On Additive Combinatorics of Permutations of Zn

Abstract

Let Zn denote the ring of integers modulo n. In this paper we consider two extremal problems on permutations of Zn, namely, the maximum size of a collection of permutations such that the sum of any two distinct permutations in the collection is again a permutation, and the maximum size of a collection of permutations such that the sum of any two distinct permutations in the collection is not a permutation. Let the sizes be denoted by s(n) and t(n) respectively. The case when n is even is trivial in both the cases, with s(n)=1 and t(n)=n!. For n odd, we prove s(n)≥ (nφ(n))/2k where k is the number of distinct prime divisors of n. When n is an odd prime we prove s(n)≤ e2π n ((n-1)/e)n-12. For the second problem, we prove 2(n-1)/2.(n-12)!≤ t(n)≤ 2k.(n-1)!/φ(n) when n is odd.