English

Constructions of regular sparse anti-magic squares

Combinatorics 2020-02-20 v2

Abstract

Graph labeling is a well-known and intensively investigated problem in graph theory. Sparse anti-magic squares are useful in constructing vertex-magic labeling for graphs. For positive integers n,dn,d and d<nd<n, an n×nn\times n array AA based on {0,1,,nd}\{0,1,\cdots,nd\} is called \emph{a sparse anti-magic square of order nn with density dd}, denoted by SAMS(n,d)(n,d), if each element of {1,2,,nd}\{1,2,\cdots,nd\} occurs exactly one entry of AA, and its row-sums, column-sums and two main diagonal sums constitute a set of 2n+22n+2 consecutive integers. An SAMS(n,d)(n,d) is called \emph{regular} if there are exactly dd positive entries in each row, each column and each main diagonal. In this paper, we investigate the existence of regular sparse anti-magic squares of order n1,5(mod6)n\equiv1,5\pmod 6, and it is proved that for any n1,5(mod6)n\equiv1,5\pmod 6, there exists a regular SAMS(n,d)(n,d) if and only if 2dn12\leq d\leq n-1.

Keywords

Cite

@article{arxiv.2002.07357,
  title  = {Constructions of regular sparse anti-magic squares},
  author = {Guangzhou Chen and Wen Li and Ming Zhong and Bangying Xin},
  journal= {arXiv preprint arXiv:2002.07357},
  year   = {2020}
}

Comments

18 pages

R2 v1 2026-06-23T13:44:51.033Z