Distinct Partial Sums in Cyclic Groups: Polynomial Method and Constructive Approaches

Abstract

Let (G,+) be an abelian group and consider a subset A ⊂eq G with |A|=k. Given an ordering (a1, …, ak) of the elements of A, define its partial sums by s0 = 0 and sj = Σi=1j ai for 1 ≤ j ≤ k. We consider the following conjecture of Alspach: For any cyclic group n and any subset A ⊂eq n \0\ with sk ≠ 0, it is possible to find an ordering of the elements of A such that no two of its partial sums si and sj are equal for 0 ≤ i < j ≤ k. We show that Alspach's Conjecture holds for prime n when k ≥ n-3 and when k ≤ 10. The former result is by direct construction, the latter is non-constructive and uses the polynomial method. We also use the polynomial method to show that for prime n a sequence of length k having distinct partial sums exists in any subset of n \0\ of size at least 2k- 8k in all but at most a bounded number of cases.