LMFDB - Newform orbit 175.4.e.d

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [175,4,Mod(51,175)]

mf = mfinit([N,k,chi],0)

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(175, base_ring=CyclotomicField(6))

chi = DirichletCharacter(H, H._module([0, 2]))

N = Newforms(chi, 4, names="a")

//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code

chi := DirichletCharacter("175.51");

S:= CuspForms(chi, 4);

N := Newforms(S);

Level:	$ N $	$=$	$ 175 = 5^{2} \cdot 7 $
Weight:	$ k $	$=$	$ 4 $
Character orbit:	$[\chi]$	$=$	175.e (of order $3$, degree $2$, minimal)

Newform invariants

comment: select newform

sage: f = N[0] # Warning: the index may be different

gp: f = lf[1] \\ Warning: the index may be different

Self dual:	no
Analytic conductor:	$10.3253342510$
Analytic rank:	$0$
Dimension:	$10$
Relative dimension:	$5$ over $\Q(\zeta_{3})$
Coefficient field:	$\mathbb{Q}[x]/(x^{10} - \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{10} - x^{9} + 38 x^{8} - 5 x^{7} + 1102 x^{6} - 137 x^{5} + 11161 x^{4} + 10784 x^{3} + 81600 x^{2} + \cdots + 4096 $ x^10 - x^9 + 38x^8 - 5x^7 + 1102x^6 - 137x^5 + 11161x^4 + 10784x^3 + 81600x^2 + 18432x + 4096
Coefficient ring:	$\Z[a_1, \ldots, a_{7}]$
Coefficient ring index:	$ 2^{4} $
Twist minimal:	no (minimal twist has level 35)
Sato-Tate group:	$\mathrm{SU}(2)[C_{3}]$

$q$-expansion

comment: q-expansion

sage: f.q_expansion() # note that sage often uses an isomorphic number field

gp: mfcoefs(f, 20)

