Permutations destroying arithmetic progressions in finite cyclic groups

Abstract

A permutation π of an abelian group G is said to destroy arithmetic progressions (APs) if, whenever (a,b,c) is a non-trivial 3-term AP in G, that is c-b=b-a and a,b,c are not all equal, then (π(a),π(b),π(c)) is not an AP. In a paper from 2004, the first author conjectured that such a permutation exists of Z/nZ, for all n except 2,3,5 and 7. Here we prove, as a special case of a more general result, that such a permutation exists for all n >= n0, for some explcitly constructed number n0 ≈ 1.4 x 1014. We also construct such a permutation of Z/pZ for all primes p > 3 such that p = 3 (mod 8).