Sums of two biquadrates and elliptic curves of rank $\geq 4$

F. A. Izadi; F. Khoshnam; K. Nabardi

arxiv: 1202.5676 · v5 · pith:R4WTPSSUnew · submitted 2012-02-25 · 🧮 math.NT

Sums of two biquadrates and elliptic curves of rank geq 4

F. A. Izadi , F. Khoshnam , K. Nabardi This is my paper

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keywords rankbiquadratesellipticthenconjecturecurvecurvesdifferent

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If an integer $n$ is written as a sum of two biquadrates in two different ways, then the elliptic curve $y^2=x^3-nx$ has rank $\geq 3$. If moreover $n$ is odd and the parity conjecture is true, then it has even rank $\geq 4$. Finally, some examples of ranks equal to 4, 5, 6, 7, 8 and 10, are also obtained.

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Sums of two biquadrates and elliptic curves of rank geq 4

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