(Sp × Sq)-Invariant Graphical Parking Functions

Abstract

Graphical parking functions, or G-parking functions, are a generalization of classical parking functions which depend on a connected multigraph G having a distinguished root vertex. Gaydarov and Hopkins characterized the relationship between G-parking functions and another vector-dependent generalization of parking functions, the u-parking functions. The crucial component of their result was their classification of all graphs G whose G-parking functions are invariant under action by the symmetric group Sn, where n+1 is the order of G. In this work, we present a 2-dimensional analogue of Gaydarov and Hopkins' results by characterizing the overlap between G-parking functions and 2-dimensional U-parking functions, i.e., pairs of integer sequences whose order statistics are bounded by certain weights along lattice paths in the plane. Our key result is a total classification of all G whose set of G-parking functions is (Sp × Sq)-invariant, where p+q+1 is the order of G.