Combinatorics of the zeta map on rational Dyck paths

Abstract

An (a,b)-Dyck path P is a lattice path from (0,0) to (b,a) that stays above the line y=abx. The zeta map is a curious rule that maps the set of (a,b)-Dyck paths into itself; it is conjecturally bijective, and we provide progress towards proof of bijectivity in this paper, by showing that knowing zeta of P and zeta of conjugate is enough to recover P. Our method begets an area-preserving involution on the set of (a,b)-Dyck paths when ζ is a bijection, as well as a new method for calculating ζ-1 on classical Dyck paths. For certain nice (a,b)-Dyck paths we give an explicit formula for ζ-1 and and for additional (a,b)-Dyck paths we discuss how to compute ζ-1 and inductively. We also explore Armstrong's skew length statistic and present two new combinatorial methods for calculating the zeta map involving lasers and interval intersections. We provide a combinatorial statistic δ that can be used to recursively compute ζ-1 and show that δ is computable from ζ(P) in the Fuss-Catalan case.