T\'oth's buses and the "detachment process''

Abstract

This paper introduces the detachment process, a novel, time-inhomogeneous Markov process inspired by I. P. T\'oth's problem Toth concerning the number of ``lonely passengers'' (those without companions) when n passengers are seated independently and uniformly in k initially empty buses. T\'oth showed that this number is stochastically non-decreasing in k for fixed n (see also Haslegrave's work Haslegrave). We extend T\'oth's model by treating the number of buses k as a time parameter. Specifically, for a fixed number of passengers n, the state of our Markov process at time k 1 is exactly T\'oth's configuration (n, k). (We formally extend the process definition for all t ∈ [1, ∞).) These processes can be coupled for all n 1, and this larger coupled process is what we dub the detachment process. Our investigation focuses on properties related to detachment, clumping, the number of lonely passengers and of non-empty buses. The central notion is detachment, which occurs at time k if every passenger occupies a distinct bus; we say the process is in a state of detachment at k. A detachment time k is when the process transitions from a non-detached state at k-1 to a detached state at k. Four critical time scales are idetified -- linear, quadratic, and log-corrected linear or quadratic in the number of passengers, n -- that govern the process's properties. We investigate (relative) clumping. We also explore why modeling the number of passengers with a Poisson distribution simplifies the analysis of T\'oth's original model. To aid this derivation, we introduce a comparison theorem for binomial distributions, originally obtained by J. Najnudel Najnudel, along with a novel proof.

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