On zero-sum free sequences contained in random subsets of finite cyclic groups

Abstract

Let Cn be a cyclic group of order n. A sequence S of length over Cn is a sequence S = a1· a2· …· a of elements in Cn, where a repetition of elements is allowed and their order is disregarded. We say that S is a zero-sum sequence if i=1 ai = 0 and that S is a zero-sum free sequence if S contains no zero-sum subsequence. Let R be a random subset of Cn obtained by choosing each element in Cn independently with probability p. Let NRn-1-k be the number of zero-sum free sequences of length n-1-k in R. Also, let NRn-1-k,d be the number of zero-sum free sequences of length n-1-k having d distinct elements in R. We obtain the expectation of NRn-1-k and NRn-1-k,d for 0≤ k≤ n3 . We also show a concentration result on NRn-1-k and NRn-1-k,d when k is fixed.