On k-neighbor separated permutations

Abstract

Two permutations of [n]=\1,2 … n\ are k-neighbor separated if there are two elements that are neighbors in one of the permutations and that are separated by exactly k-2 other elements in the other permutation. Let the maximal number of pairwise k-neighbor separated permutations of [n] be denoted by P(n,k). In a previous paper, the authors have determined P(n,3) for every n, answering a question of K\"orner, Messuti and Simonyi affirmatively. In this paper we prove that for every fixed positive integer , P(n,2+1) = 2n-o(n). We conjecture that for every fixed even k, P(n,k)=2n-o(n). We also show that this conjecture is asymptotically true in the following sense k → ∞ n → ∞ [n]P(n,k)=2. Finally, we show that for even n, P(n,n)= 3n/2.