Timeline for When are Brieskorn Manifolds Homeomorphic?
Current License: CC BY-SA 3.0
10 events
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| Apr 9, 2013 at 2:16 | comment | added | user02138 | By the way, thank you for the detailed answer! | |
| Apr 9, 2013 at 2:11 | comment | added | user02138 | where $g = \frac{1}{2}(\frac{d}{\tau} - l) + 1$ Thanks for catching my sign error! | |
| Apr 9, 2013 at 2:09 | comment | added | user02138 | According to Neumann and Raymond (section 1 in "Seifert Manifolds, Plumbing...", $g$ is the genus of Seifert surface $\Sigma(a,b,c)/S^{1}$. | |
| Apr 9, 2013 at 0:48 | history | edited | Misha | CC BY-SA 3.0 |
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| Apr 9, 2013 at 0:16 | history | edited | Misha | CC BY-SA 3.0 |
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| Apr 8, 2013 at 20:25 | history | edited | Misha | CC BY-SA 3.0 |
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| Apr 8, 2013 at 19:24 | history | edited | Misha | CC BY-SA 3.0 |
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| Apr 8, 2013 at 19:17 | comment | added | Misha | user02138: You are right, I was too hasty. I will update my answer accordingly. | |
| Apr 8, 2013 at 18:42 | comment | added | user02138 | Hi Misha, thanks for the answer. Example 2 after Theorem 7.3 states that Σ(2,9,18) and Σ(3,5,15) are diffeomorphic. Doesn't this imply a homeomorphism since they are $3$-manifolds as smooth $S^1$-bundles with equal chern number over Riemann surfaces of the same Euler characteristic (and genus)? Doesn't this refute your comment about the triples necessarily being equal? | |
| Apr 8, 2013 at 18:31 | history | answered | Misha | CC BY-SA 3.0 |