Artin representation search results

Results (43 matches)

 

Galois conjugate representations are grouped into single lines.

Label	Dimension	Conductor	Ramified prime count	Artin stem field	$G$	Projective image	Container	Ind	$\chi(c)$
44.216...000.55.a.a	$44$	$ 2^{90} \cdot 3^{38} \cdot 5^{86}$	$3$	11.3.6561000000000000000000.1	$M_{11}$	$M_{11}$	55	$1$	$4$
45.199...000.110.a.a	$45$	$ 2^{102} \cdot 3^{40} \cdot 5^{88}$	$3$	11.3.6561000000000000000000.1	$M_{11}$	$M_{11}$	110	$1$	$-3$
45.125...352.336.a.a 45.125...352.336.a.b	$45$	$ 2^{136} \cdot 29^{39} \cdot 3917^{39}$	$3$	8.0.2252730971538337484304305478905626624.1	$A_8$	$A_8$	336	$0$	$-3$
45.296...752.336.a.a 45.296...752.336.a.b	$45$	$ 2^{176} \cdot 113^{39} \cdot 911^{39}$	$3$	8.0.319463173328482073097337827900516204544.1	$A_8$	$A_8$	336	$0$	$-3$
45.701...936.336.a.a 45.701...936.336.a.b	$45$	$ 2^{130} \cdot 11^{39} \cdot 74869^{39}$	$3$	8.0.1277992348243533546275162547509832257536.1	$A_8$	$A_8$	336	$0$	$-3$
45.703...232.336.a.a 45.703...232.336.a.b	$45$	$ 2^{130} \cdot 23^{39} \cdot 35809^{39}$	$3$	8.0.5113757317969899544771546325450569302016.1	$A_8$	$A_8$	336	$0$	$-3$
45.135...856.336.a.a 45.135...856.336.a.b	$45$	$ 2^{136} \cdot 11^{39} \cdot 299471^{39}$	$3$	8.0.1339937868468943908837290142533567581866950656.1	$A_8$	$A_8$	336	$0$	$-3$
45.470...888.336.a.a 45.470...888.336.a.b	$45$	$ 2^{130} \cdot 11^{39} \cdot 435593^{39}$	$3$	8.0.3172352108695376607450650959096645338500694016.1	$A_8$	$A_8$	336	$0$	$-3$
45.419...888.336.a.a 45.419...888.336.a.b	$45$	$ 2^{138} \cdot 7^{56} \cdot 268913^{39}$	$3$	8.0.36574214064047828349270556528863627894423814144.1	$A_8$	$A_8$	336	$0$	$-3$
45.163...752.336.a.a 45.163...752.336.a.b	$45$	$ 2^{138} \cdot 701^{39} \cdot 18797^{39}$	$3$	8.0.87813088530439533539051393535468530591915378212864.1	$A_8$	$A_8$	336	$0$	$-3$
45.163...776.336.a.a 45.163...776.336.a.b	$45$	$ 2^{138} \cdot 23^{39} \cdot 572903^{39}$	$3$	8.0.87815967535129608031908549089667529769029306679296.1	$A_8$	$A_8$	336	$0$	$-3$
45.494...176.336.a.a 45.494...176.336.a.b	$45$	$ 2^{130} \cdot 7^{56} \cdot 1075649^{39}$	$3$	8.0.2340710530180884465731804242655471841228462751744.1	$A_8$	$A_8$	336	$0$	$-3$
55.326...000.110.a.a	$55$	$ 2^{120} \cdot 3^{48} \cdot 5^{108}$	$3$	11.3.6561000000000000000000.1	$M_{11}$	$M_{11}$	110	$1$	$-1$
56.161...056.105.a.a	$56$	$ 2^{148} \cdot 29^{48} \cdot 3917^{48}$	$3$	8.0.2252730971538337484304305478905626624.1	$A_8$	$A_8$	105	$1$	$8$
56.258...504.105.a.a	$56$	$ 2^{202} \cdot 113^{48} \cdot 911^{48}$	$3$	8.0.319463173328482073097337827900516204544.1	$A_8$	$A_8$	105	$1$	$8$
56.128...424.105.a.a	$56$	$ 2^{150} \cdot 23^{48} \cdot 35809^{48}$	$3$	8.0.5113757317969899544771546325450569302016.1	$A_8$	$A_8$	105	$1$	$8$
56.205...264.105.a.a	$56$	$ 2^{154} \cdot 11^{48} \cdot 74869^{48}$	$3$	8.0.1277992348243533546275162547509832257536.1	$A_8$	$A_8$	105	$1$	$8$
56.253...696.105.a.a	$56$	$ 2^{148} \cdot 11^{48} \cdot 299471^{48}$	$3$	8.0.1339937868468943908837290142533567581866950656.1	$A_8$	$A_8$	105	$1$	$8$
56.102...296.105.a.a	$56$	$ 2^{144} \cdot 11^{48} \cdot 435593^{48}$	$3$	8.0.3172352108695376607450650959096645338500694016.1	$A_8$	$A_8$	105	$1$	$8$
56.548...144.105.a.a	$56$	$ 2^{156} \cdot 7^{70} \cdot 268913^{48}$	$3$	8.0.36574214064047828349270556528863627894423814144.1	$A_8$	$A_8$	105	$1$	$8$
