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The Rado Graph, sometimes also known as the (countable) Random Graph, can be generated almost surely by putting an edge between any pair of vertices with some fixed probability p (0, 1), independently of other pairs. In this article, we study the influence of allowing different probabilities for each pair of vertices. More specifically, we characterize for which sequences (pₙ) ₍ ₍ of values in 0, 1 there exists a bijection f from pairs of vertices in N to N such that if we put an edge between v and w with probability p₅ (\ₕ, ₖ\), independently of other pairs, then the Random Graph arises almost surely.
Coregliano et al. (Sat,) studied this question.
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