From Stern's Triangle to Upper Homogeneous Posets
November 19, 2020, 5:00 PM - 6:00 PM
Location:
Online Event
Organizer(s):
Robert Dougherty Bliss, Rutgers University
Doron Zeilberger, Rutgers University
Richard Stanley, Massachusetts Institute of Technology
Stern's triangle S is an array of numbers similar to Pascal's triangle, except that in addition to adding two adjacent numbers we also copy each number down to the next row. We discuss some arithmetic properties of S that can be greatly generalized. There is also a natural poset P associated to S. This poset is upper homogeneous, i.e., for every t in P, the subposet {s: s ≥ t} is isomorphic to P. As a consequence, the Ehrenborg quasisymmetric function of P, which is a kind of generating function for counting certain chains in P, is a symmetric function. This motivates the question of which symmetric functions can be Ehrenborg quasisymmetric functions of upper homogeneous posets.