English

Zero-sum subsequences in bounded-sum $\{-1, 1\}$-sequences

Combinatorics 2016-12-21 v1 Number Theory

Abstract

The following result gives the flavor of this paper: Let tt, kk and qq be integers such that q0q\geq 0, 0t<k0\leq t < k and tk(mod2)t \equiv k \,({\rm mod}\, 2), and let s[0,t+1]s\in [0,t+1] be the unique integer satisfying sq+kt22(mod(t+2))s \equiv q + \frac{k-t-2}{2} \,({\rm mod} \, (t+2)). Then for any integer nn such that nmax{k,12(t+2)k2+qst+2kt2+s}n \ge \max\left\{k,\frac{1}{2(t+2)}k^2 + \frac{q-s}{t+2}k - \frac{t}{2} + s\right\} and any function f:[n]{1,1}f:[n]\to \{-1,1\} with i=1nf(i)q|\sum_{i=1}^nf(i)| \le q, there is a set B[n]B \subseteq [n] of kk consecutive integers with yBf(y)t|\sum_{y\in B}f(y)| \le t. Moreover, this bound is sharp for all the parameters involved and a characterization of the extremal sequences is given. This and other similar results involving different subsequences are presented, including decompositions of sequences into subsequences of bounded weight.

Keywords

Cite

@article{arxiv.1612.06523,
  title  = {Zero-sum subsequences in bounded-sum $\{-1, 1\}$-sequences},
  author = {Yair Caro and Adriana Hansberg and Amanda Montejano},
  journal= {arXiv preprint arXiv:1612.06523},
  year   = {2016}
}

Comments

29 pages

R2 v1 2026-06-22T17:29:07.807Z