Quasi-polynomial: Difference between revisions

Latest revision as of 17:10, 26 August 2024

Template:Short description Template:For multi Template:One source In mathematics, a quasi-polynomial (pseudo-polynomial) is a generalization of polynomials. While the coefficients of a polynomial come from a ring, the coefficients of quasi-polynomials are instead periodic functions with integral period. Quasi-polynomials appear throughout much of combinatorics as the enumerators for various objects.

A quasi-polynomial can be written as $q (k) = c_{d} (k) k^{d} + c_{d - 1} (k) k^{d - 1} + \dots + c_{0} (k)$ , where $c_{i} (k)$ is a periodic function with integral period. If $c_{d} (k)$ is not identically zero, then the degree of $q$ is $d$ . Equivalently, a function $f : ℕ \to ℕ$ is a quasi-polynomial if there exist polynomials $p_{0}, \dots, p_{s - 1}$ such that $f (n) = p_{i} (n)$ when $i \equiv n mod s$ . The polynomials $p_{i}$ are called the constituents of $f$ .

Examples

Given a $d$ -dimensional polytope $P$ with rational vertices $v_{1}, \dots, v_{n}$ , define $t P$ to be the convex hull of $t v_{1}, \dots, t v_{n}$ . The function $L (P, t) = # (t P \cap ℤ^{d})$ is a quasi-polynomial in $t$ of degree $d$ . In this case, $L (P, t)$ is a function $ℕ \to ℕ$ . This is known as the Ehrhart quasi-polynomial, named after Eugène Ehrhart.
Given two quasi-polynomials $F$ and $G$ , the convolution of $F$ and $G$ is

(F * G) (k) = \sum_{m = 0}^{k} F (m) G (k - m)

which is a quasi-polynomial with degree

\leq \deg F + \deg G + 1 .

References

Stanley, Richard P. (1997). Enumerative Combinatorics, Volume 1. Cambridge University Press. Template:Isbn, 0-521-56069-1.

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Quasi-polynomial: Difference between revisions

Latest revision as of 17:10, 26 August 2024

Examples

References

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