English version: Proceedings of the Steklov Institute of Mathematics, 1974, 100, 1–91. Bibliographic databases: UDC: 51. 2.

English version: Proceedings of the Steklov Institute of Mathematics, 1974, 100, 1–91. Citation: P. K. Suetin, Polynomials orthogonal over a region and Bieberbach polynomials, Trudy Mat. Inst. 100, 1971, 3–90; Proc. Bibitem{Sue71} by . Suetin paper Polynomials orthogonal over a region and Bieberbach polynomials serial Trudy Mat. 30034} transl jour Proc.

Each issue contains a collection of articles pertaining to one or several related topics. The authors of many articles are affiliated with the Steklov Mathematical Institute of the Russian Academy of Sciences. Proceedings of the Steklov Institute of Mathematics also publishes monographs on topical problems in mathematics.

Polynomials orthogonal over regions and Bieberbach polynomials, translated from the Russian by R. P. Boas. In: Proceedings of the Steklov Institute of Mathematics, No. 100 (1971). American Mathematical Society, Providence (1974)Google Scholar. 31. Szegő, . Orthogonal Polynomials. American Mathematical Society, New York (1939)zbMATHGoogle Scholar. 32. Van den Berg, . Buttazzo, . Velichkov, . Optimization problems involving the first Dirichlet eigenvalue and the torsional rigidity, new trends in shape optimization.

Proceedings of the Steklov Institute of Mathematics 1974; 91 pp; Softcover MSC: Primary 33. .Polynomials Orthogonal over a Region and Bieberbach Polynomials.

Polynomials Orthogonal over a Region and Bieberbach Polynomials. Base Product Code Keyword List: steklo; STEKLO; steklo/100; STEKLO/100; steklo-100; STEKLO-100. Print Product Code: STEKLO/100. Title (HTML): Polynomials Orthogonal over a Region and Bieberbach Polynomials.

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PDF GENERAL BIEBERBACH POLYNOMIALS For a finite Borel . K-bounded polynomials. July 1998 · Mathematical Proceedings of the Royal Irish Academy.

PDF GENERAL BIEBERBACH POLYNOMIALS For a finite Borel measure µ and a point λ ∈ C we define the analogue of the Bieberbach polynomial π n as a solution of a suitable extremal problem  .

Wu Xue-mou, "On Bieberbach polynomials", Acta Math. Suetin, "Polynomials orthogonal over a region and Bieberbach polynomials", Trudy Mat. Sinica, 13 1963, 145–151; English transl. 100 1971; English transl. I. B. Simonenko, "The Riemann boundary-value problem for n pairs of functions with measurable coefficients and its application to the study of singular integrals in Lp spaces with weights", Izv. Akad.

Institute of Mathematics is a cover-to-cover translation of the Trudy Matematicheskogo Instituta imeni .

Proceedings of the Steklov Institute of Mathematics is a cover-to-cover translation of the Trudy Matematicheskogo Instituta imeni . Steklova of the Russian Academy of Sciences. Each issue ordinarily contains either one book-length article or a collection of articles pertaining to the same topic. Join the conversation about this journal. The set of journals have been ranked according to their SJR and divided into four equal groups, four quartiles. Q1 (green) comprises the quarter of the journals with the highest values, Q2 (yellow) the second highest values, Q3 (orange).

Steklov Institute of Mathematics or Steklov Mathematical Institute (Russian: Математический институт имени . The institute is named after Vladimir Andreevich Steklov, who in 1919 founded the Institute of Physics and Mathematics in Leningrad.

Series: Proceedings of the Steklov Institute of Mathematics (Book 112). Paperback: 399 pages. Publisher: Amer Mathematical Society (December 31, 1973).