New Upper Bounds on the Size of Permutation Codes under Kendall τ-Metric

Abstract

We first give two methods based on the representation theory of symmetric groups to study the largest size P(n,d) of permutation codes of length n i.e. subsets of the set Sn all permutations on \1,…,n\ with the minimum distance (at least) d under the Kendall τ-metric. The first method is an integer programming problem obtained from the transitive actions of Sn. The second method can be applied to refute the existence of perfect codes in Sn.\\ Here we reduce the known upper bound (n-1)!-1 for P(n,3) to (n-1)!-n3+2≤ (n-1)!-2, whenever n≥ 11 is any prime number. If n=6, 7, 11, 13, 14, 15, 17, the known upper bound for P(n,3) is decreased by 3,3,9,11,1,1,4, respectively.