Rational parking functions and Catalan numbers

Abstract

The classical parking functions, counted by the Cayley number (n+1)(n-1), carry a natural permutation representation of the symmetric group Sn in which the number of orbits is the n'th Catalan number. In this paper, we will generalize this setup to rational parking functions indexed by a pair (a,b) of coprime positive integers. We show that these parking functions, which are counted by b(a-1), carry a permutation representation of Sa in which the number of orbits is a rational Catalan number. We compute the Frobenius characteristic of the Sa-module of (a,b)-parking functions. Next we propose a combinatorial formula for a q-analogue of the rational Catalan numbers and relate this formula to a new combinatorial model for q-binomial coefficients. Finally, we discuss q,t-analogues of rational Catalan numbers and parking functions (generalizing the shuffle conjecture for the classical case) and present several conjectures.