Timeline for Supremum of certain modified zeta functions at 1
Current License: CC BY-SA 4.0
6 events
| when toggle format | what | by | license | comment | |
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| Mar 28, 2019 at 8:27 | comment | added | Kurisuto Asutora | Unless there is a good reason to assume the opposite, you probably should not expect this sequence to be bounded. Generally speaking, there is a rather large proportion of Dirichlet L-function (with a given conductor) which has a "large" value at 1. See for example Theorem 2 in this recent paper: arxiv.org/abs/1803.00760 | |
| Mar 24, 2019 at 14:10 | comment | added | reuns | For $D$ odd $\chi(m) = (D/m)$ is a primitive character modulo $D$ or $4D$ why do you replace it by the non primitive character $ (D/m) 1_{gcd(m,2)=1}$. And the Siegel zero problem is exactly about that | |
| S Mar 24, 2019 at 11:06 | history | suggested | Ali Taghavi |
I add a tag.
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| Mar 24, 2019 at 10:28 | review | Suggested edits | |||
| S Mar 24, 2019 at 11:06 | |||||
| Mar 23, 2019 at 20:09 | comment | added | Lucia | Dirichlet $L$-functions at $1$ can get arbitrarily large or small. Search under "extreme values of Dirichlet L-functions". | |
| Mar 23, 2019 at 16:08 | history | asked | Davide Cesare Veniani | CC BY-SA 4.0 |