Mathematics – Complex Variables
Scientific paper
2002-06-17
Int. Math. Res. Not. 2003, 25-49.
Mathematics
Complex Variables
19 pages, 3 figures
Scientific paper
We consider ensembles of random polynomials of the form $p(z)=\sum_{j = 1}^N a_j P_j$ where $\{a_j\}$ are independent complex normal random variables and where $\{P_j\}$ are the orthonormal polynomials on the boundary of a bounded simply connected analytic plane domain $\Omega \subset C$ relative to an analytic weight $\rho(z) |dz|$. In the simplest case where $\Omega$ is the unit disk and $\rho=1$, so that $P_j(z) = z^j$, it is known that the average distribution of zeros is the uniform measure on $S^1$. We show that for any analytic $(\Omega, \rho)$, the zeros of random polynomials almost surely become equidistributed relative to the equilibrium measure on $\partial\Omega$ as $N\to\infty$. We further show that on the length scale of 1/N, the correlations have a universal scaling limit independent of $(\Omega, \rho)$.
Shiffman Bernard
Zelditch Steve
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