LMFDB - L-function 24-252e12-1.1-c3e12-0-1

Dirichlet series

L(s) = 1

− 2^-s + 3·4^-s − 10·7^-s − 11·8^-s + 10·14^-s + 23·16^-s + 84·19^-s + 642·25^-s − 30·28^-s − 200·29^-s + 384·31^-s − 7·32^-s − 244·37^-s − 84·38^-s + 280·47^-s − 162·49^-s − 642·50^-s + 16·53^-s + 110·56^-s + 200·58^-s + 1.16e3·59^-s − 384·62^-s + 511·64^-s + 244·74^-s + 252·76^-s − 968·83^-s − 280·94^-s + ⋯

L(s) = 1

− 0.353·2^-s + 3/8·4^-s − 0.539·7^-s − 0.486·8^-s + 0.190·14^-s + 0.359·16^-s + 1.01·19^-s + 5.13·25^-s − 0.202·28^-s − 1.28·29^-s + 2.22·31^-s − 0.0386·32^-s − 1.08·37^-s − 0.358·38^-s + 0.868·47^-s − 0.472·49^-s − 1.81·50^-s + 0.0414·53^-s + 0.262·56^-s + 0.452·58^-s + 2.57·59^-s − 0.786·62^-s + 0.998·64^-s + 0.383·74^-s + 0.380·76^-s − 1.28·83^-s − 0.307·94^-s + ⋯

Functional equation

\[\begin{aligned}\Lambda(s)=\mathstrut &\left(2^{24} \cdot 3^{24} \cdot 7^{12}\right)^{s/2} \, \Gamma_{\C}(s)^{12} \, L(s)\cr=\mathstrut & \,\Lambda(4-s)\end{aligned}\]

\[\begin{aligned}\Lambda(s)=\mathstrut &\left(2^{24} \cdot 3^{24} \cdot 7^{12}\right)^{s/2} \, \Gamma_{\C}(s+3/2)^{12} \, L(s)\cr=\mathstrut & \,\Lambda(1-s)\end{aligned}\]

Invariants

Degree:	$24$
Conductor:	$2^{24} \cdot 3^{24} \cdot 7^{12}$
Sign:	$1$
Analytic conductor:	$1.16734\times 10^{14}$
Root analytic conductor:	$3.85596$
Motivic weight:	$3$
Rational:	yes
Arithmetic:	yes
Character:	Trivial
Primitive:	no
Self-dual:	yes
Analytic rank:	$0$
Selberg data:	$(24,\ 2^{24} \cdot 3^{24} \cdot 7^{12} ,\ ( \ : [3/2]^{12} ),\ 1 )$

