Properties

Degree 2
Conductor $ 3 \cdot 5 \cdot 7 $
Sign $-0.680 - 0.733i$
Motivic weight 2
Primitive yes
Self-dual no
Analytic rank 0

Origins

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Normalization:  

Dirichlet series

L(s)  = 1  + (0.0859 − 0.148i)2-s + (−2.40 − 1.79i)3-s + (1.98 + 3.43i)4-s + (−4.85 + 1.19i)5-s + (−0.473 + 0.204i)6-s + (−6.99 + 0.246i)7-s + 1.37·8-s + (2.58 + 8.61i)9-s + (−0.239 + 0.825i)10-s + (−10.0 + 5.79i)11-s + (1.37 − 11.8i)12-s + 7.34i·13-s + (−0.564 + 1.06i)14-s + (13.8 + 5.81i)15-s + (−7.82 + 13.5i)16-s + (−2.30 − 3.99i)17-s + ⋯
L(s)  = 1  + (0.0429 − 0.0744i)2-s + (−0.802 − 0.596i)3-s + (0.496 + 0.859i)4-s + (−0.970 + 0.239i)5-s + (−0.0789 + 0.0340i)6-s + (−0.999 + 0.0351i)7-s + 0.171·8-s + (0.287 + 0.957i)9-s + (−0.0239 + 0.0825i)10-s + (−0.913 + 0.527i)11-s + (0.114 − 0.985i)12-s + 0.565i·13-s + (−0.0403 + 0.0759i)14-s + (0.921 + 0.387i)15-s + (−0.488 + 0.846i)16-s + (−0.135 − 0.234i)17-s + ⋯

Functional equation

\[\begin{aligned}\Lambda(s)=\mathstrut & 105 ^{s/2} \, \Gamma_{\C}(s) \, L(s)\cr =\mathstrut & (-0.680 - 0.733i)\, \overline{\Lambda}(3-s) \end{aligned}\]
\[\begin{aligned}\Lambda(s)=\mathstrut & 105 ^{s/2} \, \Gamma_{\C}(s+1) \, L(s)\cr =\mathstrut & (-0.680 - 0.733i)\, \overline{\Lambda}(1-s) \end{aligned}\]

Invariants

\( d \)  =  \(2\)
\( N \)  =  \(105\)    =    \(3 \cdot 5 \cdot 7\)
\( \varepsilon \)  =  $-0.680 - 0.733i$
motivic weight  =  \(2\)
character  :  $\chi_{105} (44, \cdot )$
primitive  :  yes
self-dual  :  no
analytic rank  =  \(0\)
Selberg data  =  \((2,\ 105,\ (\ :1),\ -0.680 - 0.733i)\)
\(L(\frac{3}{2})\)  \(\approx\)  \(0.169031 + 0.387409i\)
\(L(\frac12)\)  \(\approx\)  \(0.169031 + 0.387409i\)
\(L(2)\)   not available
\(L(1)\)   not available

Euler product

\[L(s) = \prod_{p \text{ prime}} F_p(p^{-s})^{-1} \]where, for $p \notin \{3,\;5,\;7\}$,\(F_p(T)\) is a polynomial of degree 2. If $p \in \{3,\;5,\;7\}$, then $F_p(T)$ is a polynomial of degree at most 1.
$p$$F_p(T)$
bad3 \( 1 + (2.40 + 1.79i)T \)
5 \( 1 + (4.85 - 1.19i)T \)
7 \( 1 + (6.99 - 0.246i)T \)
good2 \( 1 + (-0.0859 + 0.148i)T + (-2 - 3.46i)T^{2} \)
11 \( 1 + (10.0 - 5.79i)T + (60.5 - 104. i)T^{2} \)
13 \( 1 - 7.34iT - 169T^{2} \)
17 \( 1 + (2.30 + 3.99i)T + (-144.5 + 250. i)T^{2} \)
19 \( 1 + (-5.93 + 10.2i)T + (-180.5 - 312. i)T^{2} \)
23 \( 1 + (11.8 - 20.5i)T + (-264.5 - 458. i)T^{2} \)
29 \( 1 + 32.7iT - 841T^{2} \)
31 \( 1 + (23.4 + 40.6i)T + (-480.5 + 832. i)T^{2} \)
37 \( 1 + (-41.2 - 23.8i)T + (684.5 + 1.18e3i)T^{2} \)
41 \( 1 - 70.7iT - 1.68e3T^{2} \)
43 \( 1 - 14.1iT - 1.84e3T^{2} \)
47 \( 1 + (26.1 - 45.2i)T + (-1.10e3 - 1.91e3i)T^{2} \)
53 \( 1 + (11.5 + 19.9i)T + (-1.40e3 + 2.43e3i)T^{2} \)
59 \( 1 + (-1.09 + 0.633i)T + (1.74e3 - 3.01e3i)T^{2} \)
61 \( 1 + (32.3 - 55.9i)T + (-1.86e3 - 3.22e3i)T^{2} \)
67 \( 1 + (-17.1 + 9.91i)T + (2.24e3 - 3.88e3i)T^{2} \)
71 \( 1 - 48.1iT - 5.04e3T^{2} \)
73 \( 1 + (107. - 62.2i)T + (2.66e3 - 4.61e3i)T^{2} \)
79 \( 1 + (34.4 - 59.6i)T + (-3.12e3 - 5.40e3i)T^{2} \)
83 \( 1 - 35.8T + 6.88e3T^{2} \)
89 \( 1 + (-110. - 63.8i)T + (3.96e3 + 6.85e3i)T^{2} \)
97 \( 1 + 26.9iT - 9.40e3T^{2} \)
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\[\begin{aligned}L(s) = \prod_p \ \prod_{j=1}^{2} (1 - \alpha_{j,p}\, p^{-s})^{-1}\end{aligned}\]

Imaginary part of the first few zeros on the critical line

−13.33804887204489191161708193200, −12.81689431753067291103717392794, −11.70380267740909358956694225399, −11.26931158888053563632072287154, −9.796366231770626791426410399596, −7.933547661913397870879746039933, −7.29705947846076166417458155521, −6.23291663798583462003738064798, −4.34429264604942956284474484461, −2.70683009346638642552299265249, 0.32223307126540957863418803080, 3.43013059127064022861180292850, 5.07101224202180740079585128007, 6.08233644825988014970164997423, 7.30201636302665370982281986557, 8.951743683415672487342724382058, 10.38877364738419727239825780975, 10.72706273206438504124523504337, 12.03056002148036607155029650127, 12.85368943362097135089025743061

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