Timeline for Is $\eta(\tau)^2$ a modular form of weight 1 on $\Gamma(12)$?
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Apr 29, 2018 at 2:53 | comment | added | Franklin Wu | Hi Jeremy, I appreciate your insights on this problem, and thank you in the paper arxiv.org/abs/1804.06860. | |
| Apr 6, 2018 at 3:19 | vote | accept | Franklin Wu | ||
| S Apr 5, 2018 at 23:42 | history | suggested | Franklin Wu | CC BY-SA 3.0 |
corrected typos
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| Apr 5, 2018 at 21:37 | comment | added | Franklin Wu | Thank you for this expanded answer! It perfectly solves my puzzle. | |
| Apr 5, 2018 at 19:26 | review | Suggested edits | |||
| S Apr 5, 2018 at 23:42 | |||||
| Apr 5, 2018 at 15:27 | comment | added | Jeremy Rouse | My answer has been expanded to address your questions. | |
| Apr 5, 2018 at 15:27 | history | edited | Jeremy Rouse | CC BY-SA 3.0 |
Added more detail to address the OP's question.
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| Apr 5, 2018 at 5:19 | comment | added | Franklin Wu | Thank you for the enlightening answer! I am still curious about the Nebentypus $\chi_{-4}$ you mentioned. Is it a Dirichlet character? Is it possible to show that it identically gives 1 when acting a $\Gamma(12)$ transformation on $f(\tau)=\eta(\tau)^2$? | |
| Apr 5, 2018 at 2:58 | history | answered | Jeremy Rouse | CC BY-SA 3.0 |