English

Zero-sum squares in bounded discrepancy {-1,1}-matrices

Combinatorics 2021-06-09 v2

Abstract

For n5n\ge 5, we prove that every n×nn\times n matrix M=(ai,j)M=(a_{i,j}) with entries in {1,1}\{-1,1\} and absolute discrepancy disc(M)=ai,jn|\mathrm{disc}(M)|=|\sum a_{i,j}|\le n contains a zero-sum square except for the split matrix (up to symmetries). Here, a square is a 2×22\times 2 sub-matrix of MM with entries ai,j,ai+s,s,ai,j+s,ai+s,j+sa_{i,j}, a_{i+s,s}, a_{i,j+s}, a_{i+s,j+s} for some s1s\ge 1, and a split matrix is a matrix with all entries above the diagonal equal to 1-1 and all remaining entries equal to 11. In particular, we show that for n5n\ge 5 every zero-sum n×nn\times n matrix with entries in {1,1}\{-1,1\} contains a zero-sum square.

Keywords

Cite

@article{arxiv.2005.07813,
  title  = {Zero-sum squares in bounded discrepancy {-1,1}-matrices},
  author = {Alma R. Arévalo and Amanda Montejano and Edgardo Roldán-Pensado},
  journal= {arXiv preprint arXiv:2005.07813},
  year   = {2021}
}
R2 v1 2026-06-23T15:35:05.735Z