Perfect Codes in the Discrete Simplex

Abstract

We study the problem of existence of (nontrivial) perfect codes in the discrete n -simplex n := \ pmatrix x0, …, xn pmatrix : xi ∈ Z+, Σi xi = \ under 1 metric. The problem is motivated by the so-called multiset codes, which have recently been introduced by the authors as appropriate constructs for error correction in the permutation channels. It is shown that e -perfect codes in the 1 -simplex 1 exist for any ≥ 2e + 1 , the 2 -simplex 2 admits an e -perfect code if and only if = 3e + 1 , while there are no perfect codes in higher-dimensional simplices. In other words, perfect multiset codes exist only over binary and ternary alphabets.