Particular Values

$L(2)$	$\approx$	$22.75571300$
$L(\frac12)$	$\approx$	$22.75571300$
$L(\frac{5}{2})$		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 + T - p T^{2} + 3 p T^{3} - 7 p^{3} T^{5} - 7 p^{6} T^{6} - 7 p^{6} T^{7} + 3 p^{10} T^{9} - p^{13} T^{10} + p^{15} T^{11} + p^{18} T^{12} $
	3	$ 1 $
	7	$ 1 + 10 T + 262 T^{2} - 842 T^{3} + 12281 p T^{4} + 27388 p^{2} T^{5} + 282796 p^{3} T^{6} + 27388 p^{5} T^{7} + 12281 p^{7} T^{8} - 842 p^{9} T^{9} + 262 p^{12} T^{10} + 10 p^{15} T^{11} + p^{18} T^{12} $
good	5	$ 1 - 642 T^{2} + 208394 T^{4} - 9322026 p T^{6} + 8351455471 T^{8} - 1283212969212 T^{10} + 171916133103148 T^{12} - 1283212969212 p^{6} T^{14} + 8351455471 p^{12} T^{16} - 9322026 p^{19} T^{18} + 208394 p^{24} T^{20} - 642 p^{30} T^{22} + p^{36} T^{24} $
	11	$ 1 - 5558 T^{2} + 17328562 T^{4} - 39697781446 T^{6} + 74680549582767 T^{8} - 10925809255157404 p T^{10} + $$16\!\cdots\!76$$ T^{12} - 10925809255157404 p^{7} T^{14} + 74680549582767 p^{12} T^{16} - 39697781446 p^{18} T^{18} + 17328562 p^{24} T^{20} - 5558 p^{30} T^{22} + p^{36} T^{24} $
	13	$ 1 - 16388 T^{2} + 130168450 T^{4} - 667979540948 T^{6} + 2502014595031295 T^{8} - 7350443941021209352 T^{10} + $$17\!\cdots\!68$$ T^{12} - 7350443941021209352 p^{6} T^{14} + 2502014595031295 p^{12} T^{16} - 667979540948 p^{18} T^{18} + 130168450 p^{24} T^{20} - 16388 p^{30} T^{22} + p^{36} T^{24} $
	17	$ 1 - 24130 T^{2} + 336665322 T^{4} - 3317046729666 T^{6} + 25449379046911359 T^{8} - $$16\!\cdots\!44$$ T^{10} + $$85\!\cdots\!96$$ T^{12} - $$16\!\cdots\!44$$ p^{6} T^{14} + 25449379046911359 p^{12} T^{16} - 3317046729666 p^{18} T^{18} + 336665322 p^{24} T^{20} - 24130 p^{30} T^{22} + p^{36} T^{24} $
	19	$ ( 1 - 42 T + 14070 T^{2} + 395490 T^{3} + 3286109 p T^{4} + 9398728548 T^{5} + 289465860276 T^{6} + 9398728548 p^{3} T^{7} + 3286109 p^{7} T^{8} + 395490 p^{9} T^{9} + 14070 p^{12} T^{10} - 42 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	23	$ 1 - 92822 T^{2} + 4403882674 T^{4} - 138019190867542 T^{6} + 3157265325811091679 T^{8} - $$55\!\cdots\!92$$ T^{10} + $$75\!\cdots\!32$$ T^{12} - $$55\!\cdots\!92$$ p^{6} T^{14} + 3157265325811091679 p^{12} T^{16} - 138019190867542 p^{18} T^{18} + 4403882674 p^{24} T^{20} - 92822 p^{30} T^{22} + p^{36} T^{24} $
	29	$ ( 1 + 100 T + 47898 T^{2} + 9341604 T^{3} + 2007541655 T^{4} + 290966053384 T^{5} + 66257486741772 T^{6} + 290966053384 p^{3} T^{7} + 2007541655 p^{6} T^{8} + 9341604 p^{9} T^{9} + 47898 p^{12} T^{10} + 100 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	31	$ ( 1 - 192 T + 79514 T^{2} - 6935616 T^{3} + 3231616847 T^{4} - 390779082624 T^{5} + 138834590310572 T^{6} - 390779082624 p^{3} T^{7} + 3231616847 p^{6} T^{8} - 6935616 p^{9} T^{9} + 79514 p^{12} T^{10} - 192 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	37	$ ( 1 + 122 T + 230498 T^{2} + 34280946 T^{3} + 23640098487 T^{4} + 3642512537420 T^{5} + 1472029170650908 T^{6} + 3642512537420 p^{3} T^{7} + 23640098487 p^{6} T^{8} + 34280946 p^{9} T^{9} + 230498 p^{12} T^{10} + 122 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	41	$ 1 - 453906 T^{2} + 91605366794 T^{4} - 10752866720419890 T^{6} + $$81\!\cdots\!67$$ T^{8} - $$44\!\cdots\!16$$ T^{10} + $$24\!\cdots\!00$$ T^{12} - $$44\!\cdots\!16$$ p^{6} T^{14} + $$81\!\cdots\!67$$ p^{12} T^{16} - 10752866720419890 p^{18} T^{18} + 91605366794 p^{24} T^{20} - 453906 p^{30} T^{22} + p^{36} T^{24} $
	43	$ 1 - 625992 T^{2} + 191021018714 T^{4} - 37826754729984360 T^{6} + $$54\!\cdots\!51$$ T^{8} - $$60\!\cdots\!88$$ T^{10} + $$53\!\cdots\!68$$ T^{12} - $$60\!\cdots\!88$$ p^{6} T^{14} + $$54\!\cdots\!51$$ p^{12} T^{16} - 37826754729984360 p^{18} T^{18} + 191021018714 p^{24} T^{20} - 625992 p^{30} T^{22} + p^{36} T^{24} $
