On the Distribution of Complex Roots of Random Polynomials with Heavy-tailed Coefficients
Abstract
Consider a random polynomial Gn(z)=nzn+...+1z+0 with i.i.d. complex-valued coefficients. Suppose that the distribution of (1+(1+|0|)) has a slowly varying tail. Then the distribution of the complex roots of Gn concentrates in probability, as n∞, to two centered circles and is uniform in the argument as n∞. The radii of the circles are |0/τ|1/τ and |τ/n|1/(n-τ), where τ denotes the coefficient with the maximum modulus.
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