Asymptotic Laws for Nonconservative Self-similar Fragmentations
Open Access
- 1 January 2004
- journal article
- Published by Institute of Mathematical Statistics in Electronic Journal of Probability
- Vol. 9 (none)
- https://doi.org/10.1214/ejp.v9-215
Abstract
We consider a self-similar fragmentation process in which the generic particle of size $x$ is replaced at probability rate $x^\alpha$, by its offspring made of smaller particles, where $\alpha$ is some positive parameter. The total of offspring sizes may be both larger or smaller than $x$ with positive probability. We show that under certain conditions the typical size in the ensemble is of the order $t^{-1/\alpha}$ and that the empirical distribution of sizes converges to a random limit which we characterise in terms of the reproduction law.
All Related Versions
This publication has 24 references indexed in Scilit:
- DISCRETIZATION METHODS FOR HOMOGENEOUS FRAGMENTATIONSJournal of the London Mathematical Society, 2005
- Self-similar fragmentations derived from the stable tree II: splitting at nodesProbability Theory and Related Fields, 2004
- The asymptotic behavior of fragmentation processesJournal of the European Mathematical Society, 2003
- Self-similar fragmentationsAnnales de l'Institut Henri Poincaré, Probabilités et Statistiques, 2002
- A fragmentation process connected to Brownian motionProbability Theory and Related Fields, 2000
- The standard additive coalescentThe Annals of Probability, 1998
- Uniform Convergence of Martingales in the Branching Random WalkThe Annals of Probability, 1992
- Splitting IntervalsThe Annals of Probability, 1986
- Random recursive constructions: asymptotic geometric and topological propertiesTransactions of the American Mathematical Society, 1986
- Spatial Growth of a Branching Process of Particles Living in $\mathbb{R}^d$The Annals of Probability, 1982