English

Combinatorial universality in three-speed ballistic annihilation

Probability 2022-01-05 v1 Combinatorics

Abstract

We consider a one-dimensional system of particles, moving at constant velocities chosen independently according to a symmetric distribution on {1,0,+1}\{-1,0,+1\}, and annihilating upon collision -- with, in case of triple collision, a uniformly random choice of survivor among the two moving particles. When the system contains infinitely many particles, whose starting locations are given by a renewal process, a phase transition was proved to happen (see arXiv:1811.08709) as the density of static particles crosses the value 1/41/4. Remarkably, this critical value, along with certain other statistics, was observed not to depend on the distribution of interdistances. In the present paper, we investigate further this universality by proving a stronger statement about a finite system of particles with fixed, but randomly shuffled, interdistances. We give two proofs, one by an induction allowing explicit computations, and one by a more direct comparison. This result entails a new nontrivial independence property that in particular gives access to the density of surviving static particles at a given time in the infinite model. Finally, in the asymmetric case, further similar independence properties are proved to keep holding, including a striking property of gamma distributed interdistances that contrasts with the general behavior.

Keywords

Cite

@article{arxiv.2004.09119,
  title  = {Combinatorial universality in three-speed ballistic annihilation},
  author = {John Haslegrave and Laurent Tournier},
  journal= {arXiv preprint arXiv:2004.09119},
  year   = {2022}
}

Comments

21 pages, 5 figures. To be published in a special volume in memory of Vladas Sidoravicius

R2 v1 2026-06-23T14:57:35.657Z