NewEvery arXiv paper, its researchers & institutions — mapped.
paper

On the decomposition of random hypergraphs

arXiv:1510.04814

Abstract

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

corrected few typos. updated the reference