Estimates of the derivative of a Cauchy-type integral with meromorphic density and their applications

  • A. A. Pekarskii
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Literature cited

  1. 1.
    I. I. Danilyuk, Nonregular Boundary Value Problems in the Plane [in Russian], Nauka, Moscow (1975).Google Scholar
  2. 2.
    I. I. Privalov, Boundary Properties of Analytic Functions [in Russian], GITTL, Moscow-Leningrad (1950).Google Scholar
  3. 3.
    A. P. Calderon, “Cauchy integrals on Lipschitz curves and related operators,” Proc. Nat. Acad. U.S.A.,74, No. 4, 1324–1327 (1977).Google Scholar
  4. 4.
    W. Rudin, Functional Analysis, New York (1973).Google Scholar
  5. 5.
    A. A. Gonchar and L. D. Grigoryan, “On estimates of the norm of the holomorphic constituents of a meromorphic function,” Mat. Sb.,99, No. 4, 634–638 (1976).Google Scholar
  6. 6.
    L. D. Grigoryan, “Estimates of the norm of the holomorphic constituents of meromorphic functions in domains with smooth boundary,” Mat. Sb.,100, No. 1, 156–164 (1976).Google Scholar
  7. 7.
    R. Takenaka, “On the orthogonal functions and a new formula of interpolation,” Jpn. J. Math.,2, 129–145 (1925).Google Scholar
  8. 8.
    M. M. Dzhrbashyan, “A contribution to the theory of Fourier series in rational functions,” Izv. Akad. Nauk Arm. SSR, Ser. Mat.,9, No. 7, 3–28 (1956).Google Scholar
  9. 9.
    A. Kh. Turetskii, The Theory of Interpolation in Problems. Part 2 [in Russian], Vyshchéishaya Shkola, Minsk (1977).Google Scholar
  10. 10.
    G. Ts. Tumarkin, “Expansion of analytic functions in series of rational functions with a given set of poles,” Izv. Akad. Nauk Arm. SSR, Ser. Mat.,14, No. 1, 9–31 (1961).Google Scholar
  11. 11.
    E. M. Dyn'kin, “On uniform approximation of functions in Jordan domains,” Sib. Mat. Zh.,18, No. 4, 775–786 (1977).Google Scholar
  12. 12.
    J. L. Walsh, Interpolation and Approximation by Rational Functions in the Complex Domain, Am. Math. Soc. (1966).Google Scholar
  13. 13.
    J. Schur, “Uber Potenzreihen, die im Innern des Einheitskrises beschrankt sind,” J. Reine Angew. Math.,147, 205–232 (1917).Google Scholar
  14. 14.
    A. A. Pekarskii, “Rational approximation and Orlicz spaces,” Dep. VINITI, No. 314–78.Google Scholar
  15. 15.
    A. A. Pekarskii, “Rational approximation of continuous functions with given modulus of continuity and modulus of variation,” Izv. Akad. Nauk BSSR, Ser. Fiz.-Mat., No. 5, 34–39 (1978).Google Scholar
  16. 16.
    V. A. Popov, “Uniform rational approximation of the class Vr and its applications,” Acta Math. Acad. Sci. Hung.,29, 119–129 (1977).Google Scholar
  17. 17.
    V. A. Popov and P. P. Petrushev, “Sharp order of best uniform approximation of convex functions by rational functions,” Mat., Sb.,103, No. 2, 285–292 (1977).Google Scholar
  18. 18.
    E. P. Dolzhenko, “Rational approximation and boundary properties of analytic functions,” Mat., Sb.,69, No. 4, 498–528 (1966).Google Scholar
  19. 19.
    E. A. Sevast'yanov, “Rational approximation and absolute convergence of Fourier series,” Mat., Sb.,107, No. 2, 227–244 (1978).Google Scholar

Copyright information

© Plenum Publishing Corporation 1982

Authors and Affiliations

  • A. A. Pekarskii
    • 1
  1. 1.Belorussian State UniversityUSSR

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