LMFDB - L-function 16-6e16-1.1-c4e8-0-0

Dirichlet series

L(s) = 1

− 9·3^-s − 9·5^-s + 13·7^-s + 51·9^-s − 18·11^-s − 5·13^-s + 81·15^-s + 562·19^-s − 117·21^-s − 1.71e3·23^-s − 1.03e3·25^-s + 2.11e3·29^-s + 187·31^-s + 162·33^-s − 117·35^-s + 16·37^-s + 45·39^-s − 7.92e3·41^-s − 68·43^-s − 459·45^-s + 1.36e4·47^-s + 4.72e3·49^-s + 162·55^-s − 5.05e3·57^-s − 2.00e4·59^-s − 1.93e3·61^-s + 663·63^-s + ⋯

L(s) = 1

− 3^-s − 0.359·5^-s + 0.265·7^-s + 0.629·9^-s − 0.148·11^-s − 0.0295·13^-s + 9/25·15^-s + 1.55·19^-s − 0.265·21^-s − 3.24·23^-s − 1.65·25^-s + 2.51·29^-s + 0.194·31^-s + 0.148·33^-s − 0.0955·35^-s + 0.0116·37^-s + 0.0295·39^-s − 4.71·41^-s − 0.0367·43^-s − 0.226·45^-s + 6.19·47^-s + 1.96·49^-s + 0.0535·55^-s − 1.55·57^-s − 5.76·59^-s − 0.520·61^-s + 0.167·63^-s + ⋯

Functional equation

\[\begin{aligned}\Lambda(s)=\mathstrut &\left(2^{16} \cdot 3^{16}\right)^{s/2} \, \Gamma_{\C}(s)^{8} \, L(s)\cr=\mathstrut & \,\Lambda(5-s)\end{aligned}\]

\[\begin{aligned}\Lambda(s)=\mathstrut &\left(2^{16} \cdot 3^{16}\right)^{s/2} \, \Gamma_{\C}(s+2)^{8} \, L(s)\cr=\mathstrut & \,\Lambda(1-s)\end{aligned}\]

Invariants

Degree:	$16$
Conductor:	$2^{16} \cdot 3^{16}$
Sign:	$1$
Analytic conductor:	$36776.8$
Root analytic conductor:	$1.92907$
Motivic weight:	$4$
Rational:	yes
Arithmetic:	yes
Character:	Trivial
Primitive:	no
Self-dual:	yes
Analytic rank:	$0$
Selberg data:	$(16,\ 2^{16} \cdot 3^{16} ,\ ( \ : [2]^{8} ),\ 1 )$

Particular Values

$L(\frac{5}{2})$	$\approx$	$0.03400825454$
$L(\frac12)$	$\approx$	$0.03400825454$
$L(3)$		not available
$L(1)$		not available

