Parking functions, Shi arrangements, and mixed graphs

TL;DR

This paper explores the deep combinatorial connections between Shi arrangements and parking functions, providing new insights into their bijections through the study of mixed graphs.

Contribution

It introduces a novel perspective on existing bijections between Shi arrangements and parking functions using mixed graphs.

Findings

Established a new bijection framework involving mixed graphs.

Provided a clearer understanding of the combinatorial structures.

Connected Shi arrangements with parking functions via graph theory.

Abstract

The \emph{Shi arrangement} is the set of all hyperplanes in $\mathbb R^n$ of the form $x_j - x_k = 0$ or $1$ for $1 \le j < k \le n$. Shi observed in 1986 that the number of regions (i.e., connected components of the complement) of this arrangement is $(n+1)^{n-1}$. An unrelated combinatorial concept is that of a \emph{parking function}, i.e., a sequence $(x_1, x_2, ..., x_n)$ of positive integers that, when rearranged from smallest to largest, satisfies $x_k \le k$. (There is an illustrative reason for the term \emph{parking function}.) It turns out that the number of parking functions of length $n$ also equals $(n+1)^{n-1}$, a result due to Konheim and Weiss from 1966. A natural problem consists of finding a bijection between the $n$-dimensional Shi arragnement and the parking functions of length $n$. Stanley and Pak (1996) and Athanasiadis and Linusson 1999) gave such (quite different) bijections. We will shed new light on the former bijection by taking a scenic route through certain mixed graphs.