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I agree strongly with Peter in the comments: if you're interested in $p \gg \frac{\log n}{n}$, then don't do any hard work, just show the answer is essentially $p$ since the graph is essentially alway …

whether there is an elementary proof that almost all simple graphs are very small world networks Following up on Brendan McKay's comment. The chance that an Edos-Renyi$(0.5,n)$ graph has diameter …

Here's one. You can think of the graph construction process as gradually building a set $S$ of vertices that have been touched so far, beginning with a random two vertices. Let $S_k$ be the set of the …

Just an amateur answer, I would assume there's a paper or known approach out there from experts. I would partition the vertices into equal sets $U,V$ and delete edges to make it a bipartite graph. It …