English

On an Extremal Hypergraph Problem Related to Combinatorial Batch Codes

Discrete Mathematics 2012-10-05 v4 Combinatorics

Abstract

Let n,r,kn, r, k be positive integers such that 3k<n3\leq k < n and 2rk12\leq r \leq k-1. Let m(n,r,k)m(n, r, k) denote the maximum number of edges an rr-uniform hypergraph on nn vertices can have under the condition that any collection of ii edges, span at least ii vertices for all 1ik1 \leq i \leq k. We are interested in the asymptotic nature of m(n,r,k)m(n, r, k) for fixed rr and kk as nn \rightarrow \infty. This problem is related to the forbidden hypergraph problem introduced by Brown, Erd\H{o}s, and S\'os and very recently discussed in the context of combinatorial batch codes. In this short paper we obtain the following results. {enumerate}[(i)] Using a result due to Erd\H{o}s we are able to show m(n,k,r)=o(nr)m(n, k, r) = o(n^r) for 7k7\leq k, and 3rk1logk3 \leq r \leq k-1-\lceil\log k \rceil. This result is best possible with respect to the upper bound on rr as we subsequently show through explicit construction that for 6k6 \leq k, and klogkrk1,m(n,r,k)=Θ(nr)k-\lceil \log k \rceil \leq r \leq k-1, m(n, r, k) = \Theta(n^r). This explicit construction improves on the non-constructive general lower bound obtained by Brown, Erd\H{o}s, and S\'os for the considered parameter values. For 2-uniform CBCs we obtain the following results. {enumerate} We provide exact value of m(n,2,5)m(n, 2, 5) for n5n \geq 5. Using a result of Lazebnik,et al. regarding maximum size of graphs with large girth, we improve the existing lower bound on m(n,2,k)m(n, 2, k) (Ω(nk+1k1)\Omega(n^{\frac{k+1}{k-1}})) for all k8k \geq 8 and infinitely many values of nn. We show m(n,2,k)=O(n1+1k4)m(n, 2, k) = O(n^{1+\frac{1}{\lfloor\frac{k}{4}\rfloor}}) by using a result due to Bondy and Simonovits, and also show m(n,2,k)=Θ(n3/2)m(n, 2, k) = \Theta(n^{3/2}) for k=6,7,8k = 6, 7, 8 by using a result of K\"{o}vari, S\'os, and Tur\'{a}n.

Keywords

Cite

@article{arxiv.1206.1996,
  title  = {On an Extremal Hypergraph Problem Related to Combinatorial Batch Codes},
  author = {Niranjan Balachandran and Srimanta Bhattacharya},
  journal= {arXiv preprint arXiv:1206.1996},
  year   = {2012}
}

Comments

9 pages

R2 v1 2026-06-21T21:16:54.878Z