English

Exact values for unbalanced Zarankiewicz numbers

Combinatorics 2024-04-11 v2

Abstract

For positive integers ss, tt, mm and nn, the Zarankiewicz number Zs,t(m,n)Z_{s,t}(m,n) is defined to be the maximum number of edges in a bipartite graph with parts of sizes mm and nn that has no complete biparitite subgraph containing ss vertices in the part of size mm and tt vertices in the part of size nn. A simple argument shows that, for each t2t \geq 2, Z2,t(m,n)=(t1)(m2)+nZ_{2,t}(m,n)=(t-1)\binom{m}{2}+n when n(t1)(m2)n \geq (t-1)\binom{m}{2}. Here, for large mm, we determine the exact value of Z2,t(m,n)Z_{2,t}(m,n) in almost all of the remaining cases where n=Θ(tm2)n=\Theta(tm^2). We establish a new family of upper bounds on Z2,t(m,n)Z_{2,t}(m,n) which complement a family already obtained by Roman. We then prove that the floor of the best of these bounds is almost always achieved. We also show that there are cases in which this floor cannot be achieved and others in which determining whether it is achieved is likely a very hard problem. Our results are proved by viewing the problem through the lens of linear hypergraphs and our constructions make use of existing results on edge decompositions of dense graphs.

Keywords

Cite

@article{arxiv.2202.05507,
  title  = {Exact values for unbalanced Zarankiewicz numbers},
  author = {Guangzhou Chen and Daniel Horsley and Adam Mammoliti},
  journal= {arXiv preprint arXiv:2202.05507},
  year   = {2024}
}

Comments

26 pages, 1 figure

R2 v1 2026-06-24T09:31:39.409Z