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Complex Variables, Theory and Application: An International Journal Volume 21, 1993 - Issue 3-4
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Original Articles

Subordination by cesàro meansFootnoteFootnote

Stephan Ruscheweyh Mathematisches Institut, Universität Würzburg, Würzburg, D-8700, FRG
&
Luis C. Salinas Departamento de Matemática, Universidad Técnica Federico Santa Maria, Casilla 110-V, Valparaíso, Chile
Pages 279-285 | Received 14 Oct 1991, Published online: 29 May 2007

References

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  • Egerváry , E. 1937 . Abbildungscigenschaften der arithmetischen Mittel der geometrischen Reihe . Math. Z , 42 : 221 – 230 .
  • eEJér , L. 1934 . On new properties of the arithmetical means of the partial sums of Fourier series . J. Math.Phys , 13 : 1 – 11 .
  • Lewis , J. 1979 . Applications of a convolution theorem to Jacobi polynomials . SLAM J. Math. Anal. , 19 : 1110 – 1120 .
  • Pommerenke , C. 1965 . Über die Subordination analytischer Funktionen . J. reine angew. Math. , 218 : 159 – 173 .
  • Robertson , M. S. 1936 . On the univalency of Cesàro sums of univalent functions . Bull. Amer. Math. Soc. , 42 : 241 – 243 .
  • Robertson , M. S. 1969 . Power series with multiply monotonic coefficients . Michigan Math. J. , 16 : 32 – 31 .
  • Ruscheweyh , St. 1982 . “ Convolutions in geometric function theory ” . In Séminaire de Mathématiques Supérieures, NATO Advanced Study Institute , Vol. 83 , 166 Les Presses de l'Université de Montréal .
  • Ruscheweyh , St. 1982 . Geometric properties of the Cesáro means . Results in Mathematics , 83 to appear
  • Ruscheweyh , St. and Sheil-Small , T. B. 1973 . Hadamard Products of Schlicht Functions and the Póiya-Schoenberg Conjecture . Commentarü Math. Helvetici , 48 : 119 – 135 .
  • Schaeffer , A. C. and Spencer , D. C. 1950 . Coefficient regions for Schlicht functions . Amer: Muth. Soc.Colloquium Puhiications , 23 : 309

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