Natural boundary and zero distribution of random polynomials in smooth domains

Abstract

We consider the zero distribution of random polynomials of the form Pn(z) = Σk=0n ak Bk(z), where \ak\k=0∞ are non-trivial i.i.d. complex random variables with mean 0 and finite variance. Polynomials \Bk\k=0∞ are selected from a standard basis such as Szego, Bergman, or Faber polynomials associated with a Jordan domain G whose boundary is C2, α smooth. We show that the zero counting measures of Pn converge almost surely to the equilibrium measure on the boundary of G. We also show that if \ak\k=0∞ are i.i.d. random variables, and the domain G has analytic boundary, then for a random series of the form f(z) =Σk=0∞ak Bk(z), ∂G is almost surely a natural boundary for f(z).