Atlas: Groups of QC homeomorphisms on Riemann surfaces by Tatsuhiko Yagasaki

Atlas home || Conferences | Abstracts | about Atlas

International Conference on Topology and its Applications
August 23-27, 1999
Kanagawa University
Yokohama, Japan

Organizers
Yukinobu Yajima, the chairman, Masami Sakai, the vice-chairman, Yoshihiro Abe, Kazuhiro Sakai, Toshiji Terada, Kenichi Tamano, Akio Kato, Takao Hoshina, Hisao Kato, Kazuhiro Kawamura, Akira Koyama, Tsugunori Nogura

View Abstracts
Conference Homepage

Groups of QC homeomorphisms on Riemann surfaces
by
Tatsuhiko Yagasaki
Kyoto Institute of Technology

We investigate the topological types of groups of quasiconformal (QC) homeomorphisms on Riemann surfaces with the compact-open topology. Suppose M is a connected Riemann surface. Let H(M) denote the homeomorphism group of M and H^(L)QC(M) denote the subgroup of (locally) QC homeomorphisms of M. The superscript + means orientation preserving and 0 denotes the identity connected component of the corresponding group.

Main Theorem
(i) If M is compact, then (H(M)₊, H^QC(M)) is an (s, Sigma)-manifold.
(ii) If M is noncompact, then (H(M)₀, H^LQC(M)₀, H^QC(M)₀) is an (s^infinity, Sigma^infinity, Sigma^infinity_f)-manifolds.

Corollary
(H(M)₀, H^QC(M)₀) is homeomorphic to the product of (s, Sigma) and N, where N is defined as follows:
Compact case : g = the genus of M.
(i) If g = 0 then N = SO(3), (ii) If g = 1 then N = the torus, (iii) If g >= 2 then N = 1 point.
Noncompact case :
(i) If M = R² or R^2 - 1 pt, then N = the circle, (ii) otherwise N = 1 pt.

Date received: July 22, 1999