Multitrees in random graphs

Abstract

Let N=n2 and s≥ 2. Let ei,j,\,i=1,2,…,N,\,j=1,2,…,s be s independent permutations of the edges E(Kn) of the complete graph Kn. A MultiTree is a set I⊂eq [N] such that the edge sets EI,j induce spanning trees for j=1,2,…,s. In this paper we study the following question: what is the smallest m=m(n) such that w.h.p. [m] contains a MultiTree. We prove a hitting time result for s=2 and an O(n n) bound for s≥ 3.

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