Current topics in analytic function theory
Author(s)
Bibliographic Information
Current topics in analytic function theory
World Scientific, c1992
Available at 20 libraries
Description and Table of Contents
Description
This volume is a collection of research-and-survey articles by eminent and active workers around the world on the various areas of current research in the theory of analytic functions.Many of these articles emerged essentially from the proceedings of, and various deliberations at, three recent conferences in Japan and Korea: An International Seminar on Current Topics in Univalent Functions and Their Applications which was held in August 1990, in conjunction with the International Congress of Mathematicians at Kyoto, at Kinki University in Osaka; An International Seminar on Univalent Functions, Fractional Calculus, and Their Applications which was held in October 1990 at Fukuoka University; and also the Japan-Korea Symposium on Univalent Functions which was held in January 1991 at Gyeongsang National University in Chinju.
Table of Contents
- Univalent logharmonic extensions onto the unit disk or onto an annulus, Z. Abdulhadi and W. Hengartner
- hypergeometric functions and elliptic integrals, G.D. Anderson et al
- a certain class of caratheodory functions defined by conditions on the circle, J. Fuka and Z.J. Jakubowski
- recent advances in the theory of zero sets of the Bergman spaces, E.A. LeBlanc
- a coefficient functional for meromorphic univalent functions, L. Liu
- spherical linear invariance and uniform local spherical convexity, W. Ma and D. Minda
- a special differential subordination and its application to univalency conditions, S.S. Miller and P.T. Mocanu
- on the Bernardi integral functions, S. Owa
- analytic solutions of a class of Briot-Bouquet differential equations, S. Owa and H.M. Srivastava
- a certain class of generalized hypergeometric functions associated with the Hardy space of analytic functions, H.M. Srivastava
- on the coefficients of the univalent functions of the Nevanlinna classes N1 and N2, P.G. Todorov.
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