Timeline for Is there anything special about the Riemann surface $y^2 = x(x^{10}+11x^5-1)$?
Current License: CC BY-SA 4.0
7 events
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| Apr 26, 2023 at 13:51 | history | edited | LSpice | CC BY-SA 4.0 |
Name of paper, while this is on the front page
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| Feb 29, 2012 at 16:35 | history | edited | Francesco Polizzi | CC BY-SA 3.0 |
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| Feb 29, 2012 at 15:21 | comment | added | Francesco Polizzi | Indeed, looking at Table 1 in the paper it seems that, since $\delta$ must be an integer, the only possibility in your case ($g=5$ and $A_5$-symmetry) is $\delta=(g-5)/30=0$. Then $\textrm{Aut}(G)=\mathbb{Z}_2 \times A_5$. | |
| Feb 29, 2012 at 14:20 | comment | added | Tito Piezas III | Thanks, Francesco. I see in the paper that section 4.3 and 4.4 deals with polynomial invariants for the octahedron, while 4.5 is for the icosahedral ones. | |
| Feb 29, 2012 at 13:56 | vote | accept | Tito Piezas III | ||
| Mar 1, 2012 at 14:28 | |||||
| Feb 29, 2012 at 13:20 | history | edited | Francesco Polizzi | CC BY-SA 3.0 |
deleted 1 characters in body; deleted 184 characters in body
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| Feb 29, 2012 at 10:49 | history | answered | Francesco Polizzi | CC BY-SA 3.0 |