Euler product

$L(s) = \displaystyle \prod_{p} F_p(p^{-s})^{-1} $

	$p$	$F_p(T)$
bad	2	$ 1 $
	3	$ 1 + p^{2} T + 10 p T^{2} - 7 p^{3} T^{3} - 86 p^{4} T^{4} - 7 p^{7} T^{5} + 10 p^{9} T^{6} + p^{14} T^{7} + p^{16} T^{8} $
good	5	$ 1 + 9 T + 1114 T^{2} + 9783 T^{3} + 533599 T^{4} + 10528056 T^{5} + 59806456 T^{6} + 10305069192 T^{7} - 6001445444 T^{8} + 10305069192 p^{4} T^{9} + 59806456 p^{8} T^{10} + 10528056 p^{12} T^{11} + 533599 p^{16} T^{12} + 9783 p^{20} T^{13} + 1114 p^{24} T^{14} + 9 p^{28} T^{15} + p^{32} T^{16} $
	7	$ 1 - 13 T - 4554 T^{2} + 124753 T^{3} + 8962391 T^{4} - 7093476 p^{2} T^{5} + 2901735784 T^{6} + 447642835484 T^{7} - 30706182623268 T^{8} + 447642835484 p^{4} T^{9} + 2901735784 p^{8} T^{10} - 7093476 p^{14} T^{11} + 8962391 p^{16} T^{12} + 124753 p^{20} T^{13} - 4554 p^{24} T^{14} - 13 p^{28} T^{15} + p^{32} T^{16} $
	11	$ 1 + 18 T + 33850 T^{2} + 607356 T^{3} + 452208721 T^{4} + 17443950048 T^{5} + 9074477968558 T^{6} + 445095012639474 T^{7} + 191968264536523468 T^{8} + 445095012639474 p^{4} T^{9} + 9074477968558 p^{8} T^{10} + 17443950048 p^{12} T^{11} + 452208721 p^{16} T^{12} + 607356 p^{20} T^{13} + 33850 p^{24} T^{14} + 18 p^{28} T^{15} + p^{32} T^{16} $
	13	$ 1 + 5 T - 42054 T^{2} - 7266665 T^{3} + 352176575 T^{4} + 250092029040 T^{5} + 23191943061904 T^{6} - 3464858176098460 T^{7} - 548440340475170196 T^{8} - 3464858176098460 p^{4} T^{9} + 23191943061904 p^{8} T^{10} + 250092029040 p^{12} T^{11} + 352176575 p^{16} T^{12} - 7266665 p^{20} T^{13} - 42054 p^{24} T^{14} + 5 p^{28} T^{15} + p^{32} T^{16} $
	17	$ 1 - 288125 T^{2} + 52320681154 T^{4} - 6759733382202755 T^{6} + $$63\!\cdots\!86$$ T^{8} - 6759733382202755 p^{8} T^{10} + 52320681154 p^{16} T^{12} - 288125 p^{24} T^{14} + p^{32} T^{16} $
	19	$ ( 1 - 281 T + 110170 T^{2} + 68843041 T^{3} - 21846246566 T^{4} + 68843041 p^{4} T^{5} + 110170 p^{8} T^{6} - 281 p^{12} T^{7} + p^{16} T^{8} )^{2} $
	23	$ 1 + 1719 T + 1529458 T^{2} + 935945649 T^{3} + 342642958747 T^{4} - 16333135609500 T^{5} - 118516645434237428 T^{6} - $$10\!\cdots\!68$$ T^{7} - $$65\!\cdots\!00$$ T^{8} - $$10\!\cdots\!68$$ p^{4} T^{9} - 118516645434237428 p^{8} T^{10} - 16333135609500 p^{12} T^{11} + 342642958747 p^{16} T^{12} + 935945649 p^{20} T^{13} + 1529458 p^{24} T^{14} + 1719 p^{28} T^{15} + p^{32} T^{16} $
	29	$ 1 - 2115 T + 4091014 T^{2} - 5498870985 T^{3} + 7048695081595 T^{4} - 8024737206821040 T^{5} + 8297140249856169556 T^{6} - $$79\!\cdots\!80$$ T^{7} + $$68\!\cdots\!24$$ T^{8} - $$79\!\cdots\!80$$ p^{4} T^{9} + 8297140249856169556 p^{8} T^{10} - 8024737206821040 p^{12} T^{11} + 7048695081595 p^{16} T^{12} - 5498870985 p^{20} T^{13} + 4091014 p^{24} T^{14} - 2115 p^{28} T^{15} + p^{32} T^{16} $
	31	$ 1 - 187 T - 2516004 T^{2} + 186847537 T^{3} + 3362431719041 T^{4} - 9550301616 p T^{5} - 3460282108678916846 T^{6} - 13487262715981377034 T^{7} + $$31\!\cdots\!92$$ T^{8} - 13487262715981377034 p^{4} T^{9} - 3460282108678916846 p^{8} T^{10} - 9550301616 p^{13} T^{11} + 3362431719041 p^{16} T^{12} + 186847537 p^{20} T^{13} - 2516004 p^{24} T^{14} - 187 p^{28} T^{15} + p^{32} T^{16} $
	37	$ ( 1 - 8 T + 3611368 T^{2} + 1256575624 T^{3} + 6911619203950 T^{4} + 1256575624 p^{4} T^{5} + 3611368 p^{8} T^{6} - 8 p^{12} T^{7} + p^{16} T^{8} )^{2} $
	41	$ 1 + 7920 T + 37687894 T^{2} + 132890424480 T^{3} + 385083705354505 T^{4} + 963185727644706960 T^{5} + $$21\!\cdots\!66$$ T^{6} + $$41\!\cdots\!20$$ T^{7} + $$74\!\cdots\!64$$ T^{8} + $$41\!\cdots\!20$$ p^{4} T^{9} + $$21\!\cdots\!66$$ p^{8} T^{10} + 963185727644706960 p^{12} T^{11} + 385083705354505 p^{16} T^{12} + 132890424480 p^{20} T^{13} + 37687894 p^{24} T^{14} + 7920 p^{28} T^{15} + p^{32} T^{16} $
	43	$ 1 + 68 T - 12950604 T^{2} - 209786648 T^{3} + 102574547445791 T^{4} + 59145034173804 T^{5} - $$54\!\cdots\!36$$ T^{6} + $$27\!\cdots\!16$$ T^{7} + $$21\!\cdots\!12$$ T^{8} + $$27\!\cdots\!16$$ p^{4} T^{9} - $$54\!\cdots\!36$$ p^{8} T^{10} + 59145034173804 p^{12} T^{11} + 102574547445791 p^{16} T^{12} - 209786648 p^{20} T^{13} - 12950604 p^{24} T^{14} + 68 p^{28} T^{15} + p^{32} T^{16} $
