Properties

Label 8-45e4-1.1-c13e4-0-1
Degree $8$
Conductor $4100625$
Sign $1$
Analytic cond. $5.42163\times 10^{6}$
Root an. cond. $6.94650$
Motivic weight $13$
Arithmetic yes
Rational yes
Primitive no
Self-dual yes
Analytic rank $4$

Origins

Origins of factors

Downloads

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Normalization:  

Dirichlet series

L(s)  = 1  + 15·2-s − 7.85e3·4-s − 6.25e4·5-s + 3.43e5·7-s − 1.54e5·8-s − 9.37e5·10-s − 1.26e7·11-s + 3.43e7·13-s + 5.14e6·14-s + 1.24e7·16-s − 8.43e7·17-s − 1.31e8·19-s + 4.90e8·20-s − 1.90e8·22-s − 1.04e9·23-s + 2.44e9·25-s + 5.15e8·26-s − 2.69e9·28-s + 1.82e9·29-s + 3.50e9·31-s + 7.17e8·32-s − 1.26e9·34-s − 2.14e10·35-s + 8.29e9·37-s − 1.97e9·38-s + 9.68e9·40-s − 5.44e10·41-s + ⋯
L(s)  = 1  + 0.165·2-s − 0.958·4-s − 1.78·5-s + 1.10·7-s − 0.208·8-s − 0.296·10-s − 2.16·11-s + 1.97·13-s + 0.182·14-s + 0.185·16-s − 0.847·17-s − 0.642·19-s + 1.71·20-s − 0.358·22-s − 1.47·23-s + 2·25-s + 0.326·26-s − 1.05·28-s + 0.570·29-s + 0.708·31-s + 0.118·32-s − 0.140·34-s − 1.97·35-s + 0.531·37-s − 0.106·38-s + 0.373·40-s − 1.79·41-s + ⋯

Functional equation

\[\begin{aligned}\Lambda(s)=\mathstrut & 4100625 ^{s/2} \, \Gamma_{\C}(s)^{4} \, L(s)\cr =\mathstrut & \, \Lambda(14-s) \end{aligned}\]
\[\begin{aligned}\Lambda(s)=\mathstrut & 4100625 ^{s/2} \, \Gamma_{\C}(s+13/2)^{4} \, L(s)\cr =\mathstrut & \, \Lambda(1-s) \end{aligned}\]

Invariants

Degree: \(8\)
Conductor: \(4100625\)    =    \(3^{8} \cdot 5^{4}\)
Sign: $1$
Analytic conductor: \(5.42163\times 10^{6}\)
Root analytic conductor: \(6.94650\)
Motivic weight: \(13\)
Rational: yes
Arithmetic: yes
Character: Trivial
Primitive: no
Self-dual: yes
Analytic rank: \(4\)
Selberg data: \((8,\ 4100625,\ (\ :13/2, 13/2, 13/2, 13/2),\ 1)\)

Particular Values

\(L(7)\) \(=\) \(0\)
\(L(\frac12)\) \(=\) \(0\)
\(L(\frac{15}{2})\) not available
\(L(1)\) not available

