On the lengths of divisible codes

Abstract

In this article, the effective lengths of all qr-divisible linear codes over Fq with a non-negative integer r are determined. For that purpose, the Sq(r)-adic expansion of an integer n is introduced. It is shown that there exists a qr-divisible Fq-linear code of effective length n if and only if the leading coefficient of the Sq(r)-adic expansion of n is non-negative. Furthermore, the maximum weight of a qr-divisible code of effective length n is at most σ qr, where σ denotes the cross-sum of the Sq(r)-adic expansion of n. This result has applications in Galois geometries. A recent theorem of Nastase and Sissokho on the maximum size of a partial spread follows as a corollary. Furthermore, we get an improvement of the Johnson bound for constant dimension subspace codes.