Sums of random polynomials with differing degrees

Abstract

Let μ and be probability measures in the complex plane, and let p and q be independent random polynomials of degree n, whose roots are chosen independently from μ and , respectively. Under assumptions on the measures μ and , the limiting distribution for the zeros of the sum p+q was by computed by Reddy and the third author [J. Math. Anal. Appl. 495 (2021) 124719] as n ∞. In this paper, we generalize and extend this result to the case where p and q have different degrees. In this case, the logarithmic potential of the limiting distribution is given by the pointwise maximum of the logarithmic potentials of μ and , scaled by the limiting ratio of the degrees of p and q. Additionally, our approach provides a complete description of the limiting distribution for the zeros of p + q for any pair of measures μ and , with different limiting behavior shown in the case when at least one of the measures fails to have a logarithmic moment.

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