Rational associahedra and noncrossing partitions

TL;DR

This paper introduces rational associahedra, a family of simplicial complexes associated with positive rational numbers, generalizing classical associahedra and noncrossing partitions, with proven shellability and explicit combinatorial formulas.

Contribution

It defines rational associahedra using rational Dyck paths, generalizes classical combinatorial objects, and provides shellability and explicit formulas for their invariants.

Findings

Proved that rational associahedra are shellable.

Derived product formulas for h-vector and f-vector.

Connected rational associahedra to noncrossing partitions.

Abstract

Each positive rational number x>0 can be written uniquely as x=a/(b-a) for coprime positive integers 0<a<b. We will identify x with the pair (a,b). In this paper we define for each positive rational x>0 a simplicial complex \Ass(x)=\Ass(a,b) called the {\sf rational associahedron}. It is a pure simplicial complex of dimension a-2, and its maximal faces are counted by the {\sf rational Catalan number} \Cat(x)=\Cat(a,b):=\frac{(a+b-1)!}{a!\,b!}. The cases (a,b)=(n,n+1) and (a,b)=(n,kn+1) recover the classical associahedron and its "Fuss-Catalan" generalization studied by Athanasiadis-Tzanaki and Fomin-Reading. We prove that \Ass(a,b) is shellable and give nice product formulas for its h-vector (the {\sf rational Narayana numbers}) and f-vector (the {\sf rational Kirkman numbers}). We define \Ass(a,b) via {\sf rational Dyck paths}: lattice paths from (0,0) to (b,a) staying above the line y = \frac{a}{b}x. We also use rational Dyck paths to define a rational generalization of noncrossing perfect matchings of [2n]. In the case (a,b) = (n, mn+1), our construction produces the noncrossing partitions of [(m+1)n] in which each block has size m+1.