Polynomial sequence

In mathematics, a polynomial sequence is a sequence of polynomials indexed by the nonnegative integers 0, 1, 2, 3, ..., in which each index is equal to the degree of the corresponding polynomial. Polynomial sequences are a topic of interest in enumerative combinatorics and algebraic combinatorics, as well as applied mathematics.

Some polynomial sequences arise in physics and approximation theory as the solutions of certain ordinary differential equations:

• Laguerre polynomials
• Chebyshev polynomials
• Legendre polynomials
• Bessel functions
• Jacobi polynomials

Other come from statistics:

• Hermite polynomials

Many are studied in algebra and combinatorics:

• Monomials
• Rising factorials
• Falling factorials
• Abel polynomials
• Bell polynomials
• Bernoulli polynomials
• Dickson polynomials
• Fibonacci polynomials
• Lucas polynomials
• Spread polynomials
• Touchard polynomials
• Rook polynomials

• Polynomial sequences of binomial type
• Orthogonal polynomials
• Secondary polynomials
• Sheffer sequence
• Sturm sequence
• Generalized Appell polynomials

• Umbral calculus

• Aigner, Martin. "A course in enumeration", GTM Springer, 2007, ISBN 3-540-39032-4 p21.
• Roman, Steven "The Umbral Calculus", Dover Publications, 2005, ISBN 0-486-44129-3.
• Williamson, S. Gill "Combinatorics for Computer Science", Dover Publications, (2002) p177.