Linearization of polynomials in prime characteristic, with applications to the Golay code and Steiner system

Abstract

Let F be any field containing the finite field of order q. A q-polynomial L over F is an element of the polynomial ring F[x] with the property that all powers of x that appear in L with nonzero coefficient have exponent a power of q. It is well known that given any ordinary polynomial f in F[x], there exists a q-polynomial that is divisible by f. We study the smallest degree of such a q-polynomial. This is equivalent to studying the Fq-span of the roots of f in a splitting field. We relate this quantity to the representation theory of the Galois group of f. As an application we give a simultaneous construction of the binary Golay code of length 24, and the Steiner system on 24 points.

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