Infinite-dimensional $q$-Jacobi Markov processes
Abstract
The classical Jacobi polynomials on the interval are eigenfunctions of a second order differential operator. It is well known that this operator generates a diffusion process on . Further, this fact admits an extension to dimensions (Demni (2010), Remling-R\"osler (2011)) leading to a -parameter family of diffusion processes on the space of -particle configurations in . The generators of the processes are related to Heckman-Opdam's Jacobi polynomials attached to the root system . The first result of the paper shows that the processes have a -analog, the -dimensional -Jacobi processes. These are Feller Markov processes related to the -variate symmetric big -Jacobi polynomials. The later polynomials were introduced and studied by Stokman (1997) and Stokman-Koornwinder (1997); they depend on two Macdonald parameters and extra continuous parameters. The -dimensional -Jacobi processes are still defined on a space of -particle configurations, only now the particles live not on but on certain one-dimensional -grids. The second result (the main one) asserts that the -dimensional -Jacobi processes survive a limit transition as goes to infinity and two of the extra parameters vary together with in a certain way. In the limit, one obtains a family of Feller Markov processes which are infinite-dimensional in the sense that they live on configurations with infinitely many particles. The proof uses a lifting of the multivariate big -Jacobi polynomials to the algebra of symmetric functions -- a construction that does not hold for the Heckman-Opdam's Jacobi polynomials. Note also that the large- limit transition is carried out without any space scaling, which would be impossible in the continuous case.
Keywords
Cite
@article{arxiv.2502.20813,
title = {Infinite-dimensional $q$-Jacobi Markov processes},
author = {Grigori Olshanski},
journal= {arXiv preprint arXiv:2502.20813},
year = {2025}
}
Comments
34 pp