Zero distributions of derivatives of polynomial families centering on a set
Abstract
Suppose C ⊂ C is compact. Let qk be a sequence of polynomials of degree nk ∞, such that the locus of roots of all the polynomials is bounded, and the number of roots of qk in any closed set L not meeting C is uniformly bounded. Supposing that (qk)k has an asymptotic root distribution μ we provide conditions on C and μ assuring the sequence of mth derivatives (qk(m))k also has asymptotic root distribution μ for any m≥ 1. This complements recent results of Totik.
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