English

Sandwiching biregular random graphs

Combinatorics 2021-10-04 v3 Probability

Abstract

Let G(n,n,m)G(n,n,m) be a uniformly random mm-edge subgraph of the complete bipartite graph Kn,nK_{n,n} with bipartition (V1,V2)(V_1, V_2), where ni=Vin_i = |V_i|. Given a real number p[0,1]p \in [0,1] such that d1:=pn2d_1 := pn_2 and d2:=pn1d_2 := pn_1 are integers, let R(n,n,p)R(n,n,p) be a random subgraph of Kn,nK_{n,n} such that every vViv \in V_i has degree did_i, for i=1,2i = 1, 2. In this paper we determine sufficient conditions on n1,n2,pn_1,n_2,p, and mm under which one can embed G(n,n,m)G(n,n,m) into R(n,n,p)R(n,n,p) and vice versa with probability tending to 11. In particular, in the balanced case n1=n2n_1 = n_2, we show that if plogn/np \gg \log n/n and 1p(logn/n)1/41 - p \gg \left(\log n/n \right)^{1/4}, then for some mpn2m \sim pn^2, asymptotically almost surely one can embed G(n,n,m)G(n,n,m) into R(n,n,p)R(n,n,p), while for p(log3n/n)1/4p \gg \left(\log^{3} n/n\right)^{1/4} and 1plogn/n1-p \gg \log n/n we have the opposite embedding. As an extension, we confirm the Kim--Vu Sandwich Conjecture for degrees growing faster than (nlogn)3/4(n \log n)^{3/4}.

Keywords

Cite

@article{arxiv.2010.15751,
  title  = {Sandwiching biregular random graphs},
  author = {Tereza Klimošová and Christian Reiher and Andrzej Ruciński and Matas Šileikis},
  journal= {arXiv preprint arXiv:2010.15751},
  year   = {2021}
}

Comments

Added extension to non-bipartite regular graphs

R2 v1 2026-06-23T19:45:09.760Z