Equidistribution of zeros of random polynomials
Abstract
We study the asymptotic distribution of zeros for the random polynomials Pn(z) = Σk=0n Ak Bk(z), where \Ak\k=0∞ are non-trivial i.i.d. complex random variables. Polynomials \Bk\k=0∞ are deterministic, and are selected from a standard basis such as Szego, Bergman, or Faber polynomials associated with a Jordan domain G bounded by an analytic curve. We show that the zero counting measures of Pn converge almost surely to the equilibrium measure on the boundary of G if and only if E[+|A0|]<∞.
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