Constructive description of analytic functions of the Hölder class

1. G. A. Alibekov and A. A. Kurbanov, “A stricter version of a Mergelyan Theorem on approximation of complex functions in domains with a smooth boundary,” in: Investigations in Function Approximation Theory and Its Applications [in Russian], Institute of Mathematics, Academy of Sciences of the Ukrainian SSR, Kiev (1978), pp. 3–15.

   Google Scholar 

2. S. N. Mergelyan, “Some problems in the constructive function theory,” Trudy MIANT,37, Nauka, Moscow (1951), pp. 1–91.

   Google Scholar 

3. V. K. Dzyadyk, Introduction to the Theory of Uniform Approximation of Function with Polynomials [in Russian], Nauka, Moscow (1977).

   Google Scholar 

4. V. K. Dzyadyk and G. A. Alibekov, “Linear methods of summation of Faber series in domains with a piecewise smooth boundary,” in: Theory of Function Approximation [in Russian], Proceedings of International Conference on Function Approximation, Kiev, May 31–June 5, 1983, Nauka, Moscow (1987), pp. 150–151.

   Google Scholar 

5. S. Ya. Al'per, “Uniform approximations of functions of a complex variable in a closed domain,” Izv. Akad. Nauk USSR, Ser. Math.,19, 423–444 (1955).

   Google Scholar 

6. I. I. Privalov, Boundary Properties of Analytic Functions [in Russian], GITTL, Moscow, Leningrad (1950).

   Google Scholar 

7. G. Alexits, “On the order of approximation by the Cesàro means of Fourier series,” in: G. Alexits, Approximation Theory (Selected Papers), Akadémiai Kiadó, Budapest (1983), pp. 41–50.

   Google Scholar 

8. V. I. Smirnov and N. A. Lebedev, Constructive Theory of Functions of Complex Variable [in Russian], Nauka, Moscow-Leningrad (1964).

   Google Scholar 

9. E. Landau and D. Gaier, Darstellung and Begründung eniger neuerer Ergebnisse der Funktionentheorie, Springer-Verlag, Berlin (1986).

   Google Scholar 

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