Solution to the index conjecture in zero-sum theory

Abstract

A problem in zero-sum theory is to determine all pairs (k,n) for which every minimal zero-sum sequence of length k modulo n has index 1. While all other cases have been solved more than a decade ago, the case when k equals 4 and n is coprime to 6 remains open. Precisely, The Index Conjecture in this subject states that if n is coprime to 6 then every minimal zero-sum sequence of length 4 modulo n has index 1. In this paper, we prove an equivalent version of this conjecture for all n>N for some absolute constant N.