The bullet problem with discrete speeds
From MaRDI portal
Publication:2422722
DOI10.1214/19-ECP238zbMath1488.60230arXiv1610.00282OpenAlexW2963280821MaRDI QIDQ2422722
Matthew Junge, Brittany Dygert, Christoph Kinzel, Jennifer Zhu, Annie Raymond, Erik Slivken
Publication date: 20 June 2019
Published in: Electronic Communications in Probability (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1610.00282
Related Items (9)
Three-speed ballistic annihilation: phase transition and universality ⋮ The upper threshold in ballistic annihilation ⋮ Non-universality in clustered ballistic annihilation ⋮ Three-velocity coalescing ballistic annihilation ⋮ Combinatorial universality in three-speed ballistic annihilation ⋮ On collisions times of `self-sorting' interacting particles in one-dimension with random initial positions and velocities ⋮ Clustering in the three and four color cyclic particle systems in one dimension ⋮ Parking on transitive unimodular graphs ⋮ The phase structure of asymmetric ballistic annihilation
Cites Work
- From transience to recurrence with Poisson tree frogs
- Three-speed ballistic annihilation: phase transition and universality
- Recurrence and transience for the frog model on trees
- Note on a one-dimensional system of annihilating particles
- Global Synchronization of Pulse-Coupled Oscillators on Trees
- The combinatorics of the colliding bullets
- The upper threshold in ballistic annihilation
This page was built for publication: The bullet problem with discrete speeds
