Impact
~47k
people reached
- 0 posts edited
- 0 helpful flags
- 598 votes cast
Jan
24 |
awarded | Popular Question |
Dec
22 |
comment |
Any PL-homology-manifold is homotopy equivalent to a manifold
You assume that S is simply connected and you should not. |
Dec
18 |
comment |
Any PL-homology-manifold is homotopy equivalent to a manifold
By the way, you say "removing a small ball from the interior of the contractible manifold gives an h-cobordism". Are you sure (I do not think it is correct). |
Dec
17 |
accepted | Any PL-homology-manifold is homotopy equivalent to a manifold |
Dec
17 |
comment |
Any PL-homology-manifold is homotopy equivalent to a manifold
Thank you very much. By the way, the question was not revised — it was understood wrongly. |
Dec
16 |
revised |
Any PL-homology-manifold is homotopy equivalent to a manifold
added 706 characters in body |
Dec
15 |
comment |
Any PL-homology-manifold is homotopy equivalent to a manifold
en.wikipedia.org/wiki/Homology_manifold Please correct me if I am wrong: the link of vertex in h-manifold has to be homological sphere, so if dimension is 3 it has to be 2-sphere, so it was a manifold. |
Dec
15 |
comment |
Any PL-homology-manifold is homotopy equivalent to a manifold
Sorry, I did not get it — are you trying to say that there is a counterexample in dimension 3? — all 3-dimensional homological PL-mainifolds are manifolds, aren't they? |
Dec
14 |
revised |
Diameter of immersed surfaces with bounded from above mean curvature
added 1 character in body |
Dec
14 |
asked | Any PL-homology-manifold is homotopy equivalent to a manifold |
Dec
3 |
revised |
Diameter of immersed surfaces with bounded from above mean curvature
added 182 characters in body |
Dec
3 |
answered | Diameter of immersed surfaces with bounded from above mean curvature |
Nov
26 |
awarded | Investor |
Nov
11 |
awarded | Nice Question |
Sep
24 |
awarded | Autobiographer |
Jul
24 |
awarded | Popular Question |
Jul
2 |
awarded | Curious |
Jun
18 |
awarded | Notable Question |
May
21 |
answered | Besicovitch Covering Lemma on Manifolds |
Feb
13 |
awarded | Notable Question |