Random Sums of Weighted Orthogonal Polynomials in Cd

Abstract

We consider random polynomials of the form Gn(z):= Σ|α|≤ n (n)αpn,α(z) where \(n)α\|α|≤ n are i.i.d. (complex) random variables and \pn,α\|α|≤ n form a basis for Pn, the holomorphic polynomials of degree at most n in Cd. In particular, this includes the setting where \pn,α\ are orthonormal in a space L2(e-2n Q τ), where τ is a compactly supported Bernstein-Markov measure and Q is a continuous weight function. Under an optimal moment condition on the random variables \(n)α\, in dimension d=1 we prove convergence in probability of the zero measure to the weighted equilibrium measure, and in dimension d 2 we prove convergence of zero currents.

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