New Bounds on the Size of Permutation Codes With Minimum Kendall τ-distance of Three

Abstract

We study P(n,3), the size of the largest subset of the set of all permutations Sn with minimum Kendall τ-distance 3. Using a combination of group theory and integer programming, we reduced the upper bound of P(p,3) from (p-1)!-1 to (p-1)!-p3+2≤ (p-1)!-2 for all primes p≥ 11. In special cases where n is equal to 6,7,11,13,14,15 and 17 we reduced the upper bound of P(n,3) by 3,3,9,11,1,1 and 4, respectively.