	47	$ ( 1 - 140 T + 320330 T^{2} - 73212740 T^{3} + 60859580527 T^{4} - 11849141354936 T^{5} + 8088315502149964 T^{6} - 11849141354936 p^{3} T^{7} + 60859580527 p^{6} T^{8} - 73212740 p^{9} T^{9} + 320330 p^{12} T^{10} - 140 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	53	$ ( 1 - 8 T + 620338 T^{2} - 43270728 T^{3} + 175052111079 T^{4} - 17854809544976 T^{5} + 31198306509520220 T^{6} - 17854809544976 p^{3} T^{7} + 175052111079 p^{6} T^{8} - 43270728 p^{9} T^{9} + 620338 p^{12} T^{10} - 8 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	59	$ ( 1 - 584 T + 660226 T^{2} - 288363320 T^{3} + 227118238535 T^{4} - 84061764799568 T^{5} + 53003863801684156 T^{6} - 84061764799568 p^{3} T^{7} + 227118238535 p^{6} T^{8} - 288363320 p^{9} T^{9} + 660226 p^{12} T^{10} - 584 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	61	$ 1 - 1132844 T^{2} + 598144576978 T^{4} - 187592974802688284 T^{6} + $$36\!\cdots\!15$$ T^{8} - $$44\!\cdots\!20$$ T^{10} + $$52\!\cdots\!48$$ T^{12} - $$44\!\cdots\!20$$ p^{6} T^{14} + $$36\!\cdots\!15$$ p^{12} T^{16} - 187592974802688284 p^{18} T^{18} + 598144576978 p^{24} T^{20} - 1132844 p^{30} T^{22} + p^{36} T^{24} $
	67	$ 1 - 2201456 T^{2} + 2446914850954 T^{4} - 1810143772474049072 T^{6} + $$98\!\cdots\!19$$ T^{8} - $$41\!\cdots\!88$$ T^{10} + $$14\!\cdots\!12$$ T^{12} - $$41\!\cdots\!88$$ p^{6} T^{14} + $$98\!\cdots\!19$$ p^{12} T^{16} - 1810143772474049072 p^{18} T^{18} + 2446914850954 p^{24} T^{20} - 2201456 p^{30} T^{22} + p^{36} T^{24} $
	71	$ 1 - 41114 p T^{2} + 4283951535986 T^{4} - 4104693796296127926 T^{6} + $$28\!\cdots\!15$$ T^{8} - $$14\!\cdots\!16$$ T^{10} + $$60\!\cdots\!48$$ T^{12} - $$14\!\cdots\!16$$ p^{6} T^{14} + $$28\!\cdots\!15$$ p^{12} T^{16} - 4104693796296127926 p^{18} T^{18} + 4283951535986 p^{24} T^{20} - 41114 p^{31} T^{22} + p^{36} T^{24} $
	73	$ 1 - 1439236 T^{2} + 1102003928274 T^{4} - 451513704340917812 T^{6} + $$43\!\cdots\!39$$ T^{8} + $$61\!\cdots\!52$$ T^{10} - $$39\!\cdots\!08$$ T^{12} + $$61\!\cdots\!52$$ p^{6} T^{14} + $$43\!\cdots\!39$$ p^{12} T^{16} - 451513704340917812 p^{18} T^{18} + 1102003928274 p^{24} T^{20} - 1439236 p^{30} T^{22} + p^{36} T^{24} $
	79	$ 1 - 2332448 T^{2} + 3331150435450 T^{4} - 3366161588747882144 T^{6} + $$26\!\cdots\!99$$ T^{8} - $$17\!\cdots\!80$$ T^{10} + $$93\!\cdots\!24$$ T^{12} - $$17\!\cdots\!80$$ p^{6} T^{14} + $$26\!\cdots\!99$$ p^{12} T^{16} - 3366161588747882144 p^{18} T^{18} + 3331150435450 p^{24} T^{20} - 2332448 p^{30} T^{22} + p^{36} T^{24} $
	83	$ ( 1 + 484 T + 1270706 T^{2} + 875417788 T^{3} + 1295203458391 T^{4} + 787465212856936 T^{5} + 845488477438432156 T^{6} + 787465212856936 p^{3} T^{7} + 1295203458391 p^{6} T^{8} + 875417788 p^{9} T^{9} + 1270706 p^{12} T^{10} + 484 p^{15} T^{11} + p^{18} T^{12} )^{2} $
	89	$ 1 - 2324754 T^{2} + 3623829356426 T^{4} - 4250784438141992562 T^{6} + $$40\!\cdots\!59$$ T^{8} - $$33\!\cdots\!12$$ T^{10} + $$25\!\cdots\!84$$ T^{12} - $$33\!\cdots\!12$$ p^{6} T^{14} + $$40\!\cdots\!59$$ p^{12} T^{16} - 4250784438141992562 p^{18} T^{18} + 3623829356426 p^{24} T^{20} - 2324754 p^{30} T^{22} + p^{36} T^{24} $
	97	$ 1 - 5179748 T^{2} + 14000284408306 T^{4} - 26536073421090570836 T^{6} + $$39\!\cdots\!39$$ T^{8} - $$47\!\cdots\!40$$ T^{10} + $$47\!\cdots\!48$$ T^{12} - $$47\!\cdots\!40$$ p^{6} T^{14} + $$39\!\cdots\!39$$ p^{12} T^{16} - 26536073421090570836 p^{18} T^{18} + 14000284408306 p^{24} T^{20} - 5179748 p^{30} T^{22} + p^{36} T^{24} $
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$L(s) = \displaystyle\prod_p \ \prod_{j=1}^{24} (1 - \alpha_{j,p}\, p^{-s})^{-1}$

