On Zeroes of Random Polynomials and Applications to Unwinding

Abstract

Let μ be a probability measure in C with a continuous and compactly supported density function, let z1, …, zn be independent random variables, zi μ, and consider the random polynomial pn(z) = Πk=1n(z - zk). We determine the asymptotic distribution of \z ∈ C: pn(z) = pn(0)\. In particular, if μ is radial around the origin, then those solutions are also distributed according to μ as n → ∞. Generally, the distribution of the solutions will reproduce parts of μ and condense another part on curves. We use these insights to study the behavior of the Blaschke unwinding series on random data.