Counting with Two-Level Polynomials

  • Tristram Bogart
  • Kevin Woods

Abstract

We examine combinatorial counting functions with two parameters, $n$ and $q$. For fixed $q$, these functions are (quasi-)polynomial in $n$. As $q$ varies, the degree of this polynomial is itself polynomial in $q$, as are the leading coefficients. We carefully define these two-level polynomials, lay out their basic algebraic properties, and provide a schema for showing a function is a two-level polynomial. Using the schema, we prove that a variety of counting functions arising in different areas of combinatorics are two-level polynomials. These include chromatic polynomials for many infinite families of graphs, partitions of an integer into a given number of parts, placing non-attacking chess pieces on a board, Sidon sets, and Sheffer sequences (including binomial type and Appell sequences).

Published
2026-07-17
How to Cite
Bogart, T., & Woods, K. (2026). Counting with Two-Level Polynomials. The Electronic Journal of Combinatorics, 33(3), #P3.18. https://doi.org/10.37236/14617
Article Number
P3.18