Abelian variety search results

Results (1-50 of 17143 matches)

 

Label	Dimension	Base field	Base char.	L-polynomial	$p$-rank	$p$-rank deficit	points on curve	points on variety	Isogeny factors
2.137.abu_bex	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )^{2}$	$2$	$0$	$92$	$13225$	1.137.ax^2
2.137.abt_bea	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 22 x + 137 x^{2} )$	$2$	$0$	$93$	$13340$	1.137.ax $\times$ 1.137.aw
2.137.abs_bdd	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 21 x + 137 x^{2} )$	$2$	$0$	$94$	$13455$	1.137.ax $\times$ 1.137.av
2.137.abs_bde	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )^{2}$	$2$	$0$	$94$	$13456$	1.137.aw^2
2.137.abr_bcf	$2$	$\F_{137}$	$137$	$1 - 43 x + 733 x^{2} - 5891 x^{3} + 18769 x^{4}$	$2$	$0$	$95$	$13569$	simple
2.137.abr_bcg	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 20 x + 137 x^{2} )$	$2$	$0$	$95$	$13570$	1.137.ax $\times$ 1.137.au
2.137.abr_bch	$2$	$\F_{137}$	$137$	$1 - 43 x + 735 x^{2} - 5891 x^{3} + 18769 x^{4}$	$2$	$0$	$95$	$13571$	simple
2.137.abr_bci	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )( 1 - 21 x + 137 x^{2} )$	$2$	$0$	$95$	$13572$	1.137.aw $\times$ 1.137.av
2.137.abq_bbi	$2$	$\F_{137}$	$137$	$1 - 42 x + 710 x^{2} - 5754 x^{3} + 18769 x^{4}$	$2$	$0$	$96$	$13684$	simple
2.137.abq_bbj	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 19 x + 137 x^{2} )$	$2$	$0$	$96$	$13685$	1.137.ax $\times$ 1.137.at
2.137.abq_bbk	$2$	$\F_{137}$	$137$	$1 - 42 x + 712 x^{2} - 5754 x^{3} + 18769 x^{4}$	$2$	$0$	$96$	$13686$	simple
2.137.abq_bbl	$2$	$\F_{137}$	$137$	$1 - 42 x + 713 x^{2} - 5754 x^{3} + 18769 x^{4}$	$2$	$0$	$96$	$13687$	simple
2.137.abq_bbm	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )( 1 - 20 x + 137 x^{2} )$	$2$	$0$	$96$	$13688$	1.137.aw $\times$ 1.137.au
2.137.abq_bbn	$2$	$\F_{137}$	$137$	$( 1 - 21 x + 137 x^{2} )^{2}$	$2$	$0$	$96$	$13689$	1.137.av^2
2.137.abp_bak	$2$	$\F_{137}$	$137$	$1 - 41 x + 686 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13798$	simple
2.137.abp_bal	$2$	$\F_{137}$	$137$	$1 - 41 x + 687 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13799$	simple
2.137.abp_bam	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 18 x + 137 x^{2} )$	$2$	$0$	$97$	$13800$	1.137.ax $\times$ 1.137.as
2.137.abp_ban	$2$	$\F_{137}$	$137$	$1 - 41 x + 689 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13801$	simple
2.137.abp_bao	$2$	$\F_{137}$	$137$	$1 - 41 x + 690 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13802$	simple
2.137.abp_bap	$2$	$\F_{137}$	$137$	$1 - 41 x + 691 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13803$	simple
2.137.abp_baq	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )( 1 - 19 x + 137 x^{2} )$	$2$	$0$	$97$	$13804$	1.137.aw $\times$ 1.137.at
2.137.abp_bar	$2$	$\F_{137}$	$137$	$1 - 41 x + 693 x^{2} - 5617 x^{3} + 18769 x^{4}$	$2$	$0$	$97$	$13805$	simple
2.137.abp_bas	$2$	$\F_{137}$	$137$	$( 1 - 21 x + 137 x^{2} )( 1 - 20 x + 137 x^{2} )$	$2$	$0$	$97$	$13806$	1.137.av $\times$ 1.137.au
2.137.abo_zn	$2$	$\F_{137}$	$137$	$1 - 40 x + 663 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13913$	simple
