On the non-existence of perfect codes in the Niederreiter-Rosenbloom-Tsfasman metric

Abstract

In this paper we consider codes in Fqs× r with packing radius R regarding the NRT-metric (i.e. when the underlying poset is a disjoint union of chains with the same length) and we establish necessary condition on the parameters s,r and R for the existence of perfect codes. More explicitly, for r,s≥ 2 and R≥ 1 we prove that if there is a non-trivial perfect code then (r+1)(R+1)≤ rs. We also explore a connection to the knapsack problem and establish a correspondence between perfect codes with r>R and those with r=R. Using this correspondence we prove the non-existence of non-trivial perfect codes also for s=R+2.