No.571

1985/06/27〜1985/06/29

吹田　信之

SUITA,NOBUYUKI

目　次

1. Selected results on functions of uniformly bounded characteristic(Function Spaces on Riemann Surfaces)----------------------------1

　　　　Tokyo Metropolitan University　　　山下 愼二　(Yamashita, Shinji)

　

2. Brownian Motions on Riemann Surfaces of Inverse Functions(Function Spaces on Riemann Surfaces)-----------------------------------11

　　　　Department of Mathematics, Tokyo Institute of Technology　　　柳原 宏　(YANAGIHARA, Hiroshi)

　

3. On BMO property doe potentials(Function Spaces on Riemann Surfaces)--------------------------------------------------------------16

　　　　Department of Math., Kyoto University　　　後藤 泰宏　(Gotoh, Yasuhiro)

　

4. On the Schwarzian derivatives of univalent functions and finite dimensional Teichmuller spaces(Function Spaces on Riemann Surfaces)---30

　　　　Kyoto University　　　志賀 啓成　(Shiga, Hiroshige)

　

5. ON AUGMENTED SCHOTTKY SPACES AND INTERCHANGE OPERATORS(Function Spaces on Riemann Surfaces)--------------------------------------39

　　　　Department of Mathematics, Shizuoka University　　　佐藤 宏樹　(Sato, Hiroki)

　

6. Uniformization, automorphic forms and accessory parameters(Function Spaces on Riemann Surfaces)----------------------------------54

　　　　Department of Mathematics, State University of New York　　　Kra, Irwin

　

7. Certain modulus estimate on arbitrary Riemann surfaces(Function Spaces on Riemann Surfaces)--------------------------------------85

　　　　Department of Mathematics, Kyoto University　　　谷口 雅彦　(Taniguchi, Masahiko)

　

8. On puncture variation(Function Spaces on Riemann Surfaces)----------------------------------------------------------------------100

　　　　Department of Mathematics, Tokyo Institute of Technology　　　山田 陽　(YAMADA, AKIRA)

　

9. Transitive points under the modular group and continued fractions(Function Spaces on Riemann Surfaces)--------------------------111

　　　　Department of Mathematics, Tohoku University　　　諸沢 俊介　(Morosawa, Shunsuke)

　

10. VALUATIONS ON MEROMORPHIC FUNCTIONS OF BOUNDED TYPE(Function Spaces on Riemann Surfaces)---------------------------------------122

　　　　Department of Mathematics, Nagoya Institute of Technology　　　中井 三留　(Nakai, Mitsuru)