Matsumoto-Yor and Dufresne type theorems for a random walk on positive definite matrices

Arista, Jonas; Bisi, Elia; O’Connell, Neil

doi:10.1214/22-AIHP1338

DC Field

Value

Language

dc.contributor.author

Arista, Jonas

dc.contributor.author

Bisi, Elia

dc.contributor.author

O’Connell, Neil

dc.date.accessioned

2024-12-09T13:19:27Z

dc.date.available

2024-12-09T13:19:27Z

dc.date.issued

2024-05-01

dc.identifier.citation

<div class="csl-bib-body"> <div class="csl-entry">Arista, J., Bisi, E., & O’Connell, N. (2024). Matsumoto-Yor and Dufresne type theorems for a random walk on positive definite matrices. <i>ANNALES DE L INSTITUT HENRI POINCARE-PROBABILITES ET STATISTIQUES</i>, <i>60</i>(2), 923–945. https://doi.org/10.1214/22-AIHP1338</div> </div>

dc.identifier.issn

0246-0203

dc.identifier.uri

http://hdl.handle.net/20.500.12708/205452

dc.description.abstract

We establish analogues of the geometric Pitman 2M - X theorem of Matsumoto and Yor and of the classical Dufresne identity, for a multiplicative random walk on positive definite matrices with Beta type II distributed increments. The Dufresne type identity provides another example of a stochastic matrix recursion, as considered by Chamayou and Letac (J. Theoret. Probab. 12, 1999), that admits an explicit solution.

dc.language.iso

dc.publisher

INST MATHEMATICAL STATISTICS-IMS

dc.relation.ispartof

ANNALES DE L INSTITUT HENRI POINCARE-PROBABILITES ET STATISTIQUES

dc.subject

Intertwining relations

dc.subject

Lyapunov exponents

dc.subject

Matrix Dufresne identity

dc.subject

Matrix Matsumoto-Yor theorem

dc.subject

Matrix variate distributions

dc.subject

Stochastic matrix recursions and equations

dc.subject

Wishart and Beta distributions

dc.title

Matsumoto-Yor and Dufresne type theorems for a random walk on positive definite matrices

dc.type

Article

dc.type

Artikel

dc.identifier.scopus

2-s2.0-85196256575

dc.identifier.url

https://api.elsevier.com/content/abstract/scopus_id/85196256575

dc.contributor.affiliation

Bielefeld University, Germany

dc.contributor.affiliation

University College Dublin, Ireland

dc.description.startpage

923

dc.description.endpage

945

dc.type.category

Original Research Article

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true

tuw.peerreviewed

true

wb.publication.intCoWork

International Co-publication

tuw.researchTopic.id

tuw.researchTopic.name

Fundamental Mathematics Research

tuw.researchTopic.value

100

dcterms.isPartOf.title

ANNALES DE L INSTITUT HENRI POINCARE-PROBABILITES ET STATISTIQUES

tuw.publication.orgunit

E105-07 - Forschungsbereich Wahrscheinlichkeitstheorie

tuw.publisher.doi

10.1214/22-AIHP1338

dc.identifier.eissn

1778-7017

dc.description.numberOfPages

tuw.author.orcid

0000-0001-5790-3372

tuw.author.orcid

0000-0001-7628-8766

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true

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Mathematik

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1010

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100

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research article

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Publications

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restricted

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http://purl.org/coar/resource_type/c_2df8fbb1

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no Fulltext

crisitem.author.dept

Bielefeld University

crisitem.author.dept

E105-07 - Forschungsbereich Wahrscheinlichkeitstheorie

crisitem.author.dept

University College Dublin

crisitem.author.orcid

0000-0001-5790-3372

crisitem.author.orcid

0000-0001-7628-8766

crisitem.author.parentorg

E105 - Institut für Stochastik und Wirtschaftsmathematik

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