Elliptische Kurve/Y^2 ist X^3+X/Z mod 5/Zeta-Funktion/Aufgabe/Lösung

${\displaystyle {}E}$

${\displaystyle {}\mathbb {Z} /(5)}$

${\displaystyle {}{\mathfrak {O}},\,(0,0),\,(3,0),\,(2,0)}$

${\displaystyle {}N_{1}=4\,.}$

${\displaystyle {}Z(E;t)={\frac {1-2t+5t^{2}}{(1-t)(1-5t)}}\,.}$

${\displaystyle {}1-2t+5t^{2}}$

${\displaystyle {}1-2t+5t^{2}=(1-(1+2{\mathrm {i} })t)(1-(1-2{\mathrm {i} })t)\,,}$

es ist also

${\displaystyle {}\alpha ,\beta =1\pm 2{\mathrm {i} }\,}$

im Sinne von Fakt  (3). Somit ist nach Fakt  (5)

${\displaystyle {}{\begin{aligned}N_{r}&={\#\left(E({\mathbb {F} }_{5^{r}})\right)}\\&=5^{r}+1+(1+2{\mathrm {i} })^{r}+(1-2{\mathrm {i} })^{r}.\end{aligned}}}$

${\displaystyle {}N_{2}=25+1+(1+2{\mathrm {i} })^{2}+(1-2{\mathrm {i} })^{2}=26+2-8=20\,,}$

${\displaystyle {}N_{3}=125+1+(1+2{\mathrm {i} })^{3}+(1-2{\mathrm {i} })^{3}=126+2-24=104\,}$

und

${\displaystyle {}N_{4}=625+1+(1+2{\mathrm {i} })^{4}+(1-2{\mathrm {i} })^{4}=626+2-48+32=602\,.}$