A lower bound on permutation codes of distance n-1
Abstract
A classical recursive construction for mutually orthogonal latin squares (MOLS) is shown to hold more generally for a class of permutation codes of length n and minimum distance n-1. When such codes of length p+1 are included as ingredients, we obtain a general lower bound M(n,n-1) n1.079 for large n, gaining a small improvement on the guarantee given from MOLS.
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