On almost perfect linear Lee codes of packing radius 2

Abstract

More than 50 years ago, Golomb and Welch conjectured that there is no perfect Lee codes C of packing radius r in Zn for r≥2 and n≥ 3. Recently, Leung and the second author proved that if C is linear, then the Golomb-Welch conjecture is valid for r=2 and n≥ 3. In this paper, we consider the classification of linear Lee codes with the second-best possibility, that is the density of the lattice packing of Zn by Lee spheres S(n,r) equals |S(n,r)||S(n,r)|+1. We show that, for r=2 and n 0,3,4 6, this packing density can never be achieved.