Coefficients of the $q$-expansion are expressed in terms of a basis $1,\beta_1,\ldots,\beta_{9}$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + \beta_1 q^{2} + (2 \beta_{6} - \beta_{5} - 2) q^{3} + (\beta_{8} + 7 \beta_{6} - \beta_{4} - 7) q^{4} + ( - \beta_{9} + 2 \beta_{7} + \beta_{5} + \cdots + 4) q^{6}+ \cdots + (\beta_{9} - \beta_{8} + \cdots + \beta_{2}) q^{9}+O(q^{10}) $ q + b1 * q^2 + (2b6 - b5 - 2) q^3 + (b8 + 7b6 - b4 - 7) q^4 + (-b9 + 2b7 + b5 + 2b4 + b3 - 3b2 - b1 + 4) q^6 + (b9 + 2b6 + b4 + b3 - b2 - b1 + 5) q^7 + (-4b3 - 5b2 - 4) * q^8 + (b9 - b8 + b7 - 17b6 + 3b5 + 2b3 + b2) q^9	$ q + \beta_1 q^{2} + (2 \beta_{6} - \beta_{5} - 2) q^{3} + (\beta_{8} + 7 \beta_{6} - \beta_{4} - 7) q^{4} + ( - \beta_{9} + 2 \beta_{7} + \beta_{5} + \cdots + 4) q^{6}+ \cdots + (15 \beta_{9} - 30 \beta_{7} + \cdots + 13) q^{99}+O(q^{100}) $ q + b1 * q^2 + (2b6 - b5 - 2) q^3 + (b8 + 7b6 - b4 - 7) q^4 + (-b9 + 2b7 + b5 + 2b4 + b3 - 3b2 - b1 + 4) q^6 + (b9 + 2b6 + b4 + b3 - b2 - b1 + 5) q^7 + (-4b3 - 5b2 - 4) * q^8 + (b9 - b8 + b7 - 17b6 + 3b5 + 2b3 + b2) q^9 + (2b9 + b8 - b7 + 9b6 - 2b5 - b4 - b3 - 6b2 + 7b1 - 9) q^11 + (b9 - b8 + b7 - 25b6 + 9b5 + 8b3 + b2 + 11b1) * q^12 + (-3b9 + 6b7 + 3b5 + b4 + b3 + b2 - 3b1 + 1) * q^13 + (2b9 + b8 + b7 - 27b6 + 8b5 + b3 + 2b2 + 9b1 + 14) q^14 + (-4b9 - 5b8 - 4b7 - 35b6 - 4b5 - 4b2 + 4b1) q^16 + (6b8 + 2b6 - 2b5 - 6b4 + 4b2 - 4b1 - 2) * q^17 + (6b9 + 7b8 - 3b7 + 15b6 + 4b5 - 7b4 - 3b3 + 32b2 - 29b1 - 15) q^18 + (3b9 - b8 + 3b7 + 9b6 - 3b5 - 6b3 + 3b2 - 12b1) q^19 + (5b9 + 3b8 - 5b7 - 30b6 - 11b5 - 4b4 - 8b3 + 27b2 - 6b1 + 28) q^21 + (-b9 + 2b7 + b5 - 5b4 - 11b3 - 13b2 - b1 - 97) * q^22 + (-3b9 - 9b8 - 3b7 + 37b6 + 3b3 - 3b2 + 10b1) q^23 + (2b9 + 14b8 - b7 + 172b6 + 4b5 - 14b4 - b3 + 20b2 - 19b1 - 172) q^24 + (b9 + 3b8 + b7 - b6 + 29b5 + 28b3 + b2 - 4b1) * q^26 + (4b9 - 8b7 - 4b5 + 6b4 - 5b3 + 6b2 + 4b1 + 102) q^27 + (11b9 + 8b8 - 6b7 + 124b6 + b5 - 19b4 - 11b3 + 21b2 - 123) q^28 + (-3b9 + 6b7 + 3b5 - 13b4 - b3 + 31b2 - 3b1 + 34) * q^29 + (-8b9 - 8b8 + 4b7 + 78b6 - 8b5 + 8b4 + 4b3 - 14b2 + 10b1 - 78) q^31 + (-8b9 - 8b8 + 4b7 + 28b6 - 20b5 + 8b4 + 4b3 + 5b2 - 9b1 - 28) q^32 + (8b9 + 12b8 + 8b7 - 54b6 + 8b5 + 8b2 + 8b1) q^33 + (-2b9 + 4b7 + 2b5 + 8b4 - 22b3 - 40b2 - 2b1 + 44) q^34 + (-b9 + 2b7 + b5 + 7b4 - 35b3 - 33b2 - b1 + 267) * q^36 + (5b9 - 11b8 + 5b7 - 19b6 + b5 - 4b3 + 5b2 - 42b1) q^37 + (-6b9 - 15b8 + 3b7 - 175b6 + 20b5 + 15b4 + 3b3 - 3b1 + 175) * q^38 + (4b9 - 2b8 - 2b7 + 8b6 + 28b5 + 2b4 - 2b3 + 82b2 - 80b1 - 8) q^39 + (14b4 + 26b3 + 2b2 - 67) q^41 + (-14b9 + 5b8 + 9b7 + 249b6 - 16b5 + 23b4 - 35b3 + 3b2 + 2b1 + 147) q^42 + (-8b9 + 16b7 + 8b5 + 4b4 + 15b3 + 56b2 - 8b1 - 126) q^43 + (-3b9 - 27b8 - 3b7 - 195b6 - 31b5 - 28b3 - 3b2 - 60b1) * q^44 + (7b8 + 93b6 - 60b5 - 7b4 + 8b2 - 8b1 - 93) * q^46 + (-9b9 - 15b8 - 9b7 - 97b6 + 9b5 + 18b3 - 9b2 - 24b1) * q^47 + (-3b9 + 6b7 + 3b5 + b4 + 3b3 - 152b2 - 3b1 + 17) * q^48 + (-2b9 + 19b8 - 5b7 + 56b6 - 30b5 + 7b4 + 5b3 - 30b2 + 25b1 + 67) q^49 + (4b9 - 16b8 + 4b7 - 166b6 + 12b5 + 8b3 + 4b2 + 82b1) * q^51 + (10b9 + 47b8 - 5b7 + 67b6 + 36b5 - 47b4 - 5b3 + 28b2 - 23b1 - 67) q^52 + (6b9 + 13b8 - 3b7 - 61b6 - 18b5 - 13b4 - 3b3 + 10b2 - 7b1 + 61) q^53 + (-5b9 - 4b8 - 5b7 + 126b6 - 13b5 - 8b3 - 5b2 + 160b1) * q^54 + (-7b9 + 4b8 + 5b7 + 54b6 - 3b5 - 5b4 - 64b3 - 67b2 - 62b1 - 115) q^56 + (10b9 - 20b7 - 10b5 - 20b4 - 32b3 + 90b2 + 10b1 - 202) q^57 + (-b9 + 29b8 - b7 + 385b6 - 29b5 - 28b3 - b2 - 51b1) q^58 + (-8b9 + 8b8 + 4b7 + 134b6 - 6b5 - 8b4 + 4b3 - 50b2 + 46b1 - 134) q^59 + (-3b9 - b8 - 3b7 - 382b6 - b5 + 2b3 - 3b2 - 38b1) * q^61 + (-12b9 + 24b7 + 12b5 + 14b4 + 76b3 - 54b2 - 12b1 - 102) q^62 + (-21b9 - 29b8 - b7 + 3b6 - 29b5 + 30b4 + 8b3 - 95b2 + 150b1 - 200) * q^63 + (8b9 - 16b7 - 8b5 + 17b4 + 56b3 - 16b2 + 8b1 - 49) q^64 + (16b9 + 32b8 - 8b7 + 256b6 + 112b5 - 32b4 - 8b3 + 22b2 - 14b1 - 256) q^66 + (24b9 - 26b8 - 12b7 - 206b6 - 71b5 + 26b4 - 12b3 - 54b2 + 66b1 + 206) q^67 + (-22b9 - 36b8 - 22b7 - 656b6 + 10b5 + 32b3 - 22b2 + 98b1) * q^68 + (-b9 + 2b7 + b5 + 23b4 + 59b3 - 201b2 - b1 + 92) * q^69 + (4b9 - 8b7 - 4b5 - 32b4 + 10b3 + 62b2 + 4b1 + 154) q^71 + (-11b9 - 47b8 - 11b7 - 495b6 + 57b5 + 68b3 - 11b2 + 120b1) * q^72 + (4b9 - 8b8 - 2b7 + 364b6 - 46b5 + 8b4 - 2b3 + 76b2 - 74b1 - 364) q^73 + (2b9 - 35b8 - b7 - 635b6 - 4b5 + 35b4 - b3 + 102b2 - 101b1 + 635) q^74 + (-7b9 + 14b7 + 7b5 - 39b4 + 43b3 + 201b2 - 7b1 + 85) q^76 + (38b9 + 39b8 - 27b7 - 127b6 - 24b5 - 35b4 - 59b3 - 46b2 + 93b1 - 3) q^77 + (30b9 - 60b7 - 30b5 + 20b4 - 38b3 + 40b2 + 30b1 + 1104) q^78 + (6b9 + 22b8 + 6b7 - 80b6 + 96b5 + 90b3 + 6b2 + 2b1) * q^79 + (12b9 - 28b8 - 6b7 - 65b6 - 94b5 + 28b4 - 6b3 - 58b2 + 64b1 + 65) q^81 + (26b9 + 54b8 + 26b7 + 190b6 + 82b5 + 56b3 + 26b2 - 35b1) * q^82 + (36b9 - 72b7 - 36b5 - 22b4 + 3b3 - 22b2 + 36b1 + 282) q^83 + (-25b9 - 38b8 + 6b7 - 98b6 + 81b5 + 36b4 + 89b3 - 195b2 + 403b1 - 42) q^84 + (15b9 + 86b8 + 15b7 + 852b6 + 95b5 + 80b3 + 15b2 - 156b1) * q^86 + (-32b9 - 74b8 + 16b7 - 120b6 + 9b5 + 74b4 + 16b3 - 192b2 + 176b1 + 120) q^87 + (-78b9 - 85b8 + 39b7 - 377b6 - 36b5 + 85b4 + 39b3 + 174b2 - 213b1 + 377) q^88 + (-23b9 - 3b8 - 23b7 - 476b6 - 63b5 - 40b3 - 23b2 + 138b1) * q^89 + (-7b9 - 38b8 + 12b7 + 656b6 - 17b5 + 65b4 - 71b3 + 87b2 + 29b1 - 269) q^91 + (-36b9 + 72b7 + 36b5 + 56b4 + 32b3 - 139b2 - 36b1 + 628) q^92 + (18b9 + 16b8 + 18b7 - 456b6 + 128b5 + 110b3 + 18b2 - 228b1) * q^93 + (18b9 - 15b8 - 9b7 - 447b6 - 132b5 + 15b4 - 9b3 + 178b2 - 169b1 + 447) q^94 + (11b9 - 34b8 + 11b7 - 912b6 + 71b5 + 60b3 + 11b2 - 152b1) * q^96 + (-8b9 + 16b7 + 8b5 + 24b4 + 8b3 + 40b2 - 8b1 - 126) q^97 + (-27b9 - 2b8 + 60b7 + 54b6 + 103b5 + 37b4 + 49b3 - 206b2 + 258b1 - 299) q^98 + (15b9 - 30b7 - 15b5 + b4 - 83b3 + 91b2 + 15b1 + 13) * q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 10 q + q^{2} - 8 q^{3} - 35 q^{4} + 32 q^{6} + 62 q^{7} - 66 q^{8} - 81 q^{9}+O(q^{10}) $ 10 * q + q^2 - 8 * q^3 - 35 * q^4 + 32 * q^6 + 62 * q^7 - 66 * q^8 - 81 * q^9	\( 10 q + q^{2} - 8 q^{3} - 35 q^{4} + 32 q^{6} + 62 q^{7} - 66 q^{8} - 81 q^{9} - 47 q^{11} - 98 q^{12} - 2 q^{13} + 7 q^{14} - 171 q^{16} - 2 q^{17} - 51 q^{18} + 21 q^{19} + 178 q^{21} - 1046 q^{22} + 201 q^{23} - 848 q^{24} + 47 q^{26} + 1036 q^{27} - 597 q^{28} + 380 q^{29} - 388 q^{31} - 95 q^{32} - 262 q^{33} + 260 q^{34} + 2458 q^{36} - 145 q^{37} + 835 q^{38} - 14 q^{39} - 562 q^{41} + 2592 q^{42} - 1136 q^{43} - 1091 q^{44} - 337 q^{46} - 473 q^{47} - 140 q^{48} + 998 q^{49} - 732 q^{51} - 379 q^{52} + 351 q^{53} + 774 q^{54} - 1338 q^{56} - 1908 q^{57} + 1818 q^{58} - 708 q^{59} - 1944 q^{61} - 896 q^{62} - 1955 q^{63} - 250 q^{64} - 1482 q^{66} + 1118 q^{67} - 3118 q^{68} + 748 q^{69} + 1728 q^{71} - 2219 q^{72} - 1652 q^{73} + 3285 q^{74} + 1382 q^{76} - 787 q^{77} + 11148 q^{78} - 218 q^{79} + 455 q^{81} + 1027 q^{82} + 3004 q^{83} - 734 q^{84} + 4264 q^{86} + 390 q^{87} + 2131 q^{88} - 2322 q^{89} + 524 q^{91} + 5914 q^{92} - 2288 q^{93} + 2677 q^{94} - 4592 q^{96} - 1196 q^{97} - 2971 q^{98} + 70 q^{99}+O(q^{100}) \) 10 * q + q^2 - 8 * q^3 - 35 * q^4 + 32 * q^6 + 62 * q^7 - 66 * q^8 - 81 * q^9 - 47 * q^11 - 98 * q^12 - 2 * q^13 + 7 * q^14 - 171 * q^16 - 2 * q^17 - 51 * q^18 + 21 * q^19 + 178 * q^21 - 1046 * q^22 + 201 * q^23 - 848 * q^24 + 47 * q^26 + 1036 * q^27 - 597 * q^28 + 380 * q^29 - 388 * q^31 - 95 * q^32 - 262 * q^33 + 260 * q^34 + 2458 * q^36 - 145 * q^37 + 835 * q^38 - 14 * q^39 - 562 * q^41 + 2592 * q^42 - 1136 * q^43 - 1091 * q^44 - 337 * q^46 - 473 * q^47 - 140 * q^48 + 998 * q^49 - 732 * q^51 - 379 * q^52 + 351 * q^53 + 774 * q^54 - 1338 * q^56 - 1908 * q^57 + 1818 * q^58 - 708 * q^59 - 1944 * q^61 - 896 * q^62 - 1955 * q^63 - 250 * q^64 - 1482 * q^66 + 1118 * q^67 - 3118 * q^68 + 748 * q^69 + 1728 * q^71 - 2219 * q^72 - 1652 * q^73 + 3285 * q^74 + 1382 * q^76 - 787 * q^77 + 11148 * q^78 - 218 * q^79 + 455 * q^81 + 1027 * q^82 + 3004 * q^83 - 734 * q^84 + 4264 * q^86 + 390 * q^87 + 2131 * q^88 - 2322 * q^89 + 524 * q^91 + 5914 * q^92 - 2288 * q^93 + 2677 * q^94 - 4592 * q^96 - 1196 * q^97 - 2971 * q^98 + 70 * q^99

