New series of odd non-congruent numbers

机译：新系列奇数非全等号码

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We determine all square-free odd positive integers n such that the 2-Selmer groups S_n and S_n of the elliptic curve En: y~2 = x(x - n)(x - 2n) and its dual curve E_n :y~2 = x~3 + 6nx~2 + n~2x have the smallest size: S_n = {1}, S-circumflex n = {1,2,n, 2n}. It is well known that for such integer n, the rank of group E_n(Q) of the rational points on En is zero so that n is a non-congruent number. In this way we obtain many new series of elliptic curves En with rank zero and such series of integers n are non-congruent numbers.

机译：我们确定所有方形无奇数正整数n，使得椭圆曲线的2-selmer组s_n和s_n zh：y〜2 = x（x - n）（x - 2n）及其双曲线e_n：y〜2 = x〜3 + 6nx〜2 + n〜2x具有最小的尺寸：s_n = {1}，s轴括号n = {1,2，n，2n}。众所周知，对于这种整数N，Zh上Rational点的级别e_n（q）的级别为零，使得n是非全等数量。通过这种方式，我们获得许多新的椭圆曲线EN，等级为零，此类整数n是非全批号。

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《International Conference on the Theory of Functions of Several Complex Variables》|2006年||共13页
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作者
FENG Keqin; XUE Yan; Chinese Academy of Sciences; National Natural Science Foundation of China;
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中图分类数学;
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congruent number; elliptic curves; rank; 2-descent; odd graph;

机译：一致的号码;椭圆曲线;等级;2-血统;奇数图;

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New series of odd non-congruent numbers

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