Pinned Billiard Balls Simulation (WXML Autumn 2023 report)
Systems of pinned billiard balls serve as simplified models of collisions, where all particles remain fixed in their positions while their (pseudo-)velocities evolve in accordance with the laws of conservation of energy and momentum. For some families of ball configurations, Athreya, Burdzy, and Dua...
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Zusammenfassung: | Systems of pinned billiard balls serve as simplified models of collisions,
where all particles remain fixed in their positions while their
(pseudo-)velocities evolve in accordance with the laws of conservation of
energy and momentum. For some families of ball configurations, Athreya, Burdzy,
and Duarte have established the maximum upper bound for the number of
pseudo-collisions, thereby demonstrating that the number of collisions is
finite. The result has been extended to all ball configurations. In this
project, we do extensive simulations to study two specific configurations.
First, we consider balls arranged in a half-space and assign a single ball an
inward (pseudo-) velocity. Simulations suggest that in the long run, most of
the energy is concentrated near the boundary. Second, when the balls are
arranged on a flat torus, we find that in the stationary regime, the
distributions of the velocity components are i.i.d. normal. Additionally, we
find that the components of the velocities in the direction of impact between
two touching balls are uncorrelated. |
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DOI: | 10.48550/arxiv.2312.11869 |