Nagell–Lutz theorem mathematics , the Nagell–Lutz theorem is a result in the diophantine geometry of elliptic curves , which describes rational torsion points on elliptic curves over the integers.Trygve Nagell and Élisabeth Lutz .Definition of the terms Suppose that the equation non-singular cubic curve with integer coefficients a , b , c , and let D be the discriminant of the cubic polynomial on the right side:Statement of the theorem If P = is a rational point of finite order on C , for the elliptic curve group law , then:1) x and y are integers 2) either y = 0, in which case P has order two, or else y divides D , which immediately implies that y 2 divides D .Generalizations arbitrary number fields and morecubic equations . generalization says that, for a nonsingular cubic curve Weierstrass form P = of finitex =m /4, y =n /8, for m and n integers.History The result is named for its two independent discoverers, the Norwegian Trygve Nagell who published it in 1935, and Élisabeth Lutz.
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