Convergence for noncommutative rational functions evaluated in random matrices

One of the main applications of free probability is to show that for appropriately chosen independent copies of \(d\) random matrix models, any noncommutative polynomial in these \(d\) variables has a spectral distribution that converges asymptotically and can be described with the help of free prob...

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Veröffentlicht in:arXiv.org
Hauptverfasser: Collins, Benoît, Mai, Tobias, Miyagawa, Akihiro, Parraud, Félix, Yin, Sheng
Format: Paper
Sprache:Englisch
Veröffentlicht: Ithaca Cornell University Library, arXiv.org 15.11.2022
Schlagworte:
Approximation
Convergence
Polynomials
Rational functions
ISSN:2331-8422
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Zusammenfassung:One of the main applications of free probability is to show that for appropriately chosen independent copies of \(d\) random matrix models, any noncommutative polynomial in these \(d\) variables has a spectral distribution that converges asymptotically and can be described with the help of free probability. This paper aims to show that this can be extended to noncommutative rational functions, answering an open question by Roland Speicher. This paper also provides a noncommutative probability approach to approximating the free field. At the algebraic level, its construction relies on the approximation by generic matrices. On the other hand, it admits many embeddings in the algebra of operators affiliated with a \(II_1\) factor. A consequence of our result is that, as soon as the generators admit a random matrix model, the approximation of any self-adjoint noncommutative rational function by generic matrices can be upgraded at the level of convergence in distribution.
Bibliographie:SourceType-Working Papers-1
ObjectType-Working Paper/Pre-Print-1
content type line 50
ISSN:2331-8422
DOI:10.48550/arxiv.2103.05962