Abstract :
Catalan numbers Cn are widely known and studied and more recently the Motzkin numbers Mn have been celebrated. Closely joined to the Motzkin sequence is a sequence of unnamed numbers γn, also growing in importance. Here they are denoted by Rn, where R stands for Riordan. In 1977, using the planar coloring schemes defined by W. T. Tutte, I discovered that these numbers answer an old problem about linearly independent chromatic polynomials.
Planar coloring schemes for an n-ring can be viewed as the subset of cyclically spaced noncrossing partitions of an n-cycle, and they define a natural geometric basis for chromatic polynomials on the n-ring.
This article presents a unified overview of Catalan, Motzkin, and R-numbers, intended as a primer of sequences and techniques, combinatorial structure and recursion, generating function equations, difference triangles, and Lagrange inversion. Direct combinatorial correspondences are highlighted.