	47	$ 1 - 13689 T + 103685338 T^{2} - 12006252297 p T^{3} + 2435028217967227 T^{4} - 185888262507277500 p T^{5} + $$26\!\cdots\!72$$ T^{6} - $$15\!\cdots\!56$$ p T^{7} + $$76\!\cdots\!80$$ p^{2} T^{8} - $$15\!\cdots\!56$$ p^{5} T^{9} + $$26\!\cdots\!72$$ p^{8} T^{10} - 185888262507277500 p^{13} T^{11} + 2435028217967227 p^{16} T^{12} - 12006252297 p^{21} T^{13} + 103685338 p^{24} T^{14} - 13689 p^{28} T^{15} + p^{32} T^{16} $
	53	$ 1 - 5145920 T^{2} + 115452291970684 T^{4} - 84051566001475463360 T^{6} + $$67\!\cdots\!26$$ T^{8} - 84051566001475463360 p^{8} T^{10} + 115452291970684 p^{16} T^{12} - 5145920 p^{24} T^{14} + p^{32} T^{16} $
	59	$ 1 + 20052 T + 216711700 T^{2} + 1657982214864 T^{3} + 9931594296358591 T^{4} + 49579528565018409012 T^{5} + $$21\!\cdots\!48$$ T^{6} + $$84\!\cdots\!76$$ T^{7} + $$30\!\cdots\!08$$ T^{8} + $$84\!\cdots\!76$$ p^{4} T^{9} + $$21\!\cdots\!48$$ p^{8} T^{10} + 49579528565018409012 p^{12} T^{11} + 9931594296358591 p^{16} T^{12} + 1657982214864 p^{20} T^{13} + 216711700 p^{24} T^{14} + 20052 p^{28} T^{15} + p^{32} T^{16} $
	61	$ 1 + 1937 T - 10529634 T^{2} + 149647181023 T^{3} + 416288373490931 T^{4} - 1350680282380662864 T^{5} + $$12\!\cdots\!24$$ T^{6} + $$40\!\cdots\!44$$ T^{7} - $$98\!\cdots\!68$$ T^{8} + $$40\!\cdots\!44$$ p^{4} T^{9} + $$12\!\cdots\!24$$ p^{8} T^{10} - 1350680282380662864 p^{12} T^{11} + 416288373490931 p^{16} T^{12} + 149647181023 p^{20} T^{13} - 10529634 p^{24} T^{14} + 1937 p^{28} T^{15} + p^{32} T^{16} $
	67	$ 1 - 154 T - 33835854 T^{2} - 25606229228 T^{3} + 539365905411977 T^{4} + 738160924156362336 T^{5} + $$70\!\cdots\!02$$ T^{6} - $$11\!\cdots\!78$$ T^{7} - $$26\!\cdots\!64$$ T^{8} - $$11\!\cdots\!78$$ p^{4} T^{9} + $$70\!\cdots\!02$$ p^{8} T^{10} + 738160924156362336 p^{12} T^{11} + 539365905411977 p^{16} T^{12} - 25606229228 p^{20} T^{13} - 33835854 p^{24} T^{14} - 154 p^{28} T^{15} + p^{32} T^{16} $
	71	$ 1 - 68871716 T^{2} + 3244147638477940 T^{4} - $$11\!\cdots\!24$$ T^{6} + $$30\!\cdots\!74$$ T^{8} - $$11\!\cdots\!24$$ p^{8} T^{10} + 3244147638477940 p^{16} T^{12} - 68871716 p^{24} T^{14} + p^{32} T^{16} $
	73	$ ( 1 + 3901 T + 59309470 T^{2} + 292589317519 T^{3} + 2279602007321194 T^{4} + 292589317519 p^{4} T^{5} + 59309470 p^{8} T^{6} + 3901 p^{12} T^{7} + p^{16} T^{8} )^{2} $
	79	$ 1 + 2195 T - 87724914 T^{2} - 187644610415 T^{3} + 3128319215246375 T^{4} + 3711455091635884260 T^{5} - $$16\!\cdots\!36$$ T^{6} + $$76\!\cdots\!80$$ T^{7} + $$88\!\cdots\!64$$ T^{8} + $$76\!\cdots\!80$$ p^{4} T^{9} - $$16\!\cdots\!36$$ p^{8} T^{10} + 3711455091635884260 p^{12} T^{11} + 3128319215246375 p^{16} T^{12} - 187644610415 p^{20} T^{13} - 87724914 p^{24} T^{14} + 2195 p^{28} T^{15} + p^{32} T^{16} $
	83	$ 1 - 37017 T + 725723290 T^{2} - 9956481997959 T^{3} + 104510585134438411 T^{4} - $$87\!\cdots\!72$$ T^{5} + $$62\!\cdots\!28$$ T^{6} - $$40\!\cdots\!76$$ T^{7} + $$26\!\cdots\!48$$ T^{8} - $$40\!\cdots\!76$$ p^{4} T^{9} + $$62\!\cdots\!28$$ p^{8} T^{10} - $$87\!\cdots\!72$$ p^{12} T^{11} + 104510585134438411 p^{16} T^{12} - 9956481997959 p^{20} T^{13} + 725723290 p^{24} T^{14} - 37017 p^{28} T^{15} + p^{32} T^{16} $
	89	$ 1 - 294759296 T^{2} + 46567064448316540 T^{4} - $$48\!\cdots\!04$$ T^{6} + $$35\!\cdots\!14$$ T^{8} - $$48\!\cdots\!04$$ p^{8} T^{10} + 46567064448316540 p^{16} T^{12} - 294759296 p^{24} T^{14} + p^{32} T^{16} $
	97	$ 1 - 7282 T - 283226964 T^{2} + 993163976152 T^{3} + 57034963146137471 T^{4} - 97460573991801682656 T^{5} - $$75\!\cdots\!16$$ T^{6} + $$33\!\cdots\!26$$ T^{7} + $$75\!\cdots\!52$$ T^{8} + $$33\!\cdots\!26$$ p^{4} T^{9} - $$75\!\cdots\!16$$ p^{8} T^{10} - 97460573991801682656 p^{12} T^{11} + 57034963146137471 p^{16} T^{12} + 993163976152 p^{20} T^{13} - 283226964 p^{24} T^{14} - 7282 p^{28} T^{15} + p^{32} T^{16} $
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$L(s) = \displaystyle\prod_p \ \prod_{j=1}^{16} (1 - \alpha_{j,p}\, p^{-s})^{-1}$