56.514...696.105.a.a	$56$	$ 2^{156} \cdot 701^{48} \cdot 18797^{48}$	$3$	8.0.87813088530439533539051393535468530591915378212864.1	$A_8$	$A_8$	105	$1$	$8$
56.514...576.105.a.a	$56$	$ 2^{156} \cdot 23^{48} \cdot 572903^{48}$	$3$	8.0.87815967535129608031908549089667529769029306679296.1	$A_8$	$A_8$	105	$1$	$8$
56.106...784.105.a.a	$56$	$ 2^{144} \cdot 7^{70} \cdot 1075649^{48}$	$3$	8.0.2340710530180884465731804242655471841228462751744.1	$A_8$	$A_8$	105	$1$	$8$
64.239...984.168.a.a	$64$	$ 2^{184} \cdot 29^{54} \cdot 3917^{54}$	$3$	8.0.2252730971538337484304305478905626624.1	$A_8$	$A_8$	168	$1$	$0$
64.135...584.168.a.a	$64$	$ 2^{244} \cdot 113^{54} \cdot 911^{54}$	$3$	8.0.319463173328482073097337827900516204544.1	$A_8$	$A_8$	168	$1$	$0$
64.268...096.168.a.a	$64$	$ 2^{176} \cdot 11^{54} \cdot 74869^{54}$	$3$	8.0.1277992348243533546275162547509832257536.1	$A_8$	$A_8$	168	$1$	$0$
64.269...264.168.a.a	$64$	$ 2^{176} \cdot 23^{54} \cdot 35809^{54}$	$3$	8.0.5113757317969899544771546325450569302016.1	$A_8$	$A_8$	168	$1$	$0$
64.222...736.168.a.a	$64$	$ 2^{184} \cdot 11^{54} \cdot 299471^{54}$	$3$	8.0.1339937868468943908837290142533567581866950656.1	$A_8$	$A_8$	168	$1$	$0$
64.533...624.168.a.a	$64$	$ 2^{176} \cdot 11^{54} \cdot 435593^{54}$	$3$	8.0.3172352108695376607450650959096645338500694016.1	$A_8$	$A_8$	168	$1$	$0$
64.402...144.168.a.a	$64$	$ 2^{192} \cdot 7^{80} \cdot 268913^{54}$	$3$	8.0.36574214064047828349270556528863627894423814144.1	$A_8$	$A_8$	168	$1$	$0$
64.185...024.168.a.a	$64$	$ 2^{192} \cdot 701^{54} \cdot 18797^{54}$	$3$	8.0.87813088530439533539051393535468530591915378212864.1	$A_8$	$A_8$	168	$1$	$0$
64.185...616.168.a.a	$64$	$ 2^{192} \cdot 23^{54} \cdot 572903^{54}$	$3$	8.0.87815967535129608031908549089667529769029306679296.1	$A_8$	$A_8$	168	$1$	$0$
64.199...536.168.a.a	$64$	$ 2^{176} \cdot 7^{80} \cdot 1075649^{54}$	$3$	8.0.2340710530180884465731804242655471841228462751744.1	$A_8$	$A_8$	168	$1$	$0$
70.538...016.120.a.a	$70$	$ 2^{204} \cdot 29^{60} \cdot 3917^{60}$	$3$	8.0.2252730971538337484304305478905626624.1	$A_8$	$A_8$	120	$1$	$-2$
70.432...696.120.a.a	$70$	$ 2^{272} \cdot 113^{60} \cdot 911^{60}$	$3$	8.0.319463173328482073097337827900516204544.1	$A_8$	$A_8$	120	$1$	$-2$
70.343...456.120.a.a	$70$	$ 2^{188} \cdot 11^{60} \cdot 74869^{60}$	$3$	8.0.1277992348243533546275162547509832257536.1	$A_8$	$A_8$	120	$1$	$-2$
70.137...224.120.a.a	$70$	$ 2^{190} \cdot 23^{60} \cdot 35809^{60}$	$3$	8.0.5113757317969899544771546325450569302016.1	$A_8$	$A_8$	120	$1$	$-2$
70.298...816.120.a.a	$70$	$ 2^{204} \cdot 11^{60} \cdot 299471^{60}$	$3$	8.0.1339937868468943908837290142533567581866950656.1	$A_8$	$A_8$	120	$1$	$-2$
70.169...984.120.a.a	$70$	$ 2^{194} \cdot 11^{60} \cdot 435593^{60}$	$3$	8.0.3172352108695376607450650959096645338500694016.1	$A_8$	$A_8$	120	$1$	$-2$
70.300...464.120.a.a	$70$	$ 2^{216} \cdot 7^{86} \cdot 268913^{60}$	$3$	8.0.36574214064047828349270556528863627894423814144.1	$A_8$	$A_8$	120	$1$	$-2$
70.162...736.120.a.a	$70$	$ 2^{216} \cdot 701^{60} \cdot 18797^{60}$	$3$	8.0.87813088530439533539051393535468530591915378212864.1	$A_8$	$A_8$	120	$1$	$-2$
70.162...336.120.a.a	$70$	$ 2^{216} \cdot 23^{60} \cdot 572903^{60}$	$3$	8.0.87815967535129608031908549089667529769029306679296.1	$A_8$	$A_8$	120	$1$	$-2$
70.951...016.120.a.a	$70$	$ 2^{194} \cdot 7^{86} \cdot 1075649^{60}$	$3$	8.0.2340710530180884465731804242655471841228462751744.1	$A_8$	$A_8$	120	$1$	$-2$