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{10} - x^{9} + 38 x^{8} - 5 x^{7} + 1102 x^{6} - 137 x^{5} + 11161 x^{4} + 10784 x^{3} + 81600 x^{2} + \cdots + 4096 $ x^10 - x^9 + 38*x^8 - 5*x^7 + 1102*x^6 - 137*x^5 + 11161*x^4 + 10784*x^3 + 81600*x^2 + 18432*x + 4096 :

$\beta_{1}$	$=$	$ \nu $ v
$\beta_{2}$	$=$	$ ( 67990957 \nu^{9} + 304117491 \nu^{8} - 1131828850 \nu^{7} + 13487902815 \nu^{6} + \cdots - 6897867839488 ) / 31151769983040 $ (67990957v^9 + 304117491v^8 - 1131828850v^7 + 13487902815v^6 - 26587151786v^5 + 315507626027v^4 - 3095794489275v^3 + 2949321585728v^2 + 667176691712*v - 6897867839488) / 31151769983040
$\beta_{3}$	$=$	$ ( - 67990957 \nu^{9} - 304117491 \nu^{8} + 1131828850 \nu^{7} - 13487902815 \nu^{6} + \cdots + 964197366528 ) / 5933670472960 $ (-67990957v^9 - 304117491v^8 + 1131828850v^7 - 13487902815v^6 + 26587151786v^5 - 315507626027v^4 + 1612376871035v^3 - 2949321585728v^2 - 667176691712*v + 964197366528) / 5933670472960
$\beta_{4}$	$=$	$ ( 11628389 \nu^{9} - 116108913 \nu^{8} + 432120550 \nu^{7} - 3172287075 \nu^{6} + \cdots - 14611095022046 ) / 973492811970 $ (11628389v^9 - 116108913v^8 + 432120550v^7 - 3172287075v^6 + 10150699598v^5 - 120457548761v^4 + 69253347045v^3 - 1126020480704v^2 - 254721161216*v - 14611095022046) / 973492811970
$\beta_{5}$	$=$	$ ( 4820632391 \nu^{9} - 390031347 \nu^{8} + 133770984310 \nu^{7} + 159796525845 \nu^{6} + \cdots - 19549052954624 ) / 124607079932160 $ (4820632391v^9 - 390031347v^8 + 133770984310v^7 + 159796525845v^6 + 3115250087102v^5 + 3659456985241v^4 + 2539361057595v^3 + 83680619512084v^2 - 85842523189184*v - 19549052954624) / 124607079932160
$\beta_{6}$	$=$	$ ( - 3368099531 \nu^{9} + 3232117617 \nu^{8} - 128596017160 \nu^{7} + 19104155355 \nu^{6} + \cdots - 1111623972736 ) / 62303539966080 $ (-3368099531v^9 + 3232117617v^8 - 128596017160v^7 + 19104155355v^6 - 3738621488792v^5 + 514603939319v^4 - 38222374117545v^3 - 30129996363754v^2 - 280735564901056*v - 1111623972736) / 62303539966080
$\beta_{7}$	$=$	$ ( - 67184414639 \nu^{9} + 120707548543 \nu^{8} - 2557944561930 \nu^{7} + \cdots + 10\!\cdots\!16 ) / 124607079932160 $ (-67184414639v^9 + 120707548543v^8 - 2557944561930v^7 + 2303381230155v^6 - 72511819908578v^5 + 62933278609671v^4 - 713397657742695v^3 - 254390750232976v^2 - 4584448884673664*v + 1076959689551616) / 124607079932160
$\beta_{8}$	$=$	$ ( 51265709861 \nu^{9} - 55912734687 \nu^{8} + 1956595972600 \nu^{7} - 489588703125 \nu^{6} + \cdots + 16117377671296 ) / 62303539966080 $ (51265709861v^9 - 55912734687v^8 + 1956595972600v^7 - 489588703125v^6 + 56728967106152v^5 - 15428342210489v^4 + 577767825974055v^3 + 442188174657334v^2 + 4194731319198016*v + 16117377671296) / 62303539966080
$\beta_{9}$	$=$	$ ( - 4422875078 \nu^{9} + 5510185721 \nu^{8} - 166403566775 \nu^{7} + 50720325600 \nu^{6} + \cdots - 38555263356608 ) / 4450252854720 $ (-4422875078v^9 + 5510185721v^8 - 166403566775v^7 + 50720325600v^6 - 4797330293411v^5 + 1412052643312v^4 - 47449610197425v^3 - 45225046069717v^2 - 341772798436368*v - 38555263356608) / 4450252854720

