Frey curve

Template:Short description In mathematics, a Frey curve or Frey–Hellegouarch curve is the elliptic curve $${\displaystyle y^2=x(x-\alpha )(x+\beta )}$$ associated with an ABC triple ${\displaystyle \alpha +\beta =\gamma }$. This relates properties of solutions of equations to elliptic curves. This curve was popularized in its application to Fermat’s Last Theorem where one investigates a (hypothetical) solution of Fermat's equation

${\displaystyle a^{\ell }+b^{\ell }=c^{\ell }.}$

The curve is named after Gerhard Frey and (sometimes) Template:Ill.

Template:Harvs came up with the idea of associating solutions ${\displaystyle (a,b,c)}$ of Fermat's equation with a completely different mathematical object: an elliptic curve.Template:Sfnp If ℓ is an odd prime and a, b, and c are positive integers such that $${\displaystyle a^{\ell }+b^{\ell }=c^{\ell },}$$ then a corresponding Frey curve is an algebraic curve given by the equation $${\displaystyle y^2=x(x-a^{\ell })(x+b^{\ell }),}$$ or, equivalently $${\displaystyle y^2=x(x-a^{\ell })(x-c^{\ell }).}$$ This is a nonsingular algebraic curve of genus one defined over Q, and its projective completion is an elliptic curve over Q.

Template:Harvs called attention to the unusual properties of the same curve as Hellegouarch, which became called a Frey curve. This provided a bridge between Fermat and Taniyama by showing that a counterexample to Fermat's Last Theorem would create such a curve that would not be modular. The conjecture attracted considerable interest when Template:Harvtxt suggested that the Taniyama–Shimura–Weil conjecture implies Fermat's Last Theorem.Template:Sfnmp However, his argument was not complete. In 1985, Jean-Pierre Serre proposed that a Frey curve could not be modular and provided a partial proof of this. This showed that a proof of the semistable case of the Taniyama–Shimura conjecture would imply Fermat's Last Theorem. Serre did not provide a complete proof and what was missing became known as the epsilon conjecture or ε-conjecture. In the summer of 1986, Template:Harvtxt proved the epsilon conjecture, thereby proving that the Taniyama–Shimura–Weil conjecture implies Fermat's Last Theorem.Template:Sfnp

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