Asymptotics of the Number of Components of Random Polynomial Lemniscates
Abstract
Consider a sequence of random polynomials Pn(z) = Πk=1n(z - Xk), where \Xk\k are i.i.d. random variables distributed uniformly on the unit disc D. Let Λn = \z ∈ C: |Pn(z)| < 1\ be the lemniscate of Pn, and let C(Λn) be the number of connected components of Λn. In this paper, we prove that n∞E[C(Λn)]n= γ, and identify the constant γ.
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