Linear nonbinary covering codes and saturating sets in projective spaces

Abstract

Let AR,q denote a family of covering codes, in which the covering radius R and the size q of the underlying Galois field are fixed, while the code length tends to infinity. In this paper, infinite sets of families AR,q, where R is fixed but q ranges over an infinite set of prime powers are considered, and the dependence on q of the asymptotic covering densities of AR,q is investigated. It turns out that for the upper limit of the covering density of AR,q, the best possibility is O(q). The main achievement of the present paper is the construction of asymptotic optimal infinite sets of families AR,q for any covering radius R >= 2. We first showed that for a given R, to obtain optimal infinite sets of families it is enough to construct R infinite families AR,q(0),AR,q(1),...,AR,q(R-1) such that, for all u >= u0, the family AR,q(v) contains codes of codimension ru=Ru+v and length fqv(ru) where fqv(r)=O(q(r-R)/R) and u0 is a constant. Then, we were able to construct the needed families AR,q(v) for any covering radius R >= 2, with q ranging over the (infinite) set of R-th powers. For each of these families AR,q(v), the lower limit of the covering density is bounded from above by a constant independent of q.