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Hankel determinants and meromorphic functions
Published online by Cambridge University Press: 26 February 2010
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Let G be a plane domain with ∞ ∊ G. Let E be the compact complement of G and cap E the logarithmic capacity. We shall assume that cap E = 1 and E ⊂ {|Z| ≤ R. Then R ≥ 1, with equality if and only if E is a closed disc.
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- Copyright © University College London 1969
References
1.Cantor, D. G., “Power series with integral coefficients”, Bull. Amer. Math. Soc, 69 (1963), 362–366.CrossRefGoogle Scholar
2.Edrei, A., “Sur les déterminants recurrents et les singularity d'une fonction donnee par son développement de Taylor”, Compositio Math., 7 (1939), 1–69.Google Scholar
3.Grunsky, H., “Koeffizientenbedingungen für schlicht abbildende meromorphe Funktionen”, Math. Zeit., 45 (1939), 29–61.CrossRefGoogle Scholar
4.Hadamard, J., “Essai sur l'étude des fonctions donnée par leurs développement de Taylor”, J. de Math, (4), 9 (1892), 171–215.Google Scholar
5.Pólya, G., “Über gewisse notwendige Determinantenkriterien für die Fortsetzbarkeit einer Potenzreihe”, Math. Ann., 99 (1928), 687–706.CrossRefGoogle Scholar
6.Polya, G. and Szegö, G., Aufgaben und Lehrsätze aus der Analysis, Vol. II (Berlin, 1925).Google Scholar
7.Pommerenke, Ch., “Über die Faberschen Polynome schlichter Funktionen”, Math. Zeit., 85 (1964), 197–208.CrossRefGoogle Scholar
8.Warschawski, S. E., “On differentiability at the boundary in conformal mapping”, Proc. Amer. Math. Soc, 12 (1961), 614–620.CrossRefGoogle Scholar
9.Wilson, R., “An extension of the Hadamard-Polya determinantal criteria for uniform functions”, Proc. London Math. Soc. (2), 39 (1935), 363–371.CrossRefGoogle Scholar
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