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Properties

Space	$M_{34}\left({\textrm{Sp}}(4,\mathbb{Z})\right)$
Name	34_Klingen
Type	Klingen Eisenstein series
Weight	$34$
Hecke eigenform	yes
Field degree	$2$

Basic properties

Space:	$M_{34}\left({\textrm{Sp}}(4,\mathbb{Z})\right)$
Type:	Klingen Eisenstein series
Weight:	34
Hecke eigenform:	yes
Integral Fourier coefficients:	yes

Coefficient field

Field:	$\mathbb{Q}(a)$
Degree:	2
Discriminant:	$479 \cdot 4919$
Signature:	$(2, 0)$
Is Galois:	True
Field polynomial:	$x^{2} - x - 589050$
Field generator:	$a$

Explicit formula

(1594 bytes)

Selected eigenvalues $\lambda(l)$ of $T(l)$

$l$	$\lambda(l)$
$2$	(too large to render, please specify modulus or download to view)
$3$	(too large to render, please specify modulus or download to view)
$4$	(too large to render, please specify modulus or download to view)
$5$	(too large to render, please specify modulus or download to view)
$6$	(too large to render, please specify modulus or download to view)
$7$	(too large to render, please specify modulus or download to view)
$8$	(too large to render, please specify modulus or download to view)
$9$	(too large to render, please specify modulus or download to view)
$10$	(too large to render, please specify modulus or download to view)
$11$	(too large to render, please specify modulus or download to view)

Selected Fourier coefficients $c(F)$

\(\det(F)\)	\(F\)	$c(F)$
19	(1, 1, 5)	$5772554645274895002207479859502748961388277901373996800 a + 1576615256837563643915175736559483097460985366065525786924800$

Select different $\lambda(l)$ and $c(F)$ to display or specify a modulus $\mathfrak{m}$ to reduce them by

$\lambda(l)$ available for $l$ in:	2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
$c(F)$ available for $\det(F)$ in:	0 3 4 7 8 11 12 15 16 19 ... 83 84 87 88 91 92 95 96 99 100

Download

(json file containing all available data)