Euler product

   \(L(s) = \displaystyle \prod_{p} F_p(p^{-s})^{-1} \)
$p$$\Gal(F_p)$$F_p(T)$
bad3 \( 1 \)
5$C_1$ \( ( 1 + p^{6} T )^{4} \)
good2$C_2 \wr S_4$ \( 1 - 15 T + 4039 p T^{2} - 10505 p^{3} T^{3} + 390033 p^{7} T^{4} - 10505 p^{16} T^{5} + 4039 p^{27} T^{6} - 15 p^{39} T^{7} + p^{52} T^{8} \)
7$C_2 \wr S_4$ \( 1 - 343040 T + 194313329428 T^{2} - 11990142535557120 p T^{3} + \)\(52\!\cdots\!06\)\( p^{2} T^{4} - 11990142535557120 p^{14} T^{5} + 194313329428 p^{26} T^{6} - 343040 p^{39} T^{7} + p^{52} T^{8} \)
11$C_2 \wr S_4$ \( 1 + 12697800 T + 14778711137884 p T^{2} + 9298384593225367400 p^{2} T^{3} + \)\(62\!\cdots\!86\)\( p^{3} T^{4} + 9298384593225367400 p^{15} T^{5} + 14778711137884 p^{27} T^{6} + 12697800 p^{39} T^{7} + p^{52} T^{8} \)
13$C_2 \wr S_4$ \( 1 - 34336040 T + 117482613371524 p T^{2} - \)\(31\!\cdots\!60\)\( T^{3} + \)\(74\!\cdots\!54\)\( T^{4} - \)\(31\!\cdots\!60\)\( p^{13} T^{5} + 117482613371524 p^{27} T^{6} - 34336040 p^{39} T^{7} + p^{52} T^{8} \)
17$C_2 \wr S_4$ \( 1 + 84377280 T + 15521353071831788 T^{2} + \)\(64\!\cdots\!80\)\( T^{3} + \)\(16\!\cdots\!74\)\( T^{4} + \)\(64\!\cdots\!80\)\( p^{13} T^{5} + 15521353071831788 p^{26} T^{6} + 84377280 p^{39} T^{7} + p^{52} T^{8} \)
19$C_2 \wr S_4$ \( 1 + 131821144 T + 7714368091215748 p T^{2} + \)\(15\!\cdots\!12\)\( T^{3} + \)\(87\!\cdots\!70\)\( T^{4} + \)\(15\!\cdots\!12\)\( p^{13} T^{5} + 7714368091215748 p^{27} T^{6} + 131821144 p^{39} T^{7} + p^{52} T^{8} \)
23$C_2 \wr S_4$ \( 1 + 1046106360 T + 1818308015374219292 T^{2} + \)\(15\!\cdots\!40\)\( T^{3} + \)\(13\!\cdots\!94\)\( T^{4} + \)\(15\!\cdots\!40\)\( p^{13} T^{5} + 1818308015374219292 p^{26} T^{6} + 1046106360 p^{39} T^{7} + p^{52} T^{8} \)
29$C_2 \wr S_4$ \( 1 - 1826812200 T + 31045034855939699756 T^{2} - \)\(48\!\cdots\!00\)\( T^{3} + \)\(44\!\cdots\!26\)\( T^{4} - \)\(48\!\cdots\!00\)\( p^{13} T^{5} + 31045034855939699756 p^{26} T^{6} - 1826812200 p^{39} T^{7} + p^{52} T^{8} \)
31$C_2 \wr S_4$ \( 1 - 3501222872 T + 60142659648538757308 T^{2} - \)\(61\!\cdots\!64\)\( p T^{3} + \)\(21\!\cdots\!70\)\( T^{4} - \)\(61\!\cdots\!64\)\( p^{14} T^{5} + 60142659648538757308 p^{26} T^{6} - 3501222872 p^{39} T^{7} + p^{52} T^{8} \)
37$C_2 \wr S_4$ \( 1 - 8297642120 T + \)\(65\!\cdots\!88\)\( T^{2} - \)\(58\!\cdots\!20\)\( T^{3} + \)\(21\!\cdots\!54\)\( T^{4} - \)\(58\!\cdots\!20\)\( p^{13} T^{5} + \)\(65\!\cdots\!88\)\( p^{26} T^{6} - 8297642120 p^{39} T^{7} + p^{52} T^{8} \)
41$C_2 \wr S_4$ \( 1 + 54459122400 T + \)\(22\!\cdots\!84\)\( T^{2} + \)\(10\!\cdots\!00\)\( T^{3} + \)\(34\!\cdots\!46\)\( T^{4} + \)\(10\!\cdots\!00\)\( p^{13} T^{5} + \)\(22\!\cdots\!84\)\( p^{26} T^{6} + 54459122400 p^{39} T^{7} + p^{52} T^{8} \)
43$C_2 \wr S_4$ \( 1 + 48173425360 T + \)\(45\!\cdots\!72\)\( T^{2} + \)\(21\!\cdots\!40\)\( T^{3} + \)\(10\!\cdots\!94\)\( T^{4} + \)\(21\!\cdots\!40\)\( p^{13} T^{5} + \)\(45\!\cdots\!72\)\( p^{26} T^{6} + 48173425360 p^{39} T^{7} + p^{52} T^{8} \)
