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Siberian Mathematical Journal

, Volume 25, Issue 2, pp 289–296 | Cite as

Best approximations by rational functions with a fixed number of poles

  • K. N. Lungu
Article

Keywords

Rational Function Fixed Number 
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Literature Cited

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    K. N. Lungu, “On the best approximations by rational functions with a fixed number of poles,” Mat. Sb.,86, No. 2, 314–324 (1971).Google Scholar
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    K. N. Lungu, “On the best approximations by rational functions with a fixed number of poles,” Tr. MIEM: Mat. Analiz i Ego Prilozhen., No. 53, 67–85 (1975).Google Scholar
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    A. A. Gonchar, “The rate of rational approximation and the property of univalence of an analytic function in the neighborhood of an isolated singular point,” Mat. Sb.,94, No. 2, 265–282 (1974).Google Scholar
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    A. A. Gonchar, “Growth estimates of rational functions and some of their applications,” Mat. Sb.,72, No. 3, 489–503 (1967).Google Scholar
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    S. Stoilov (S. Stoilow), The Theory of Functions of a Complex Variable [Russian translation], Vol. II, IL, Moscow (1962).Google Scholar
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    A. A. Gonchar, “The problem of E. I. Zolotarev, connected with rational functions,” Mat. Sb.,78, No. 4, 640–654 (1969).Google Scholar
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    J. L. Walsh, Interpolation and Approximation by Rational Functions in the Complex Domain, Am. Math. Soc., Providence (1956).Google Scholar

Copyright information

© Plenum Publishing Corporation 1984

Authors and Affiliations

  • K. N. Lungu

There are no affiliations available

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