English

Spanning universality in random graphs

Combinatorics 2017-07-26 v1

Abstract

A graph is said to be H(n,Δ)\mathcal{H}(n, \Delta)-universal if it contains every graph on nn vertices with maximum degree at most Δ\Delta. Using a `matching-based' embedding technique introduced by Alon and F\"uredi, Dellamonica, Kohayakawa, R\"odl and Ruci\'nski showed that the random graph Gn,pG_{n,p} is asymptotically almost surely H(n,Δ)\mathcal{H}(n, \Delta)-universal for p=Ω~(n1/Δ)p = \tilde \Omega(n^{-1/\Delta}) - a threshold for the property that every subset of Δ\Delta vertices has a common neighbour. This bound has become a benchmark in the field and many subsequent results on embedding spanning structures of maximum degree Δ\Delta in random graphs are proven only up to this threshold. We take a step towards overcoming limitations of former techniques by showing that Gn,pG_{n,p} is almost surely H(n,Δ)\mathcal{H}(n, \Delta)-universal for p=Ω~(n1/(Δ1/2))p = \tilde \Omega(n^{- 1/(\Delta-1/2)}).

Keywords

Cite

@article{arxiv.1707.07914,
  title  = {Spanning universality in random graphs},
  author = {Asaf Ferber and Rajko Nenadov},
  journal= {arXiv preprint arXiv:1707.07914},
  year   = {2017}
}
R2 v1 2026-06-22T20:56:38.607Z