# The boundary of the orbital beta process

**Authors:** Theodoros Assiotis, Joseph Najnudel

arXiv: 1905.08684 · 2020-08-21

## TL;DR

This paper determines the boundary of a Markov chain related to $eta$-ensembles for all positive $eta$, providing new proofs for classical cases and convergence results of certain $eta$-ensembles to point processes.

## Contribution

It extends the boundary classification of a Markov chain to all $eta > 0$, offering new proofs and convergence results for $eta$-ensembles.

## Key findings

- Boundary of the Markov chain determined for all $eta > 0$
- New proof of the $eta=2$ case boundary
- Alternative proofs of convergence of Hua-Pickrell and Laguerre $eta$-ensembles

## Abstract

The unitarily invariant probability measures on infinite Hermitian matrices have been classified by Pickrell, and by Olshanski and Vershik. This classification is equivalent to determining the boundary of a certain inhomogeneous Markov chain with given transition probabilities. This formulation of the problem makes sense for general $\beta$-ensembles when one takes as the transition probabilities the Dixon-Anderson conditional probability distribution. In this paper we determine the boundary of this Markov chain for any $\beta \in (0,\infty]$, also giving in this way a new proof of the classical $\beta=2$ case. Finally, as a by-product of our results we obtain alternative proofs of the almost sure convergence of the rescaled Hua-Pickrell and Laguerre $\beta$-ensembles to the general $\beta$ Hua-Pickrell and $\beta$ Bessel point processes respectively.

## Full text

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## References

45 references — full list in the complete paper: https://tomesphere.com/paper/1905.08684/full.md

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Source: https://tomesphere.com/paper/1905.08684