Metered Parking Functions

TL;DR

This paper introduces and analyzes a new class of generalized parking functions called $t$-metered $(m,n)$-parking functions, providing enumeration formulas, combinatorial interpretations, and connections to continued fractions and classical parking functions.

Contribution

It defines $t$-metered parking functions, characterizes and enumerates specific cases, and establishes new combinatorial interpretations and counting methods for these generalized functions.

Findings

Enumeration formulas for specific $t$ values

A new interpretation of continued fraction numerators

Connections between metered parking functions and classical parking functions

Abstract

We introduce a generalization of parking functions called $t$-metered $(m,n)$-parking functions, in which one of $m$ cars parks among $n$ spots per hour then leaves after $t$ hours. We characterize and enumerate these sequences for $t=1$, $t=m-2$, and $t=n-1$, and provide data for other cases. We characterize the $1$-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 $n-1/(n-1/\cdots)$ ($n$ times) as the number of $1$-metered $(n,n)$-parking functions. We introduce the $(m,n)$-parking function shuffle in order to count $(m-2)$-metered $(m,n)$-parking functions, which also yields an expression for the number of $(m,n)$-parking functions with any given first entry. As a special case, we find that the number of $(m-2)$-metered $(m, m-1)$-parking functions is equal to the sum of the first entries of classical parking function of length $m-1$. We enumerate the $(n-1)$-metered $(m,n)$-parking functions in terms of the number of classical parking functions of length $n$ with certain parking outcomes, which we show are periodic sequences with period $n$. We conclude with an array of open problems.