47$C_2 \wr S_4$ \( 1 + 202496682840 T + \)\(31\!\cdots\!68\)\( T^{2} + \)\(31\!\cdots\!40\)\( T^{3} + \)\(27\!\cdots\!14\)\( T^{4} + \)\(31\!\cdots\!40\)\( p^{13} T^{5} + \)\(31\!\cdots\!68\)\( p^{26} T^{6} + 202496682840 p^{39} T^{7} + p^{52} T^{8} \)
53$C_2 \wr S_4$ \( 1 + 116147122920 T + \)\(62\!\cdots\!32\)\( T^{2} + \)\(81\!\cdots\!80\)\( T^{3} + \)\(21\!\cdots\!14\)\( T^{4} + \)\(81\!\cdots\!80\)\( p^{13} T^{5} + \)\(62\!\cdots\!32\)\( p^{26} T^{6} + 116147122920 p^{39} T^{7} + p^{52} T^{8} \)
59$C_2 \wr S_4$ \( 1 + 885100702200 T + \)\(55\!\cdots\!16\)\( T^{2} + \)\(25\!\cdots\!00\)\( T^{3} + \)\(92\!\cdots\!46\)\( T^{4} + \)\(25\!\cdots\!00\)\( p^{13} T^{5} + \)\(55\!\cdots\!16\)\( p^{26} T^{6} + 885100702200 p^{39} T^{7} + p^{52} T^{8} \)
61$C_2 \wr S_4$ \( 1 - 467836185368 T + \)\(31\!\cdots\!08\)\( T^{2} - \)\(11\!\cdots\!76\)\( T^{3} + \)\(41\!\cdots\!70\)\( T^{4} - \)\(11\!\cdots\!76\)\( p^{13} T^{5} + \)\(31\!\cdots\!08\)\( p^{26} T^{6} - 467836185368 p^{39} T^{7} + p^{52} T^{8} \)
67$C_2 \wr S_4$ \( 1 - 819037749440 T + \)\(93\!\cdots\!48\)\( T^{2} - \)\(70\!\cdots\!40\)\( T^{3} + \)\(85\!\cdots\!14\)\( T^{4} - \)\(70\!\cdots\!40\)\( p^{13} T^{5} + \)\(93\!\cdots\!48\)\( p^{26} T^{6} - 819037749440 p^{39} T^{7} + p^{52} T^{8} \)
71$C_2 \wr S_4$ \( 1 + 2886468559200 T + \)\(41\!\cdots\!44\)\( T^{2} + \)\(52\!\cdots\!00\)\( T^{3} + \)\(63\!\cdots\!26\)\( T^{4} + \)\(52\!\cdots\!00\)\( p^{13} T^{5} + \)\(41\!\cdots\!44\)\( p^{26} T^{6} + 2886468559200 p^{39} T^{7} + p^{52} T^{8} \)
73$C_2 \wr S_4$ \( 1 + 1235535876280 T + \)\(37\!\cdots\!32\)\( T^{2} + \)\(56\!\cdots\!20\)\( T^{3} + \)\(68\!\cdots\!34\)\( T^{4} + \)\(56\!\cdots\!20\)\( p^{13} T^{5} + \)\(37\!\cdots\!32\)\( p^{26} T^{6} + 1235535876280 p^{39} T^{7} + p^{52} T^{8} \)
79$C_2 \wr S_4$ \( 1 + 3553486866616 T + \)\(64\!\cdots\!52\)\( T^{2} - \)\(11\!\cdots\!72\)\( T^{3} - \)\(43\!\cdots\!30\)\( T^{4} - \)\(11\!\cdots\!72\)\( p^{13} T^{5} + \)\(64\!\cdots\!52\)\( p^{26} T^{6} + 3553486866616 p^{39} T^{7} + p^{52} T^{8} \)
83$C_2 \wr S_4$ \( 1 + 3441261762480 T + \)\(30\!\cdots\!92\)\( T^{2} + \)\(86\!\cdots\!20\)\( T^{3} + \)\(37\!\cdots\!54\)\( T^{4} + \)\(86\!\cdots\!20\)\( p^{13} T^{5} + \)\(30\!\cdots\!92\)\( p^{26} T^{6} + 3441261762480 p^{39} T^{7} + p^{52} T^{8} \)
89$C_2 \wr S_4$ \( 1 - 2322663606000 T + \)\(78\!\cdots\!76\)\( T^{2} - \)\(12\!\cdots\!00\)\( T^{3} + \)\(24\!\cdots\!66\)\( T^{4} - \)\(12\!\cdots\!00\)\( p^{13} T^{5} + \)\(78\!\cdots\!76\)\( p^{26} T^{6} - 2322663606000 p^{39} T^{7} + p^{52} T^{8} \)
97$C_2 \wr S_4$ \( 1 - 8462989649240 T + \)\(13\!\cdots\!08\)\( T^{2} - \)\(16\!\cdots\!40\)\( T^{3} + \)\(10\!\cdots\!74\)\( T^{4} - \)\(16\!\cdots\!40\)\( p^{13} T^{5} + \)\(13\!\cdots\!08\)\( p^{26} T^{6} - 8462989649240 p^{39} T^{7} + p^{52} T^{8} \)
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   \(L(s) = \displaystyle\prod_p \ \prod_{j=1}^{8} (1 - \alpha_{j,p}\, p^{-s})^{-1}\)

