Optimal packings of Hamilton cycles in sparse random graphs
arXiv:1109.5341
Abstract
We prove that there exists a positive constant εsuch that if \log n / n \le p \le n^{-1+ε}, then asymptotically almost surely the random graph G ~ G(n,p) contains a collection of \lfloor δ(G)/2 \rfloor edge-disjoint Hamilton cycles.
19 pages