L(s) = 1 | + (−0.942 − 0.334i)2-s + (−0.979 − 0.203i)3-s + (0.775 + 0.631i)4-s + (0.854 + 0.519i)6-s + (0.816 − 0.576i)7-s + (−0.519 − 0.854i)8-s + (0.917 + 0.398i)9-s + (−0.460 − 0.887i)11-s + (−0.631 − 0.775i)12-s + (−0.730 + 0.682i)13-s + (−0.962 + 0.269i)14-s + (0.203 + 0.979i)16-s + (0.887 + 0.460i)17-s + (−0.730 − 0.682i)18-s + (−0.0682 + 0.997i)19-s + ⋯ |
L(s) = 1 | + (−0.942 − 0.334i)2-s + (−0.979 − 0.203i)3-s + (0.775 + 0.631i)4-s + (0.854 + 0.519i)6-s + (0.816 − 0.576i)7-s + (−0.519 − 0.854i)8-s + (0.917 + 0.398i)9-s + (−0.460 − 0.887i)11-s + (−0.631 − 0.775i)12-s + (−0.730 + 0.682i)13-s + (−0.962 + 0.269i)14-s + (0.203 + 0.979i)16-s + (0.887 + 0.460i)17-s + (−0.730 − 0.682i)18-s + (−0.0682 + 0.997i)19-s + ⋯ |
\[\begin{aligned}\Lambda(s)=\mathstrut & 235 ^{s/2} \, \Gamma_{\R}(s) \, L(s)\cr =\mathstrut & (0.463 - 0.886i)\, \overline{\Lambda}(1-s) \end{aligned}\]
\[\begin{aligned}\Lambda(s)=\mathstrut & 235 ^{s/2} \, \Gamma_{\R}(s) \, L(s)\cr =\mathstrut & (0.463 - 0.886i)\, \overline{\Lambda}(1-s) \end{aligned}\]
Particular Values
\(L(\frac{1}{2})\) |
\(\approx\) |
\(0.5052808607 - 0.3059598761i\) |
\(L(\frac12)\) |
\(\approx\) |
\(0.5052808607 - 0.3059598761i\) |
\(L(1)\) |
\(\approx\) |
\(0.5641086318 - 0.1687053326i\) |
\(L(1)\) |
\(\approx\) |
\(0.5641086318 - 0.1687053326i\) |
\(L(s) = \displaystyle \prod_{p} F_p(p^{-s})^{-1} \)
| $p$ | $F_p(T)$ |
---|
bad | 5 | \( 1 \) |
| 47 | \( 1 \) |
good | 2 | \( 1 + (-0.942 - 0.334i)T \) |
| 3 | \( 1 + (-0.979 - 0.203i)T \) |
| 7 | \( 1 + (0.816 - 0.576i)T \) |
| 11 | \( 1 + (-0.460 - 0.887i)T \) |
| 13 | \( 1 + (-0.730 + 0.682i)T \) |
| 17 | \( 1 + (0.887 + 0.460i)T \) |
| 19 | \( 1 + (-0.0682 + 0.997i)T \) |
| 23 | \( 1 + (0.942 - 0.334i)T \) |
| 29 | \( 1 + (0.682 - 0.730i)T \) |
| 31 | \( 1 + (-0.203 - 0.979i)T \) |
| 37 | \( 1 + (-0.269 + 0.962i)T \) |
| 41 | \( 1 + (-0.854 - 0.519i)T \) |
| 43 | \( 1 + (0.631 - 0.775i)T \) |
| 53 | \( 1 + (0.519 - 0.854i)T \) |
| 59 | \( 1 + (0.775 - 0.631i)T \) |
| 61 | \( 1 + (0.962 - 0.269i)T \) |
| 67 | \( 1 + (0.816 + 0.576i)T \) |
| 71 | \( 1 + (-0.334 - 0.942i)T \) |
| 73 | \( 1 + (-0.398 - 0.917i)T \) |
| 79 | \( 1 + (0.990 + 0.136i)T \) |
| 83 | \( 1 + (0.887 - 0.460i)T \) |
| 89 | \( 1 + (0.0682 + 0.997i)T \) |
| 97 | \( 1 + (0.979 + 0.203i)T \) |
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\(L(s) = \displaystyle\prod_p \ (1 - \alpha_{p}\, p^{-s})^{-1}\)
Imaginary part of the first few zeros on the critical line
−26.71547210953729396939530896817, −25.426205580725199275275648952493, −24.72296729925192424611000101994, −23.70367192136416407680903667405, −23.00360497630812684694675295167, −21.67276891542172628318585718722, −20.88736448975119284257619295525, −19.78336903193265755484165194092, −18.566612324935614794827876928518, −17.76872635345123988161567738355, −17.36158831567626147726756396582, −16.14629676716564539140574434957, −15.326404909087835919483988195046, −14.57759484083051458105120625937, −12.653935039904713010379120213, −11.80755375430470039160499645569, −10.837715368085660369931394060344, −10.01275095345073632885998153799, −8.97883409627303463110471728468, −7.632135629370227447609177806113, −6.900775355519948488424635626826, −5.369116932156613557528515188395, −4.98277015090294643535757259358, −2.629585680122703646518878004049, −1.147896270835391706689609752865,
0.81141774743590486864765580650, 2.04182335276727311829784588673, 3.806864974106436157364147624280, 5.22469754074564010975384489337, 6.48473198326051075890487934399, 7.55001367174188146120986974346, 8.35123213517555848928489190324, 9.92269852687937287440669131553, 10.62732912931592143382025547127, 11.53329936469120575413446783088, 12.25685383921032930100969020689, 13.50485313312434877978249875846, 14.89761808915082015059678849831, 16.28488479054863667170085284242, 16.90657632388682266124590601389, 17.52575804667551999674189395899, 18.80407950250036186632111022292, 19.0548222216673502447182206146, 20.71442153530039945477252811202, 21.23657645527739217428838610992, 22.25644342163386751356621722268, 23.60511166652809011846178593444, 24.19602147336753469312825445762, 25.169102192267666384190668396963, 26.54435903649874839932457074293