Parking functions on toppling matrices
Abstract
Let be an integer -matrix which satisfies the conditions: , and there exists a vector such that . Here the notation means that for all , and means that for every . Let be the set of vectors such that and . In this paper, -parking functions are defined for any . It is proved that the set of -parking functions is independent of for any . For this reason, -parking functions are simply called -parking functions. It is shown that the number of -parking functions is less than or equal to the determinant of . Moreover, the definition of -recurrent configurations are given for any . It is proved that the set of -recurrent configurations is independent of for any . Hence, -recurrent configurations are simply called -recurrent configurations. It is obtained that the number of -recurrent configurations is larger than or equal to the determinant of . A simple bijection from -parking functions to -recurrent configurations is established. It follows from this bijection that the number of -parking functions and the number of -recurrent configurations are both equal to the determinant of .
Cite
@article{arxiv.1407.1955,
title = {Parking functions on toppling matrices},
author = {Jun Ma and Yeong-Nan Yeh},
journal= {arXiv preprint arXiv:1407.1955},
year = {2014}
}