these ensembles and the zeros of the pseudo-Jacobi polynomials. Furthermore, we derive a freezing central limit theorem for for the Hua-Pickrell ensembles which is related to these zeros.
Cite
@article{arxiv.2602.14719,
title = {Hua-Pickrell diffusions and differential equations related with pseudo-Jacobi polynomials},
author = {Martin Auer and Michael Voit},
journal= {arXiv preprint arXiv:2602.14719},
year = {2026}
}