Let f be a weight 2 newform on Γ0-i.e. of levelqN where q does not divide N-with absolutely irreducible 2-dimensional mod p Galois representation ρf,p unramified at q if q ≠ p and finite flat at q = p. Then there exists a weight 2 newform g of level N such that In particular, if E is an elliptic curve over with conductorqN, then the modularity theorem guarantees that there exists a weight 2 newform f of level qN such that the 2-dimensional mod p Galois representation ρf, p of f is isomorphic to the 2-dimensional mod p Galois representation ρE, p of E. To apply Ribet's Theorem to ρE, p, it suffices to check the irreducibility and ramification of ρE, p. Using the theory of the Tate curve, one can prove that ρE, p is unramified at q ≠ p and finite flat at q = p if p divides the power to which q appears in the minimal discriminant ΔE. Then Ribet's theorem implies that there exists a weight 2 newform g of level N such that ρg, p ≈ ρE, p.
The result of level lowering
Note that Ribet's theorem does not guarantee that if one begins with an elliptic curve E of conductor qN, there exists an elliptic curve E' of level N such that ρE, p ≈ ρE′, p. The newform g of level N may not have rational Fourier coefficients, and hence may be associated to a higher-dimensional Abelian variety, not an elliptic curve. For example, elliptic curve 4171a1 in the Cremona database given by the equation with conductor 43×97 and discriminant 437 × 973 does not level-lower mod 7 to an elliptic curve of conductor 97. Rather, the mod p Galois representation is isomorphic to the mod p Galois representation of an irrational newform g of level 97. However, for plarge enough compared to the level N of the level-lowered newform, a rational newform must level-lower to another rational newform. In particular for p ≫ NN1+ε, the mod p Galois representation of a rational newform cannot be isomorphic to that of an irrational newform of level N. Similarly, the Frey-Mazur conjecture predicts that for p large enough, elliptic curves with isomorphic mod p Galois representations are in fact isogenous, and hence have the same conductor. Thus non-trivial level-lowering between rational newforms is not predicted to occur for large p.
History
In his thesis, came up with the idea of associating solutions of Fermat's equation with a completely different mathematical object: an elliptic curve. If p is an odd prime and a, b, and c are positive integers such that then a corresponding Frey curve is an algebraic curve given by the equation This is a nonsingularalgebraic curve of genus one defined over, and its projective completion is an elliptic curve over. In 1982 Gerhard Frey called attention to the unusual properties of the same curve as Hellegouarch, now 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 Frey suggested that the Taniyama–Shimura–Weil conjecture implies Fermat's Last Theorem. 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, Kenneth Alan Ribet proved the epsilon conjecture, thereby proving that the Taniyama–Shimura–Weil conjecture implied Fermat's Last Theorem.
Implications for Fermat's Last Theorem
Suppose that the Fermat equation with exponent p ≥ 5 had a solution in non-zero integers a, b, c. Let us form the corresponding Frey curve Eap,bp,cp. It is an elliptic curve and one can show that its minimal discriminant Δ is equal to 2−82p and its conductor N is the radical of abc, i.e. the product of all distinct primes dividing abc. By an elementary consideration of the equation ap + bp = cp, it is clear that one of a, b, c is even and hence so is N. By the Taniyama–Shimura conjecture, E is a modular elliptic curve. Since all odd primes dividing a,b,c in N appear to a pth power in the minimal discriminant Δ, by Ribet's theorem one can perform level descent modulo p repetitively to strip off all odd primes from the conductor. However, there are no newforms of level 2 as the genus of the modular curveX0 is zero.