Journal of the Ramanujan Mathematical Society
Volume 39, Issue 4, December 2024 pp. 323–335.
On the irreducibility of the Krawtchouck polynomials
Authors:
John Cullinan
Author institution:Department of Mathematics, Bard College, Annandale-On-Hudson, NY 12504, USA.
Summary:
The Krawtchouck polynomials arise naturally in both coding theory and probability theory and have
been studied extensively from these points of view. However, very little is known about their irreducibility and
Galois properties. Just like many classical families of orthogonal polynomials (e.g. the Legendre and Laguerre), the
Krawtchouck polynomials can be viewed as special cases of Jacobi polynomials. In this paper we determine the
Newton Polygons of certain Krawtchouck polynomials and show that they are very similar to those of the Legendre
polynomials (and exhibit new cases of irreducibility). However, we also show that their Galois groups are significantly
more complicated to study, due to the nature of their coefficients, versus those of other classical orthogonal families.
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