2.137.abo_zo	$2$	$\F_{137}$	$137$	$1 - 40 x + 664 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13914$	simple
2.137.abo_zp	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 17 x + 137 x^{2} )$	$2$	$0$	$98$	$13915$	1.137.ax $\times$ 1.137.ar
2.137.abo_zq	$2$	$\F_{137}$	$137$	$1 - 40 x + 666 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13916$	simple
2.137.abo_zr	$2$	$\F_{137}$	$137$	$1 - 40 x + 667 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13917$	simple
2.137.abo_zs	$2$	$\F_{137}$	$137$	$1 - 40 x + 668 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13918$	simple
2.137.abo_zt	$2$	$\F_{137}$	$137$	$1 - 40 x + 669 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13919$	simple
2.137.abo_zu	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )( 1 - 18 x + 137 x^{2} )$	$2$	$0$	$98$	$13920$	1.137.aw $\times$ 1.137.as
2.137.abo_zv	$2$	$\F_{137}$	$137$	$1 - 40 x + 671 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13921$	simple
2.137.abo_zw	$2$	$\F_{137}$	$137$	$1 - 40 x + 672 x^{2} - 5480 x^{3} + 18769 x^{4}$	$2$	$0$	$98$	$13922$	simple
2.137.abo_zx	$2$	$\F_{137}$	$137$	$( 1 - 21 x + 137 x^{2} )( 1 - 19 x + 137 x^{2} )$	$2$	$0$	$98$	$13923$	1.137.av $\times$ 1.137.at
2.137.abo_zy	$2$	$\F_{137}$	$137$	$( 1 - 20 x + 137 x^{2} )^{2}$	$2$	$0$	$98$	$13924$	1.137.au^2
2.137.abn_yp	$2$	$\F_{137}$	$137$	$1 - 39 x + 639 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14027$	simple
2.137.abn_yq	$2$	$\F_{137}$	$137$	$1 - 39 x + 640 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14028$	simple
2.137.abn_yr	$2$	$\F_{137}$	$137$	$1 - 39 x + 641 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14029$	simple
2.137.abn_ys	$2$	$\F_{137}$	$137$	$( 1 - 23 x + 137 x^{2} )( 1 - 16 x + 137 x^{2} )$	$2$	$0$	$99$	$14030$	1.137.ax $\times$ 1.137.aq
2.137.abn_yt	$2$	$\F_{137}$	$137$	$1 - 39 x + 643 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14031$	simple
2.137.abn_yu	$2$	$\F_{137}$	$137$	$1 - 39 x + 644 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14032$	simple
2.137.abn_yv	$2$	$\F_{137}$	$137$	$1 - 39 x + 645 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14033$	simple
2.137.abn_yw	$2$	$\F_{137}$	$137$	$1 - 39 x + 646 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14034$	simple
2.137.abn_yx	$2$	$\F_{137}$	$137$	$1 - 39 x + 647 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14035$	simple
2.137.abn_yy	$2$	$\F_{137}$	$137$	$( 1 - 22 x + 137 x^{2} )( 1 - 17 x + 137 x^{2} )$	$2$	$0$	$99$	$14036$	1.137.aw $\times$ 1.137.ar
2.137.abn_yz	$2$	$\F_{137}$	$137$	$1 - 39 x + 649 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14037$	simple
2.137.abn_za	$2$	$\F_{137}$	$137$	$1 - 39 x + 650 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14038$	simple
2.137.abn_zb	$2$	$\F_{137}$	$137$	$1 - 39 x + 651 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14039$	simple
2.137.abn_zc	$2$	$\F_{137}$	$137$	$( 1 - 21 x + 137 x^{2} )( 1 - 18 x + 137 x^{2} )$	$2$	$0$	$99$	$14040$	1.137.av $\times$ 1.137.as
2.137.abn_zd	$2$	$\F_{137}$	$137$	$1 - 39 x + 653 x^{2} - 5343 x^{3} + 18769 x^{4}$	$2$	$0$	$99$	$14041$	simple