quotient group of a closed surface is a closed surface
- From: "Li Yi" <liyi.cn@xxxxxxxxx>
- Date: 28 Feb 2006 21:43:11 -0800
Let G be a finite group acting freely on a closed surface S. Show that
S/G is a closed surface.
How to show that each point of S/G has a neighbourhood homeomorphic to
R^2?
Give an example that S is orientable but S/G is not.
.
- Follow-Ups:
- Re: quotient group of a closed surface is a closed surface
- From: W. Dale Hall
- Re: quotient group of a closed surface is a closed surface
- Prev by Date: Re: Quadratic Forms Question - HELP !!!!!!!!!!!!!
- Next by Date: The math of CRC functions
- Previous by thread: A question on C^infinity functions
- Next by thread: Re: quotient group of a closed surface is a closed surface
- Index(es):