Imaginary part of the first few zeros on the critical line

−7.34046649286107264610101171890, −7.27537431848903114295284106343, −6.65624242790857659934643786170, −6.49835643224954538599673853024, −6.36329520297744281873853178816, −6.10528594093418176205060390842, −6.08755526591299637991715175892, −5.80836490634411532696739157009, −5.54632005068896516625825285142, −5.31559502053140853306809283364, −5.03307722637314383686000020940, −4.92039720834344289734560014032, −4.57897114628499936074608384124, −4.34915502316031118697124794171, −4.04923069743078285124672775145, −3.92454018233143933303849856510, −3.58584229886317101912470095279, −3.12279790009191266401488123388, −3.08850342555356189597595059128, −2.39211220861006147173067147021, −2.12387168041844180199376090424, −1.84721688687490204338019491049, −1.14317894813591004663536020934, −0.897499615307426482898906792143, −0.04346651088423851178572014125, 0.04346651088423851178572014125, 0.897499615307426482898906792143, 1.14317894813591004663536020934, 1.84721688687490204338019491049, 2.12387168041844180199376090424, 2.39211220861006147173067147021, 3.08850342555356189597595059128, 3.12279790009191266401488123388, 3.58584229886317101912470095279, 3.92454018233143933303849856510, 4.04923069743078285124672775145, 4.34915502316031118697124794171, 4.57897114628499936074608384124, 4.92039720834344289734560014032, 5.03307722637314383686000020940, 5.31559502053140853306809283364, 5.54632005068896516625825285142, 5.80836490634411532696739157009, 6.08755526591299637991715175892, 6.10528594093418176205060390842, 6.36329520297744281873853178816, 6.49835643224954538599673853024, 6.65624242790857659934643786170, 7.27537431848903114295284106343, 7.34046649286107264610101171890

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

Plot not available for L-functions of degree greater than 10.

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$

\(L(\frac{5}{2})\)	\(\approx\)	\(0.03400825454\)
\(L(\frac12)\)	\(\approx\)	\(0.03400825454\)
\(L(3)\)		not available
\(L(1)\)		not available

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