English

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

Combinatorics 2018-09-11 v1

Abstract

Let (G,+)(G,+) be an abelian group and consider a subset AGA \subseteq G with A=k|A|=k. Given an ordering (a1,,ak)(a_1, \ldots, a_k) of the elements of AA, define its {\em partial sums} by s0=0s_0 = 0 and sj=i=1jais_j = \sum_{i=1}^j a_i for 1jk1 \leq j \leq k. We consider the following conjecture of Alspach: For any cyclic group Zn\Z_n and any subset AZn{0}A \subseteq \Z_n \setminus \{0\} with sk0s_k \neq 0, it is possible to find an ordering of the elements of AA such that no two of its partial sums sis_i and sjs_j are equal for 0i<jk0 \leq i < j \leq k. We show that Alspach's Conjecture holds for prime nn when kn3k \geq n-3 and when k10k \leq 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 nn a sequence of length kk having distinct partial sums exists in any subset of Zn{0}\Z_n \setminus \{0\} of size at least 2k8k2k- \sqrt{8k} in all but at most a bounded number of cases.

Keywords

Cite

@article{arxiv.1809.02684,
  title  = {Distinct Partial Sums in Cyclic Groups: Polynomial Method and Constructive Approaches},
  author = {Jacob Hicks and M. A. Ollis and John. R. Schmitt},
  journal= {arXiv preprint arXiv:1809.02684},
  year   = {2018}
}

Comments

18 pages

R2 v1 2026-06-23T03:58:34.075Z