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Main Author: Krapivsky, P. L.
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.22383
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author Krapivsky, P. L.
author_facet Krapivsky, P. L.
contents We study aggregation-fragmentation processes in which pairs of clusters can aggregate, and each cluster can break into two fragments. If the rates of aggregation and fragmentation do not depend on the masses, detailed balance does not hold, but nonequilibrium steady states can still be deduced from an exact solution for the Laplace transform. For models in which aggregation rates remain constant but fragmentation rates scale as $(\text{mass})^β$, detailed balance holds only when $β=1$. Away from this solvable case, we employ asymptotic techniques and show that when $β\geq 0$, the steady states share similarities with those from the mass-independent ($β=0$) model. An instantaneous shattering transition with continuous mass loss occurs when $β<0$.
format Preprint
id arxiv_https___arxiv_org_abs_2605_22383
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Aggregation-Fragmentation Processes with Broken Detailed Balance
Krapivsky, P. L.
Statistical Mechanics
Mathematical Physics
We study aggregation-fragmentation processes in which pairs of clusters can aggregate, and each cluster can break into two fragments. If the rates of aggregation and fragmentation do not depend on the masses, detailed balance does not hold, but nonequilibrium steady states can still be deduced from an exact solution for the Laplace transform. For models in which aggregation rates remain constant but fragmentation rates scale as $(\text{mass})^β$, detailed balance holds only when $β=1$. Away from this solvable case, we employ asymptotic techniques and show that when $β\geq 0$, the steady states share similarities with those from the mass-independent ($β=0$) model. An instantaneous shattering transition with continuous mass loss occurs when $β<0$.
title Aggregation-Fragmentation Processes with Broken Detailed Balance
topic Statistical Mechanics
Mathematical Physics
url https://arxiv.org/abs/2605.22383