Imaginary part of the first few zeros on the critical line

−9.788017291482332193459454515468, −8.878206057843355645251124797674, −8.621235181793804636587706274582, −8.574851422245920027576535420914, −8.404405540607924041464997925001, −7.88587081427838003372682590062, −7.79525905021171385570651714421, −7.69559855310490165196285857483, −6.88902562415887751766999827069, −6.70134193281053546430134806298, −6.20027010607400573212316270450, −5.90924765890060031514421095626, −5.55384170016165943631062554705, −4.77996486907955876893876921590, −4.71822543263484639026042515148, −4.53661272786790485808470281603, −4.51290646473016194504991019200, −3.51197117367922038436491301200, −3.48782250546419081714235775693, −3.34984631709025660245013977917, −2.60879411446807685636197094687, −2.29725639115300491823505291798, −1.66611023186456723782546211510, −1.22596793628988045136026021514, −1.22391468481623297030532242616, 0, 0, 0, 0, 1.22391468481623297030532242616, 1.22596793628988045136026021514, 1.66611023186456723782546211510, 2.29725639115300491823505291798, 2.60879411446807685636197094687, 3.34984631709025660245013977917, 3.48782250546419081714235775693, 3.51197117367922038436491301200, 4.51290646473016194504991019200, 4.53661272786790485808470281603, 4.71822543263484639026042515148, 4.77996486907955876893876921590, 5.55384170016165943631062554705, 5.90924765890060031514421095626, 6.20027010607400573212316270450, 6.70134193281053546430134806298, 6.88902562415887751766999827069, 7.69559855310490165196285857483, 7.79525905021171385570651714421, 7.88587081427838003372682590062, 8.404405540607924041464997925001, 8.574851422245920027576535420914, 8.621235181793804636587706274582, 8.878206057843355645251124797674, 9.788017291482332193459454515468

Graph of the $Z$-function along the critical line