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Solutions to extremal problems in Ep space
Published online by Cambridge University Press: 22 January 2016
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Let Ω be a bounded domain (in the complex plane) whose boundary, C, consists of finitely many disjoint, rectifiable, closed Jordan curves.
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- Copyright © Editorial Board of Nagoya Mathematical Journal 1975
References
[1]
Bückner, H., Die Praktische Behandlung von Integral-Gleichungen, Springer-Verlag, Berlin, 1952.Google Scholar
[3]
Goluzin, G. M., Geometric Theory of Functions of a Complex Variable. American Mathematical Society, Providence, 1969.CrossRefGoogle Scholar
[4]
Hvedelidze, B. V., “Linear Discontinuous Boundary Problems in the Theory of Functions, Singular Integral Equations and Some of Their Applications,” Trudy Tbiliss. Mat. Inst. Razmadze
23 (1956), 3–158 (in Russian).Google Scholar
[6]
Petrovskiĭ, I. G., Lectures on the Theory of Integral Equations, Graylock Press, Rochester, 1957.Google Scholar
[7]
Rosenbloom, P. C. and Warschawski, S. E., “A Division Problem for Analytic Functions,” Seminars on Analytic Functions, Institute for Advanced Study, 1 (1958), 323–339.Google Scholar
[8]
Tumarkin, G. C. and Havison, S. Ja., “Investigation of the Properties of Extremal Functions by Means of Duality Relations in Extremal Problems for Classes of Analytic Functions in Multiply Connected Domains,” Mat. Sb. 46 (1958), 195–228 (in Russian).Google Scholar
[9]
Tumarkin, G. C. and Havinson, S. Ja., “On the Definition of Analytic Functions of Class Ep
in Multiply Connected Domains,” Uspehi Mat. Nauk
13 (1958), No. 1, 201–206 (in Russian).Google Scholar
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