Extending the parking space

Abstract

The action of the symmetric group Sn on the set Parkn of parking functions of size n has received a great deal of attention in algebraic combinatorics. We prove that the action of Sn on Parkn extends to an action of Sn+1. More precisely, we construct a graded Sn+1-module Vn such that the restriction of Vn to Sn is isomorphic to Parkn. We describe the Sn-Frobenius characters of the module Vn in all degrees and describe the Sn+1-Frobenius characters of Vn in extreme degrees. We give a bivariate generalization Vn(, m) of our module Vn whose representation theory is governed by a bivariate generalization of Dyck paths. A Fuss generalization of our results is a special case of this bivariate generalization.