On permutations of \1,…,n\ and related topics

Abstract

In this paper we study combinatorial aspects of permutations of \1,…,n\ and related topics. In particular, we prove that there is a unique permutation π of \1,…,n\ such that all the numbers k+π(k) (k=1,…,n) are powers of two. We also show that n[ij-1]1 i,j n for any integer n>2. We conjecture that if a group G contains no element of order among 2,…,n+1 then any A⊂eq G with |A|=n can be written as \a1,…,an\ with a1,a22,…,ann pairwise distinct. This conjecture is confirmed when G is a torsion-free abelian group. We also prove that for any finite subset A of a torsion-free abelian group G with |A|=n>3, there is a numbering a1,…,an of all the elements of A such that all the n sums a1+a2+a3,\ a2+a3+a4,\ …,\ an-2+an-1+an,\ an-1+an+a1,\ an+a1+a2 are pairwise distinct.