Almost-spanning universality in random graphs
Abstract
A graph G is said to be H(n,)-universal if it contains every graph on n vertices with maximum degree at most . It is known that for any > 0 and any natural number there exists c > 0 such that the random graph G(n,p) is asymptotically almost surely H((1-)n,)-universal for p ≥ c ( n/n)1/. Bypassing this natural boundary, we show that for ≥ 3 the same conclusion holds when p = ω(n-1-15 n).
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