L(s) = 1 | + (0.978 − 0.207i)2-s + (0.913 − 0.406i)4-s + (0.978 + 0.207i)5-s + (−0.104 + 0.994i)7-s + (0.809 − 0.587i)8-s + 10-s + (0.669 + 0.743i)13-s + (0.104 + 0.994i)14-s + (0.669 − 0.743i)16-s + (−0.309 − 0.951i)17-s + (−0.809 + 0.587i)19-s + (0.978 − 0.207i)20-s + (0.5 − 0.866i)23-s + (0.913 + 0.406i)25-s + (0.809 + 0.587i)26-s + ⋯ |
L(s) = 1 | + (0.978 − 0.207i)2-s + (0.913 − 0.406i)4-s + (0.978 + 0.207i)5-s + (−0.104 + 0.994i)7-s + (0.809 − 0.587i)8-s + 10-s + (0.669 + 0.743i)13-s + (0.104 + 0.994i)14-s + (0.669 − 0.743i)16-s + (−0.309 − 0.951i)17-s + (−0.809 + 0.587i)19-s + (0.978 − 0.207i)20-s + (0.5 − 0.866i)23-s + (0.913 + 0.406i)25-s + (0.809 + 0.587i)26-s + ⋯ |
\[\begin{aligned}\Lambda(s)=\mathstrut & 99 ^{s/2} \, \Gamma_{\R}(s+1) \, L(s)\cr =\mathstrut & (0.999 + 0.0111i)\, \overline{\Lambda}(1-s) \end{aligned}\]
\[\begin{aligned}\Lambda(s)=\mathstrut & 99 ^{s/2} \, \Gamma_{\R}(s+1) \, L(s)\cr =\mathstrut & (0.999 + 0.0111i)\, \overline{\Lambda}(1-s) \end{aligned}\]
Particular Values
\(L(\frac{1}{2})\) |
\(\approx\) |
\(3.685802941 + 0.02051661415i\) |
\(L(\frac12)\) |
\(\approx\) |
\(3.685802941 + 0.02051661415i\) |
\(L(1)\) |
\(\approx\) |
\(2.249366739 - 0.05610601411i\) |
\(L(1)\) |
\(\approx\) |
\(2.249366739 - 0.05610601411i\) |
\(L(s) = \displaystyle \prod_{p} F_p(p^{-s})^{-1} \)
| $p$ | $F_p(T)$ |
---|
bad | 3 | \( 1 \) |
| 11 | \( 1 \) |
good | 2 | \( 1 + (0.978 - 0.207i)T \) |
| 5 | \( 1 + (0.978 + 0.207i)T \) |
| 7 | \( 1 + (-0.104 + 0.994i)T \) |
| 13 | \( 1 + (0.669 + 0.743i)T \) |
| 17 | \( 1 + (-0.309 - 0.951i)T \) |
| 19 | \( 1 + (-0.809 + 0.587i)T \) |
| 23 | \( 1 + (0.5 - 0.866i)T \) |
| 29 | \( 1 + (0.104 - 0.994i)T \) |
| 31 | \( 1 + (0.669 + 0.743i)T \) |
| 37 | \( 1 + (-0.809 - 0.587i)T \) |
| 41 | \( 1 + (0.104 + 0.994i)T \) |
| 43 | \( 1 + (-0.5 - 0.866i)T \) |
| 47 | \( 1 + (-0.913 - 0.406i)T \) |
| 53 | \( 1 + (-0.309 + 0.951i)T \) |
| 59 | \( 1 + (-0.913 + 0.406i)T \) |
| 61 | \( 1 + (0.669 - 0.743i)T \) |
| 67 | \( 1 + (-0.5 + 0.866i)T \) |
| 71 | \( 1 + (-0.309 - 0.951i)T \) |
| 73 | \( 1 + (-0.809 - 0.587i)T \) |
| 79 | \( 1 + (-0.978 + 0.207i)T \) |
| 83 | \( 1 + (-0.669 + 0.743i)T \) |
| 89 | \( 1 - T \) |
| 97 | \( 1 + (-0.978 + 0.207i)T \) |
show more | |
show less | |
\(L(s) = \displaystyle\prod_p \ (1 - \alpha_{p}\, p^{-s})^{-1}\)
Imaginary part of the first few zeros on the critical line
−29.84685902416990705137912110732, −29.12456893968557375918316114303, −27.832271011740416246216619933547, −26.10116204831624847597407627706, −25.61541068227311421264762268575, −24.36892624277416967816700159388, −23.490540130407806872743529286304, −22.454725930214168374469773395361, −21.38320041451543379904942382541, −20.58495774105885631602537411571, −19.52837304822510356884124610725, −17.59868319527231657027817914835, −16.95259388558132252401123056984, −15.66199084573634284775680671807, −14.46874236792095060594225982351, −13.33359542008291754446321718229, −12.90629486801039128797502741282, −11.106168655869877009122371871614, −10.20429770394862653137432890514, −8.42526228320903921884982527643, −6.920425434986449551039122430410, −5.91163391345570644842487536540, −4.62068151768167578564977916437, −3.23878812981664456107081630998, −1.537819220715635234215962542965,
1.82032080355955512539737380009, 2.91241588637349249487787090820, 4.66720816092786048160114886669, 5.91496012555416373785750630733, 6.72350252836588250893375135064, 8.78549769167699739438726594166, 10.08748037238663612348454265714, 11.33309940511468143041096900465, 12.45940200661337955780537671413, 13.553195840776865458065363573904, 14.45231573572195660642757048998, 15.57498156557796617167187754613, 16.71596463542801669489427064249, 18.27146455655480068915227546699, 19.17136221358923375501847757069, 20.80021696708394487442402566125, 21.34194768388916896848651754565, 22.34291715932501956402954854393, 23.25622963952359734802720259251, 24.77335336297141374274072134308, 25.12974590391759873935761551771, 26.38736329726148475602012955661, 28.18146815185408221173775930179, 28.852898725193074491587963382934, 29.7941548601872562958796977885