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Probabilistic aspects of critical growth-fragmentation equations

Bertoin, Jean; Watson, Alexander R (2016). Probabilistic aspects of critical growth-fragmentation equations. Advances in Applied Probability, 48(A):37-61.

Abstract

The self-similar growth-fragmentation equation describes the evolution of a medium in which particles grow and divide as time proceeds, with the growth and splitting of each particle depending only upon its size. The critical case of the equation, in which the growth and division rates balance one another, was considered in Doumic and Escobedo (2015) for the homogeneous case where the rates do not depend on the particle size. Here, we study the general self-similar case, using a probabilistic approach based on Lévy processes and positive self-similar Markov processes which also permits us to analyse quite general splitting rates. Whereas existence and uniqueness of the solution are rather easy to establish in the homogeneous case, the equation in the nonhomogeneous case has some surprising features. In particular, using the fact that certain self-similar Markov processes can enter (0,∞) continuously from either 0 or ∞, we exhibit unexpected spontaneous generation of mass in the solutions.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:07 Faculty of Science > Institute of Mathematics
Dewey Decimal Classification:340 Law
610 Medicine & health
510 Mathematics
Uncontrolled Keywords:Applied Mathematics, Statistics and Probability
Language:English
Date:1 July 2016
Deposited On:30 Sep 2021 08:44
Last Modified:25 Jan 2025 02:41
Publisher:Cambridge University Press
ISSN:0001-8678
OA Status:Closed
Publisher DOI:https://doi.org/10.1017/apr.2016.41
Other Identification Number:Pre-Print Version auf arXiv.com: 10.48550/arXiv.1506.09187 (DOI)

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