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In their seminal work which initiated random graph theory Erdös and Rényi discovered that many graph properties have sharp thresholds as the number of vertices tends to infinity. We prove a conjecture of Linial that every monotone graph property has a sharp threshold. This follows from the following theorem. Let V n (p) = 0, 1 n Vₙ (p) = \0, 1\ⁿ denote the Hamming space endowed with the probability measure μ p ₚ defined by μ p (ϵ 1, ϵ 2, …, ϵ n) = p k ⋅ (1 − p) n − k ₚ (₁, ₂, , ₙ) = pᵏ (1-p) ^n-k, where k = ϵ 1 + ϵ 2 + ⋯ + ϵ n k= ₁ + ₂ + + ₙ. Let A A be a monotone subset of V n Vₙ. We say that A A is symmetric if there is a transitive permutation group Γ
Friedgut et al. (Tue,) studied this question.