Learn more

Refine search


Results (1-50 of 21027 matches)

Next   displayed columns for results
Label Dimension Base field L-polynomial $p$-rank Isogeny factors
2.157.aby_bkd $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )^{2}$ $2$
2.157.abx_bje $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 24 x + 157 x^{2} )$ $2$
2.157.abw_bif $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 23 x + 157 x^{2} )$ $2$
2.157.abw_big $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )^{2}$ $2$
2.157.abv_bhg $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 22 x + 157 x^{2} )$ $2$
2.157.abv_bhh $2$ $\F_{157}$ $1 - 47 x + 865 x^{2} - 7379 x^{3} + 24649 x^{4}$ $2$
2.157.abv_bhi $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 23 x + 157 x^{2} )$ $2$
2.157.abu_bgh $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 21 x + 157 x^{2} )$ $2$
2.157.abu_bgi $2$ $\F_{157}$ $1 - 46 x + 840 x^{2} - 7222 x^{3} + 24649 x^{4}$ $2$
2.157.abu_bgj $2$ $\F_{157}$ $1 - 46 x + 841 x^{2} - 7222 x^{3} + 24649 x^{4}$ $2$
2.157.abu_bgk $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 22 x + 157 x^{2} )$ $2$
2.157.abu_bgl $2$ $\F_{157}$ $( 1 - 23 x + 157 x^{2} )^{2}$ $2$
2.157.abt_bfi $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 20 x + 157 x^{2} )$ $2$
2.157.abt_bfj $2$ $\F_{157}$ $1 - 45 x + 815 x^{2} - 7065 x^{3} + 24649 x^{4}$ $2$
2.157.abt_bfk $2$ $\F_{157}$ $1 - 45 x + 816 x^{2} - 7065 x^{3} + 24649 x^{4}$ $2$
2.157.abt_bfl $2$ $\F_{157}$ $1 - 45 x + 817 x^{2} - 7065 x^{3} + 24649 x^{4}$ $2$
2.157.abt_bfm $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 21 x + 157 x^{2} )$ $2$
2.157.abt_bfn $2$ $\F_{157}$ $1 - 45 x + 819 x^{2} - 7065 x^{3} + 24649 x^{4}$ $2$
2.157.abt_bfo $2$ $\F_{157}$ $( 1 - 23 x + 157 x^{2} )( 1 - 22 x + 157 x^{2} )$ $2$
2.157.abs_bej $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 19 x + 157 x^{2} )$ $2$
2.157.abs_bek $2$ $\F_{157}$ $1 - 44 x + 790 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_bel $2$ $\F_{157}$ $1 - 44 x + 791 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_bem $2$ $\F_{157}$ $1 - 44 x + 792 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_ben $2$ $\F_{157}$ $1 - 44 x + 793 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_beo $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 20 x + 157 x^{2} )$ $2$
2.157.abs_bep $2$ $\F_{157}$ $1 - 44 x + 795 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_beq $2$ $\F_{157}$ $1 - 44 x + 796 x^{2} - 6908 x^{3} + 24649 x^{4}$ $2$
2.157.abs_ber $2$ $\F_{157}$ $( 1 - 23 x + 157 x^{2} )( 1 - 21 x + 157 x^{2} )$ $2$
2.157.abs_bes $2$ $\F_{157}$ $( 1 - 22 x + 157 x^{2} )^{2}$ $2$
2.157.abr_bdk $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 18 x + 157 x^{2} )$ $2$
2.157.abr_bdl $2$ $\F_{157}$ $1 - 43 x + 765 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdm $2$ $\F_{157}$ $1 - 43 x + 766 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdn $2$ $\F_{157}$ $1 - 43 x + 767 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdo $2$ $\F_{157}$ $1 - 43 x + 768 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdp $2$ $\F_{157}$ $1 - 43 x + 769 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdq $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 19 x + 157 x^{2} )$ $2$
2.157.abr_bdr $2$ $\F_{157}$ $1 - 43 x + 771 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bds $2$ $\F_{157}$ $1 - 43 x + 772 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdt $2$ $\F_{157}$ $1 - 43 x + 773 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdu $2$ $\F_{157}$ $( 1 - 23 x + 157 x^{2} )( 1 - 20 x + 157 x^{2} )$ $2$
2.157.abr_bdv $2$ $\F_{157}$ $1 - 43 x + 775 x^{2} - 6751 x^{3} + 24649 x^{4}$ $2$
2.157.abr_bdw $2$ $\F_{157}$ $( 1 - 22 x + 157 x^{2} )( 1 - 21 x + 157 x^{2} )$ $2$
2.157.abq_bcl $2$ $\F_{157}$ $( 1 - 25 x + 157 x^{2} )( 1 - 17 x + 157 x^{2} )$ $2$
2.157.abq_bcm $2$ $\F_{157}$ $1 - 42 x + 740 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bcn $2$ $\F_{157}$ $1 - 42 x + 741 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bco $2$ $\F_{157}$ $1 - 42 x + 742 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bcp $2$ $\F_{157}$ $1 - 42 x + 743 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bcq $2$ $\F_{157}$ $1 - 42 x + 744 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bcr $2$ $\F_{157}$ $1 - 42 x + 745 x^{2} - 6594 x^{3} + 24649 x^{4}$ $2$
2.157.abq_bcs $2$ $\F_{157}$ $( 1 - 24 x + 157 x^{2} )( 1 - 18 x + 157 x^{2} )$ $2$
Next   displayed columns for results