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Main Authors: Dyszewski, Piotr, Johnston, Samuel G. G., Palau, Sandra, Prochno, Joscha
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2409.11795
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author Dyszewski, Piotr
Johnston, Samuel G. G.
Palau, Sandra
Prochno, Joscha
author_facet Dyszewski, Piotr
Johnston, Samuel G. G.
Palau, Sandra
Prochno, Joscha
contents We study a self-similar fragmentation process with dislocation measure $ν$ and self-similarity index $α> 0$. Let $e^{-m_t}$ denote the size of the largest fragment at time $t \geq 0$. For dislocation measures satisfying a regularity condition of the form $ν(1 - s_1 > δ) = δ^{-θ} \ell(1/δ)$ with $θ\in [0,1)$ and slowly varying $\ell$, we prove almost sure convergence \[ \lim_{t \to \infty} (m_t - g(t)) = 0, \] where $g(t) = (\log t - (1 - θ) \log \log t + f(t))/α$, and $f(t) = o(\log \log t)$ is a lower order correction that can be described explicitly in terms of $\ell$ and $θ$. Our results sharpen substantially the best prior result on general self-similar fragmentation processes, due to Bertoin, which states that $m_t = (1+o(1)) \log (t)/α$.
format Preprint
id arxiv_https___arxiv_org_abs_2409_11795
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The largest fragment in self-similar fragmentation processes of positive index
Dyszewski, Piotr
Johnston, Samuel G. G.
Palau, Sandra
Prochno, Joscha
Probability
We study a self-similar fragmentation process with dislocation measure $ν$ and self-similarity index $α> 0$. Let $e^{-m_t}$ denote the size of the largest fragment at time $t \geq 0$. For dislocation measures satisfying a regularity condition of the form $ν(1 - s_1 > δ) = δ^{-θ} \ell(1/δ)$ with $θ\in [0,1)$ and slowly varying $\ell$, we prove almost sure convergence \[ \lim_{t \to \infty} (m_t - g(t)) = 0, \] where $g(t) = (\log t - (1 - θ) \log \log t + f(t))/α$, and $f(t) = o(\log \log t)$ is a lower order correction that can be described explicitly in terms of $\ell$ and $θ$. Our results sharpen substantially the best prior result on general self-similar fragmentation processes, due to Bertoin, which states that $m_t = (1+o(1)) \log (t)/α$.
title The largest fragment in self-similar fragmentation processes of positive index
topic Probability
url https://arxiv.org/abs/2409.11795