## Results (1-50 of 11839 matches)

Label Dimension Base field L-polynomial $p$-rank Isogeny factors
2.107.abo_xq $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )^{2}$ $2$
2.107.abn_wv $2$ $\F_{107}$ $1 - 39 x + 593 x^{2} - 4173 x^{3} + 11449 x^{4}$ $2$
2.107.abn_ww $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 19 x + 107 x^{2} )$ $2$
2.107.abm_wb $2$ $\F_{107}$ $1 - 38 x + 573 x^{2} - 4066 x^{3} + 11449 x^{4}$ $2$
2.107.abm_wc $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 18 x + 107 x^{2} )$ $2$
2.107.abm_wd $2$ $\F_{107}$ $( 1 - 19 x + 107 x^{2} )^{2}$ $2$
2.107.abl_vg $2$ $\F_{107}$ $1 - 37 x + 552 x^{2} - 3959 x^{3} + 11449 x^{4}$ $2$
2.107.abl_vh $2$ $\F_{107}$ $1 - 37 x + 553 x^{2} - 3959 x^{3} + 11449 x^{4}$ $2$
2.107.abl_vi $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 17 x + 107 x^{2} )$ $2$
2.107.abl_vj $2$ $\F_{107}$ $1 - 37 x + 555 x^{2} - 3959 x^{3} + 11449 x^{4}$ $2$
2.107.abl_vk $2$ $\F_{107}$ $( 1 - 19 x + 107 x^{2} )( 1 - 18 x + 107 x^{2} )$ $2$
2.107.abk_ul $2$ $\F_{107}$ $1 - 36 x + 531 x^{2} - 3852 x^{3} + 11449 x^{4}$ $2$
2.107.abk_um $2$ $\F_{107}$ $1 - 36 x + 532 x^{2} - 3852 x^{3} + 11449 x^{4}$ $2$
2.107.abk_un $2$ $\F_{107}$ $1 - 36 x + 533 x^{2} - 3852 x^{3} + 11449 x^{4}$ $2$
2.107.abk_uo $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 16 x + 107 x^{2} )$ $2$
2.107.abk_up $2$ $\F_{107}$ $1 - 36 x + 535 x^{2} - 3852 x^{3} + 11449 x^{4}$ $1$
2.107.abk_uq $2$ $\F_{107}$ $1 - 36 x + 536 x^{2} - 3852 x^{3} + 11449 x^{4}$ $2$
2.107.abk_ur $2$ $\F_{107}$ $( 1 - 19 x + 107 x^{2} )( 1 - 17 x + 107 x^{2} )$ $2$
2.107.abk_us $2$ $\F_{107}$ $( 1 - 18 x + 107 x^{2} )^{2}$ $2$
2.107.abj_tr $2$ $\F_{107}$ $1 - 35 x + 511 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_ts $2$ $\F_{107}$ $1 - 35 x + 512 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_tt $2$ $\F_{107}$ $1 - 35 x + 513 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_tu $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 15 x + 107 x^{2} )$ $2$
2.107.abj_tv $2$ $\F_{107}$ $1 - 35 x + 515 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_tw $2$ $\F_{107}$ $1 - 35 x + 516 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_tx $2$ $\F_{107}$ $1 - 35 x + 517 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_ty $2$ $\F_{107}$ $( 1 - 19 x + 107 x^{2} )( 1 - 16 x + 107 x^{2} )$ $2$
2.107.abj_tz $2$ $\F_{107}$ $1 - 35 x + 519 x^{2} - 3745 x^{3} + 11449 x^{4}$ $2$
2.107.abj_ua $2$ $\F_{107}$ $( 1 - 18 x + 107 x^{2} )( 1 - 17 x + 107 x^{2} )$ $2$
2.107.abi_sw $2$ $\F_{107}$ $1 - 34 x + 490 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_sx $2$ $\F_{107}$ $1 - 34 x + 491 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_sy $2$ $\F_{107}$ $1 - 34 x + 492 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_sz $2$ $\F_{107}$ $1 - 34 x + 493 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_ta $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 14 x + 107 x^{2} )$ $2$
2.107.abi_tb $2$ $\F_{107}$ $1 - 34 x + 495 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_tc $2$ $\F_{107}$ $1 - 34 x + 496 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_td $2$ $\F_{107}$ $1 - 34 x + 497 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_te $2$ $\F_{107}$ $1 - 34 x + 498 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_tf $2$ $\F_{107}$ $( 1 - 19 x + 107 x^{2} )( 1 - 15 x + 107 x^{2} )$ $2$
2.107.abi_tg $2$ $\F_{107}$ $1 - 34 x + 500 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_th $2$ $\F_{107}$ $1 - 34 x + 501 x^{2} - 3638 x^{3} + 11449 x^{4}$ $2$
2.107.abi_ti $2$ $\F_{107}$ $( 1 - 18 x + 107 x^{2} )( 1 - 16 x + 107 x^{2} )$ $2$
2.107.abi_tj $2$ $\F_{107}$ $( 1 - 17 x + 107 x^{2} )^{2}$ $2$
2.107.abh_sb $2$ $\F_{107}$ $1 - 33 x + 469 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$
2.107.abh_sc $2$ $\F_{107}$ $1 - 33 x + 470 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$
2.107.abh_sd $2$ $\F_{107}$ $1 - 33 x + 471 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$
2.107.abh_se $2$ $\F_{107}$ $1 - 33 x + 472 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$
2.107.abh_sf $2$ $\F_{107}$ $1 - 33 x + 473 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$
2.107.abh_sg $2$ $\F_{107}$ $( 1 - 20 x + 107 x^{2} )( 1 - 13 x + 107 x^{2} )$ $2$
2.107.abh_sh $2$ $\F_{107}$ $1 - 33 x + 475 x^{2} - 3531 x^{3} + 11449 x^{4}$ $2$