Talk:1-manifolds
From Manifold Atlas
(Difference between revisions)
(Created page with "There is also a vaste theory for infinite group actions on the circle, see http://www.math.ethz.ch/~bgabi/ghys%20groups%20acting%20on%20the%20circle.pdf Moreover, in the conte...") |
|||
(One intermediate revision by one user not shown) | |||
Line 1: | Line 1: | ||
− | There is also a vaste theory for infinite group actions on the circle, see http://www.math.ethz.ch/~bgabi/ghys%20groups%20acting%20on%20the%20circle.pdf | + | There is also a vaste theory for infinite group actions on the circle, see this [http://www.math.ethz.ch/~bgabi/ghys%20groups%20acting%20on%20the%20circle.pdf paper of Ghys] at Gabi Ben Simon's homepage. |
Moreover, in the context of foliation theory people studied group actions on non-Hausdorff 1-manifolds. | Moreover, in the context of foliation theory people studied group actions on non-Hausdorff 1-manifolds. | ||
+ | |||
+ | From Oleg Viro: | ||
+ | In Introduction to the article 1-Manifolds I mentioned that dynamics had been left outside the scope of it. | ||
+ | While the contents of the article touches the same points as other parts of the topology of manifolds, including issues of dynamics would bring as far away from topology. |
Latest revision as of 17:39, 17 April 2013
There is also a vaste theory for infinite group actions on the circle, see this paper of Ghys at Gabi Ben Simon's homepage. Moreover, in the context of foliation theory people studied group actions on non-Hausdorff 1-manifolds.
From Oleg Viro: In Introduction to the article 1-Manifolds I mentioned that dynamics had been left outside the scope of it. While the contents of the article touches the same points as other parts of the topology of manifolds, including issues of dynamics would bring as far away from topology.