Sharp threshold for the Ising perceptron model
Abstract
Consider the discrete cube \-1,1\N and a random collection of half spaces which includes each half space H(x) := \y ∈ \-1,1\N: x · y ≥ N\ for x ∈ \-1,1\N independently with probability p. Is the intersection of these half spaces empty? This is called the Ising perceptron model under Bernoulli disorder. We prove that this event has a sharp threshold; that is, the probability that the intersection is empty increases quickly from ε to 1- ε when p increases only by a factor of 1 + o(1) as N ∞.
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