English

On the decomposition of random hypergraphs

Combinatorics 2015-11-10 v2

Abstract

For an rr-uniform hypergraph HH, let f(H)f(H) be the minimum number of complete rr-partite rr-uniform subhypergraphs of HH whose edge sets partition the edge set of HH. For a graph GG, f(G)f(G) is the bipartition number of GG which was introduced by Graham and Pollak in 1971. In 1988, Erd\H{o}s conjectured that if GG(n,1/2)G \in G(n,1/2), then with high probability f(G)=nα(G)f(G)=n-\alpha(G), where α(G)\alpha(G) is the independence number of GG. This conjecture and related problems have received a lot of attention recently. In this paper, we study the value of f(H)f(H) for a typical rr-uniform hypergraph HH. More precisely, we prove that if (logn)2.001/np1/2(\log n)^{2.001}/n \leq p \leq 1/2 and HH(r)(n,p)H \in H^{(r)}(n,p), then with high probability f(H)=(1π(Kr(r1))+o(1))(nr1)f(H)=(1-\pi(K^{(r-1)}_r)+o(1))\binom{n}{r-1}, where π(Kr(r1))\pi(K^{(r-1)}_r) is the Tur\'an density of Kr(r1)K^{(r-1)}_r.

Keywords

Cite

@article{arxiv.1510.04814,
  title  = {On the decomposition of random hypergraphs},
  author = {Xing Peng},
  journal= {arXiv preprint arXiv:1510.04814},
  year   = {2015}
}

Comments

corrected few typos. updated the reference

R2 v1 2026-06-22T11:22:02.665Z