English

Metered Parking Functions

Combinatorics 2024-06-21 v1

Abstract

We introduce a generalization of parking functions called tt-metered (m,n)(m,n)-parking functions, in which one of mm cars parks among nn spots per hour then leaves after tt hours. We characterize and enumerate these sequences for t=1t=1, t=m2t=m-2, and t=n1t=n-1, and provide data for other cases. We characterize the 11-metered parking functions by decomposing them into sections based on which cars are unlucky, and enumerate them using a Lucas sequence recursion. Additionally, we establish a new combinatorial interpretation of the numerator of the continued fraction n1/(n1/)n-1/(n-1/\cdots) (nn times) as the number of 11-metered (n,n)(n,n)-parking functions. We introduce the (m,n)(m,n)-parking function shuffle in order to count (m2)(m-2)-metered (m,n)(m,n)-parking functions, which also yields an expression for the number of (m,n)(m,n)-parking functions with any given first entry. As a special case, we find that the number of (m2)(m-2)-metered (m,m1)(m, m-1)-parking functions is equal to the sum of the first entries of classical parking function of length m1m-1. We enumerate the (n1)(n-1)-metered (m,n)(m,n)-parking functions in terms of the number of classical parking functions of length nn with certain parking outcomes, which we show are periodic sequences with period nn. We conclude with an array of open problems.

Cite

@article{arxiv.2406.12941,
  title  = {Metered Parking Functions},
  author = {Spencer Daugherty and Pamela E. Harris and Ian Klein and Matt McClinton},
  journal= {arXiv preprint arXiv:2406.12941},
  year   = {2024}
}
R2 v1 2026-06-28T17:10:54.288Z