On Sequences in Cyclic Groups with Distinct Partial Sums

Abstract

A subset of an abelian group is sequenceable if there is an ordering (x1, …, xk) of its elements such that the partial sums (y0, y1, …, yk), given by y0 = 0 and yi = Σj=1i xi for 1 ≤ i ≤ k, are distinct, with the possible exception that we may have yk = y0 = 0. We demonstrate the sequenceability of subsets of size k of Zn \ 0 \ when n = mt in many cases, including when m is either prime or has all prime factors larger than k! /2 for k ≤ 11 and t ≤ 5 and for k=12 and t ≤ 4. We obtain similar, but partial, results for 13 ≤ k ≤ 15. This represents progress on a variety of questions and conjectures in the literature concerning the sequenceability of subsets of abelian groups, which we combine and summarize into the conjecture that if a subset of an abelian group does not contain 0 then it is sequenceable.