On a question of B. Mazur

Global methods for the symplectic type of congruences between elliptic curves, On the Fermat-type equation \(x^3+y^3=z^p\), Odd values of the Ramanujan tau function, An application of the symplectic argument to some Fermat-type equations, Sur la courbe modulaireX_E(7), Families of elliptic curves with the same mod 8 representations, On the symplectic type of isomorphisms of the 𝑝-torsion of elliptic curves, On the equation x2 + dy6 = zp for square-free 1 ≤ d ≤ 20, Perfect powers in elliptic divisibility sequences, Differences between perfect powers: prime power gaps, Shifted powers in binary recurrence sequences, AN APPLICATION OF THE MODULAR METHOD AND THE SYMPLECTIC ARGUMENT TO A LEBESGUE–NAGELL EQUATION, Perfect powers generated by the twisted Fermat cubic, On values of Ramanujan's tau function involving two prime factors, Visualizing elements of order in the Tate–Shafarevich group of an elliptic curve, A multi-Frey approach to Fermat equations of signature $(r,r,p)$, INTEGERS REPRESENTED BY REVISITED, Cubic forms, powers of primes and classification of elliptic curves, Solving Fermat-type equations $x^5+y^5=dz^p$, Équations de Fermat de type (5, 5,p), Sums of two cubes as twisted perfect powers, revisited, CRITÈRES D'IRRÉDUCTIBILITÉ POUR LES REPRÉSENTATIONS DES COURBES ELLIPTIQUES, The generalized Fermat equation with exponents 2, 3,, On the modular curves $Y_E(7)$, About the 7-torsion modules of points of a family of elliptic curves, On families of 7- and 11-congruent elliptic curves, Almost powers in the Lucas sequence, Shifted powers in Lucas-Lehmer sequences, On a class of generalized Fermat equations of signature \((2,2n,3)\), Selmer companion curves, Sur l'équation a³+ b³= c^p

• On the modular representations of degree two of \(\text{Gal}({\overline {\mathbb Q}}/{\mathbb Q})\)
• Modular functions of one variable. IV. Proceedings of the international summer school, University of Antwerp, RUCA, July 17 -- August 3, 1972
• Rational isogenies of prime degree. (With an appendix by D. Goldfeld)
• Galois properties of points of finite order of elliptic curves
• Formes modulaires de poids $1$
• Les Schémas de Modules de Courbes Elliptiques
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