L(s) = 1 | + (−0.0348 + 0.999i)2-s + (−0.997 − 0.0697i)4-s + (−0.766 − 0.642i)5-s + (0.961 − 0.275i)7-s + (0.104 − 0.994i)8-s + (0.669 − 0.743i)10-s + (−0.961 + 0.275i)11-s + (−0.882 − 0.469i)13-s + (0.241 + 0.970i)14-s + (0.990 + 0.139i)16-s + (0.809 + 0.587i)17-s + (−0.978 − 0.207i)19-s + (0.719 + 0.694i)20-s + (−0.241 − 0.970i)22-s + (0.241 + 0.970i)23-s + ⋯ |
L(s) = 1 | + (−0.0348 + 0.999i)2-s + (−0.997 − 0.0697i)4-s + (−0.766 − 0.642i)5-s + (0.961 − 0.275i)7-s + (0.104 − 0.994i)8-s + (0.669 − 0.743i)10-s + (−0.961 + 0.275i)11-s + (−0.882 − 0.469i)13-s + (0.241 + 0.970i)14-s + (0.990 + 0.139i)16-s + (0.809 + 0.587i)17-s + (−0.978 − 0.207i)19-s + (0.719 + 0.694i)20-s + (−0.241 − 0.970i)22-s + (0.241 + 0.970i)23-s + ⋯ |
\[\begin{aligned}\Lambda(s)=\mathstrut & 837 ^{s/2} \, \Gamma_{\R}(s+1) \, L(s)\cr =\mathstrut & (0.986 - 0.162i)\, \overline{\Lambda}(1-s) \end{aligned}\]
\[\begin{aligned}\Lambda(s)=\mathstrut & 837 ^{s/2} \, \Gamma_{\R}(s+1) \, L(s)\cr =\mathstrut & (0.986 - 0.162i)\, \overline{\Lambda}(1-s) \end{aligned}\]
Particular Values
\(L(\frac{1}{2})\) |
\(\approx\) |
\(1.018600787 - 0.08351373040i\) |
\(L(\frac12)\) |
\(\approx\) |
\(1.018600787 - 0.08351373040i\) |
\(L(1)\) |
\(\approx\) |
\(0.7538965551 + 0.2452937126i\) |
\(L(1)\) |
\(\approx\) |
\(0.7538965551 + 0.2452937126i\) |
\(L(s) = \displaystyle \prod_{p} F_p(p^{-s})^{-1} \)
| $p$ | $F_p(T)$ |
---|
bad | 3 | \( 1 \) |
| 31 | \( 1 \) |
good | 2 | \( 1 + (-0.0348 + 0.999i)T \) |
| 5 | \( 1 + (-0.766 - 0.642i)T \) |
| 7 | \( 1 + (0.961 - 0.275i)T \) |
| 11 | \( 1 + (-0.961 + 0.275i)T \) |
| 13 | \( 1 + (-0.882 - 0.469i)T \) |
| 17 | \( 1 + (0.809 + 0.587i)T \) |
| 19 | \( 1 + (-0.978 - 0.207i)T \) |
| 23 | \( 1 + (0.241 + 0.970i)T \) |
| 29 | \( 1 + (-0.0348 + 0.999i)T \) |
| 37 | \( 1 + T \) |
| 41 | \( 1 + (-0.990 + 0.139i)T \) |
| 43 | \( 1 + (0.848 + 0.529i)T \) |
| 47 | \( 1 + (0.374 + 0.927i)T \) |
| 53 | \( 1 + (-0.913 + 0.406i)T \) |
| 59 | \( 1 + (-0.0348 - 0.999i)T \) |
| 61 | \( 1 + (0.766 - 0.642i)T \) |
| 67 | \( 1 + (0.173 - 0.984i)T \) |
| 71 | \( 1 + (0.104 - 0.994i)T \) |
| 73 | \( 1 + (-0.809 + 0.587i)T \) |
| 79 | \( 1 + (0.438 - 0.898i)T \) |
| 83 | \( 1 + (-0.848 - 0.529i)T \) |
| 89 | \( 1 + (-0.913 - 0.406i)T \) |
| 97 | \( 1 + (-0.719 - 0.694i)T \) |
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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
−21.84415817225493609936746577498, −21.05485447489577663028178510432, −20.53854684376876310851132407369, −19.4513517944030143628706128310, −18.75725408507856180031962328030, −18.39753436487277157592932273830, −17.36593817373213933666412960903, −16.49331076781022916206795136289, −15.22180607857816306401532885006, −14.611825862966897764277107214806, −13.91517084294726267005947738009, −12.76759401077238777413886789890, −11.97261549866567169108228619549, −11.39000095295383549641662151499, −10.58317488336365965372390362770, −9.913595969617070614852983019447, −8.618162892017226855141493693916, −8.02902297815633248005367332127, −7.176558719777380083702473589146, −5.670756940782593436599306972943, −4.72065594723922993081285002927, −4.01316124122484868384050141904, −2.720006664709512874582803882983, −2.254693839976377844309387364257, −0.70345744103976326842075871609,
0.35185982890789462163904205107, 1.544779461324793124237567319392, 3.24361041532065591226917471692, 4.43992765078119395367543286574, 4.94572203356167037069278452622, 5.7553096822258334692182954421, 7.17784927055942906417669921282, 7.82706282234616603701137543606, 8.24495436299223575411484614158, 9.314377739241100496170060437317, 10.3218841365578638608180606563, 11.238490962517735797714729031427, 12.552326687280625509216208394026, 12.847316919240378677914314119069, 14.065920912851273266825975341542, 14.92533645565713092494755268985, 15.359659846160330739135447359557, 16.305497591807326326002350523444, 17.138813146007556667678878160982, 17.598384896063439737791407283605, 18.633818617500251471046631199152, 19.41490199323116906275046705981, 20.31774666507038912677502098825, 21.21204754825942695618860486560, 21.95876085633536058918344024258