English

Odd Covers of Graphs

Combinatorics 2022-02-22 v1

Abstract

Given a finite simple graph GG, an odd cover of GG is a collection of complete bipartite graphs, or bicliques, in which each edge of GG appears in an odd number of bicliques and each non-edge of GG appears in an even number of bicliques. We denote the minimum cardinality of an odd cover of GG by b2(G)b_2(G) and prove that b2(G)b_2(G) is bounded below by half of the rank over F2\mathbb{F}_2 of the adjacency matrix of GG. We show that this lower bound is tight in the case when GG is a bipartite graph and almost tight when GG is an odd cycle. However, we also present an infinite family of graphs which shows that this lower bound can be arbitrarily far away from b2(G)b_2(G). Babai and Frankl (1992) proposed the "odd cover problem," which in our language is equivalent to determining b2(Kn)b_2(K_n). Radhakrishnan, Sen, and Vishwanathan (2000) determined b2(Kn)b_2(K_n) for an infinite but density zero subset of positive integers nn. In this paper, we determine b2(Kn)b_2(K_n) for a density 3/83/8 subset of the positive integers.

Keywords

Cite

@article{arxiv.2202.09822,
  title  = {Odd Covers of Graphs},
  author = {Calum Buchanan and Alexander Clifton and Eric Culver and Jiaxi Nie and Jason O'Neill and Puck Rombach and Mei Yin},
  journal= {arXiv preprint arXiv:2202.09822},
  year   = {2022}
}
R2 v1 2026-06-24T09:46:30.497Z