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Critical Measures, Quadratic Differentials, and Weak Limits of Zeros of Stieltjes Polynomials
Abstract: We investigate the asymptotic zero distribution of Heine-Stieltjes polynomials -polynomial solutions of a second order differential equations with complex polynomial coefficients. In the case when all zeros of the leading coefficients are all real, zeros of the Heine-Stieltjes polynomials were interpreted by Stieltjes as discrete distributions minimizing an energy functional. In a general complex situation one deals instead with a critical point of the energy. We introduce the notion of discrete and continuous…
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Cited by 104 publications
(208 citation statements)
References 99 publications
(137 reference statements)
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“…Much of the research in the past several years has focused on the asymptotic properties of the zeros of Stieltjes and Van Vleck polynomials as the degree of the corresponding Stieltjes polynomials tends toward infinity [4,3,16,14,15,20,21]. Interlacing theorems such as the one above are interesting, not only for what they tell us about the zeros for a finite degree, but also because they help us to understand such asymptotic limits.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…Much of the research in the past several years has focused on the asymptotic properties of the zeros of Stieltjes and Van Vleck polynomials as the degree of the corresponding Stieltjes polynomials tends toward infinity [4,3,16,14,15,20,21]. Interlacing theorems such as the one above are interesting, not only for what they tell us about the zeros for a finite degree, but also because they help us to understand such asymptotic limits.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…We calculate explicitly these constants, which turn out to be different for l = 1. Therefore the density ρ(z) for l = 1 is not an equilibrium density, but a critical density in the sense of Martínez-Finkelshtein and Rakhmanov [18]. We also show that the total electrostatic energy…”
Section: Introductionmentioning
confidence: 69%
“…This relation shows that dµ(z) is a continuous critical measure on C in the sense of Martínez-Finkelshtein and Rakhmanov [18]. As a consequence (see Lemma 5.2 of [18] and Proposition 3.8 of [19]), the support γ of ρ(z) is a union of a finite number of analytic arcs…”
Section: Critical Densitiesmentioning
confidence: 80%
“…Рахманову (см. [6], а также [7], [1]) в настоящее время выглядит коротко и прозрачно. Известно, что в классе (1.7) компакт минимальной ёмкости (1.10)…”
Section: необходимые понятияunclassified
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