---
_id: '59188'
author:
- first_name: Jonas
  full_name: Jalowy, Jonas
  id: '113768'
  last_name: Jalowy
  orcid: 0000-0001-9624-2685
- first_name: Zakhar
  full_name: Kabluchko, Zakhar
  last_name: Kabluchko
- first_name: Matthias
  full_name: Löwe, Matthias
  last_name: Löwe
- first_name: Alexander
  full_name: Marynych, Alexander
  last_name: Marynych
citation:
  ama: Jalowy J, Kabluchko Z, Löwe M, Marynych A. When does the chaos in the Curie-Weiss
    model stop to propagate? <i>Electronic Journal of Probability</i>. 2023;28(none).
    doi:<a href="https://doi.org/10.1214/23-ejp1039">10.1214/23-ejp1039</a>
  apa: Jalowy, J., Kabluchko, Z., Löwe, M., &#38; Marynych, A. (2023). When does the
    chaos in the Curie-Weiss model stop to propagate? <i>Electronic Journal of Probability</i>,
    <i>28</i>(none). <a href="https://doi.org/10.1214/23-ejp1039">https://doi.org/10.1214/23-ejp1039</a>
  bibtex: '@article{Jalowy_Kabluchko_Löwe_Marynych_2023, title={When does the chaos
    in the Curie-Weiss model stop to propagate?}, volume={28}, DOI={<a href="https://doi.org/10.1214/23-ejp1039">10.1214/23-ejp1039</a>},
    number={none}, journal={Electronic Journal of Probability}, publisher={Institute
    of Mathematical Statistics}, author={Jalowy, Jonas and Kabluchko, Zakhar and Löwe,
    Matthias and Marynych, Alexander}, year={2023} }'
  chicago: Jalowy, Jonas, Zakhar Kabluchko, Matthias Löwe, and Alexander Marynych.
    “When Does the Chaos in the Curie-Weiss Model Stop to Propagate?” <i>Electronic
    Journal of Probability</i> 28, no. none (2023). <a href="https://doi.org/10.1214/23-ejp1039">https://doi.org/10.1214/23-ejp1039</a>.
  ieee: 'J. Jalowy, Z. Kabluchko, M. Löwe, and A. Marynych, “When does the chaos in
    the Curie-Weiss model stop to propagate?,” <i>Electronic Journal of Probability</i>,
    vol. 28, no. none, 2023, doi: <a href="https://doi.org/10.1214/23-ejp1039">10.1214/23-ejp1039</a>.'
  mla: Jalowy, Jonas, et al. “When Does the Chaos in the Curie-Weiss Model Stop to
    Propagate?” <i>Electronic Journal of Probability</i>, vol. 28, no. none, Institute
    of Mathematical Statistics, 2023, doi:<a href="https://doi.org/10.1214/23-ejp1039">10.1214/23-ejp1039</a>.
  short: J. Jalowy, Z. Kabluchko, M. Löwe, A. Marynych, Electronic Journal of Probability
    28 (2023).
date_created: 2025-03-31T07:15:02Z
date_updated: 2025-04-23T14:36:13Z
doi: 10.1214/23-ejp1039
intvolume: '        28'
issue: none
language:
- iso: eng
publication: Electronic Journal of Probability
publication_identifier:
  issn:
  - 1083-6489
publication_status: published
publisher: Institute of Mathematical Statistics
status: public
title: When does the chaos in the Curie-Weiss model stop to propagate?
type: journal_article
user_id: '113768'
volume: 28
year: '2023'
...
---
_id: '59185'
author:
- first_name: Jonas
  full_name: Jalowy, Jonas
  id: '113768'
  last_name: Jalowy
  orcid: 0000-0001-9624-2685
citation:
  ama: Jalowy J. Rate of convergence for products of independent non-Hermitian random
    matrices. <i>Electronic Journal of Probability</i>. 2021;26(none). doi:<a href="https://doi.org/10.1214/21-ejp625">10.1214/21-ejp625</a>
  apa: Jalowy, J. (2021). Rate of convergence for products of independent non-Hermitian
    random matrices. <i>Electronic Journal of Probability</i>, <i>26</i>(none). <a
    href="https://doi.org/10.1214/21-ejp625">https://doi.org/10.1214/21-ejp625</a>
  bibtex: '@article{Jalowy_2021, title={Rate of convergence for products of independent
    non-Hermitian random matrices}, volume={26}, DOI={<a href="https://doi.org/10.1214/21-ejp625">10.1214/21-ejp625</a>},
    number={none}, journal={Electronic Journal of Probability}, publisher={Institute
    of Mathematical Statistics}, author={Jalowy, Jonas}, year={2021} }'
  chicago: Jalowy, Jonas. “Rate of Convergence for Products of Independent Non-Hermitian
    Random Matrices.” <i>Electronic Journal of Probability</i> 26, no. none (2021).
    <a href="https://doi.org/10.1214/21-ejp625">https://doi.org/10.1214/21-ejp625</a>.
  ieee: 'J. Jalowy, “Rate of convergence for products of independent non-Hermitian
    random matrices,” <i>Electronic Journal of Probability</i>, vol. 26, no. none,
    2021, doi: <a href="https://doi.org/10.1214/21-ejp625">10.1214/21-ejp625</a>.'
  mla: Jalowy, Jonas. “Rate of Convergence for Products of Independent Non-Hermitian
    Random Matrices.” <i>Electronic Journal of Probability</i>, vol. 26, no. none,
    Institute of Mathematical Statistics, 2021, doi:<a href="https://doi.org/10.1214/21-ejp625">10.1214/21-ejp625</a>.
  short: J. Jalowy, Electronic Journal of Probability 26 (2021).
date_created: 2025-03-31T07:13:44Z
date_updated: 2025-04-23T14:38:37Z
doi: 10.1214/21-ejp625
intvolume: '        26'
issue: none
language:
- iso: eng
publication: Electronic Journal of Probability
publication_identifier:
  issn:
  - 1083-6489
publication_status: published
publisher: Institute of Mathematical Statistics
status: public
title: Rate of convergence for products of independent non-Hermitian random matrices
type: journal_article
user_id: '113768'
volume: 26
year: '2021'
...