Baur, Erich; Bertoin, Jean (2021). On a Two-Parameter Yule-Simon Distribution In: A Lifetime of Excursions Through Random Walks and Lévy Processes. Progress in Probability: Vol. 1 (pp. 59-82). Cham, Switzerland: Springer https://doi.org/10.1007/978-3-030-83309-1
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We extend the classical one-parameter Yule-Simon law to a version depending on two parameters, which in part appeared in Bertoin (J Stat Phys 176(3):679–691, 2019) in the context of a preferential attachment algorithm with fading memory. By making the link to a general branching process with age- dependent reproduction rate, we study the tail-asymptotic behavior of the two- parameter Yule-Simon law, as it was already initiated in Bertoin (J Stat Phys 176(3):679–691, 2019). Finally, by superposing mutations to the branching process, we propose a model which leads to the two-parameter range of the Yule-Simon law, generalizing thereby the work of Simon (Biometrika 42(3/4):425–440, 1955) on limiting word frequencies.
Item Type: |
Book Section (Book Chapter) |
|---|---|
Division/Institute: |
School of Engineering and Computer Science > Institut für Optimierung und Datenanalyse IODA |
Name: |
Baur, Erich and Bertoin, Jean |
Subjects: |
Q Science > QA Mathematics |
ISSN: |
1050-6977 |
ISBN: |
978-3-030-83308-4 |
Series: |
Progress in Probability |
Publisher: |
Springer |
Language: |
English |
Submitter: |
Erich Baur |
Date Deposited: |
14 Jan 2022 11:13 |
Last Modified: |
14 Jan 2022 11:13 |
Publisher DOI: |
https://doi.org/10.1007/978-3-030-83309-1 |
Uncontrolled Keywords: |
Fluctuation Theory, Lévy Processes, Random Walks, Ron Doney, Probability, Diffusions |
ARBOR DOI: |
10.24451/arbor.16422 |
URI: |
https://arbor.bfh.ch/id/eprint/16422 |
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