In number theory, Szpiro's conjecture relates to the conductor and the discriminant of an elliptic curve. In a slightly modified form, it is equivalent to the well-known abc conjecture. It is named for Lucien Szpiro, who formulated it in the 1980s. Szpiro's conjecture and its equivalent forms have been described as "the most important unsolved problem in Diophantine analysis" by Dorian Goldfeld, in part to its large number of consequences in number theory including Roth's theorem, the Mordell conjecture, the Fermat–Catalan conjecture, and Brocard's problem.
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| - Congettura di Szpiro (it)
- Conjecture de Szpiro (fr)
- スピロ予想 (ja)
- Szpiro's conjecture (en)
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| - En théorie des nombres, la conjecture de Szpiro met en relation le (en) et le discriminant d'une courbe elliptique. Sous une forme légèrement modifiée, elle est équivalente à la conjecture abc bien connue. Elle porte le nom de Lucien Szpiro qui l'a formulée dans les années 1980. (fr)
- In number theory, Szpiro's conjecture relates to the conductor and the discriminant of an elliptic curve. In a slightly modified form, it is equivalent to the well-known abc conjecture. It is named for Lucien Szpiro, who formulated it in the 1980s. Szpiro's conjecture and its equivalent forms have been described as "the most important unsolved problem in Diophantine analysis" by Dorian Goldfeld, in part to its large number of consequences in number theory including Roth's theorem, the Mordell conjecture, the Fermat–Catalan conjecture, and Brocard's problem. (en)
- 数論において、スピロ予想 (Szpiro's conjecture) は、楕円曲線の導手と判別式との間の関係について述べた予想であり、ABC予想と深い関係にある。この予想の名前は、1980年代にこれを定式化した (英語版)に由来する。 (ja)
- Nella teoria dei numeri, la congettura di Szpiro riguarda la relazione esistente tra il conduttore e il discriminante di una curva ellittica. In una forma generale, è equivalente alla ben nota congettura abc. Prende il nome da che la formulò negli anni ottanta. La congettura afferma che, dato ε> 0, esiste una costante C(ε) tale che per ogni curva ellittica E definita su Q con discriminante minima Δ e conduttore f, abbiamo: (it)
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| - Modified Szpiro conjecture (en)
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| - En théorie des nombres, la conjecture de Szpiro met en relation le (en) et le discriminant d'une courbe elliptique. Sous une forme légèrement modifiée, elle est équivalente à la conjecture abc bien connue. Elle porte le nom de Lucien Szpiro qui l'a formulée dans les années 1980. (fr)
- In number theory, Szpiro's conjecture relates to the conductor and the discriminant of an elliptic curve. In a slightly modified form, it is equivalent to the well-known abc conjecture. It is named for Lucien Szpiro, who formulated it in the 1980s. Szpiro's conjecture and its equivalent forms have been described as "the most important unsolved problem in Diophantine analysis" by Dorian Goldfeld, in part to its large number of consequences in number theory including Roth's theorem, the Mordell conjecture, the Fermat–Catalan conjecture, and Brocard's problem. (en)
- Nella teoria dei numeri, la congettura di Szpiro riguarda la relazione esistente tra il conduttore e il discriminante di una curva ellittica. In una forma generale, è equivalente alla ben nota congettura abc. Prende il nome da che la formulò negli anni ottanta. La congettura afferma che, dato ε> 0, esiste una costante C(ε) tale che per ogni curva ellittica E definita su Q con discriminante minima Δ e conduttore f, abbiamo: La congettura di Szpiro modificata afferma che, dato ε> 0, esiste una costante C(ε) tale che per ogni curva ellittica E definita su Q con invarianti c4, c6 e conduttore f, abbiamo: (it)
- 数論において、スピロ予想 (Szpiro's conjecture) は、楕円曲線の導手と判別式との間の関係について述べた予想であり、ABC予想と深い関係にある。この予想の名前は、1980年代にこれを定式化した (英語版)に由来する。 (ja)
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