Imaginary part of the first few zeros on the critical line

−3.47414121977849599549536543450, −3.40765294945440282483746997631, −3.38716166031413923399414980531, −3.16745444676721680116023060105, −3.12446081884937395040709496629, −3.01327119371387730133722718769, −2.76921095322657211403204305638, −2.73006281014872327301528088915, −2.72734083204300439908986842426, −2.63593125298196362102073227505, −2.49881523659573326761637278378, −2.21541839125018790084324446465, −2.03646165198261998729388952231, −2.00626721630975464769604351103, −1.85461091448879896791086251068, −1.49087274484392956730330267081, −1.44781911923498986616077046617, −1.39397182131806343565641030015, −1.06845249568035848096738501637, −1.05507404476045346342373935930, −0.802729191435037445129949315607, −0.58288508763147036600146034727, −0.55601246272911919918225546009, −0.47194425263115504690713220283, −0.23959872804400547814933205489, 0.23959872804400547814933205489, 0.47194425263115504690713220283, 0.55601246272911919918225546009, 0.58288508763147036600146034727, 0.802729191435037445129949315607, 1.05507404476045346342373935930, 1.06845249568035848096738501637, 1.39397182131806343565641030015, 1.44781911923498986616077046617, 1.49087274484392956730330267081, 1.85461091448879896791086251068, 2.00626721630975464769604351103, 2.03646165198261998729388952231, 2.21541839125018790084324446465, 2.49881523659573326761637278378, 2.63593125298196362102073227505, 2.72734083204300439908986842426, 2.73006281014872327301528088915, 2.76921095322657211403204305638, 3.01327119371387730133722718769, 3.12446081884937395040709496629, 3.16745444676721680116023060105, 3.38716166031413923399414980531, 3.40765294945440282483746997631, 3.47414121977849599549536543450

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 $\F_{q}$

\(L(2)\)	\(\approx\)	\(22.75571300\)
\(L(\frac12)\)	\(\approx\)	\(22.75571300\)
\(L(\frac{5}{2})\)		not available
\(L(1)\)		not available

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