F- and H-Triangles for -Associahedra

Abstract

For any northeast path , we define two bivariate polynomials associated with the -associahedron: the F- and the H-triangle. We prove combinatorially that we can obtain one from the other by an invertible transformation of variables. These polynomials generalize the classical F- and H-triangles of F.~Chapoton in type A. Our proof is completely new and has the advantage of providing a combinatorial explanation of the relation between the F- and H-triangle.