Display $\nu^j$ in terms of $\beta_i$

$\nu$	$=$	$ \beta_1 $ b1
$\nu^{2}$	$=$	$ \beta_{8} + 15\beta_{6} - \beta_{4} - 15 $ b8 + 15*b6 - b4 - 15
$\nu^{3}$	$=$	$ -4\beta_{3} - 21\beta_{2} - 4 $ -4b3 - 21b2 - 4
$\nu^{4}$	$=$	$ -4\beta_{9} - 29\beta_{8} - 4\beta_{7} - 331\beta_{6} - 4\beta_{5} - 4\beta_{2} + 4\beta_1 $ -4b9 - 29b8 - 4b7 - 331b6 - 4b5 - 4b2 + 4*b1
$\nu^{5}$	$=$	$ - 8 \beta_{9} - 8 \beta_{8} + 4 \beta_{7} - 100 \beta_{6} - 148 \beta_{5} + 8 \beta_{4} + 4 \beta_{3} + \cdots + 100 $ -8b9 - 8b8 + 4b7 - 100b6 - 148b5 + 8b4 + 4b3 + 485b2 - 489*b1 + 100
$\nu^{6}$	$=$	$ -152\beta_{9} + 304\beta_{7} + 152\beta_{5} + 793\beta_{4} + 216\beta_{3} - 16\beta_{2} - 152\beta _1 + 7943 $ -152b9 + 304b7 + 152b5 + 793b4 + 216b3 - 16b2 - 152*b1 + 7943
$\nu^{7}$	$=$	$ 216 \beta_{9} + 416 \beta_{8} + 216 \beta_{7} + 2580 \beta_{6} + 4604 \beta_{5} + 4388 \beta_{3} + \cdots + 11813 \beta_1 $ 216b9 + 416b8 + 216b7 + 2580b6 + 4604b5 + 4388b3 + 216b2 + 11813b1
$\nu^{8}$	$=$	$ 9208 \beta_{9} + 21237 \beta_{8} - 4604 \beta_{7} + 198787 \beta_{6} + 3392 \beta_{5} - 21237 \beta_{4} + \cdots - 198787 $ 9208b9 + 21237b8 - 4604b7 + 198787b6 + 3392b5 - 21237b4 - 4604b3 + 4780b2 - 176*b1 - 198787
$\nu^{9}$	$=$	$ 7996 \beta_{9} - 15992 \beta_{7} - 7996 \beta_{5} - 15816 \beta_{4} - 129776 \beta_{3} - 304401 \beta_{2} + \cdots - 77460 $ 7996b9 - 15992b7 - 7996b5 - 15816b4 - 129776b3 - 304401b2 + 7996*b1 - 77460

Display $\beta_i$ in terms of $\nu^j$

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/175\mathbb{Z}\right)^\times$.

$n$	$101$	$127$
$\chi(n)$	$-\beta_{6}$	$1$

Embeddings

For each embedding $\iota_m$ of the coefficient field, the values $\iota_m(a_n)$ are shown below.

For more information on an embedded modular form you can click on its label.

comment: embeddings in the coefficient field

gp: mfembed(f)

Label

$\iota_m(\nu)$

$ a_{2} $

$ a_{3} $

$ a_{4} $

$ a_{5} $

$ a_{6} $

$ a_{7} $

$ a_{8} $

$ a_{9} $

$ a_{10} $

51.1

−2.51265	+	4.35203i
−1.39853	+	2.42233i
−0.113749	+	0.197018i
1.92311	−	3.33093i
2.60181	−	4.50647i
−2.51265	−	4.35203i
−1.39853	−	2.42233i
−0.113749	−	0.197018i
1.92311	+	3.33093i
2.60181	+	4.50647i

−2.51265

4.35203i

−4.17191

−

7.22596i

−8.62677

−

14.9420i

41.9301

16.7884

−

7.81984i

46.5017

−21.3097

36.9094i

51.2

−1.39853

2.42233i

3.10692

5.38134i

0.0882227

0.152806i

−17.3805

16.7384

7.92622i

−22.8700

−5.80586

10.0560i

51.3

−0.113749

0.197018i

−0.904291

−

1.56628i

3.97412

6.88338i

0.411448

−8.20612

−

16.6030i

−3.62818

11.8645

−

20.5499i

51.4

1.92311

−

3.33093i

−4.48397

−

7.76647i

−3.39672

−

5.88330i

−34.4927

−12.3509

13.8005i

4.64067

−26.7120

46.2666i

51.5

2.60181

−

4.50647i

2.45326

4.24917i

−9.53885

−

16.5218i

25.5317

18.0302

−

4.23212i

−57.6442

1.46305

−

2.53407i

151.1