New bounds for covering codes of radius 3 and codimension 3t+1

Abstract

The smallest possible length of a q-ary linear code of covering radius R and codimension (redundancy) r is called the length function and is denoted by q(r,R). In this work, for q an arbitrary prime power, we obtain the following new constructive upper bounds on q(3t+1,3): q(r,3) [3]k· q(r-3)/3·[3] q,~r=3t+1, ~t1, ~ q(k), 18 <k20.339,~W(k) is a decreasing function of k ; q(r,3) [3]18· q(r-3)/3·[3] q,~r=3t+1,~t1,~ q large enough. For t = 1, we use a one-to-one correspondence between codes of covering radius 3 and codimension 4, and 2-saturating sets in the projective space PG(3,q). A new construction providing sets of small size is proposed. The codes, obtained by geometrical methods, are taken as the starting ones in the lift-constructions (so-called ``qm-concatenating constructions'') to obtain infinite families of codes with radius 3 and growing codimension r = 3t + 1, t1. The new bounds are essentially better than the known ones.