An application of the symplectic argument to some Fermat-type Equations
Abstract
Let p be a prime number. In the early 2000s, it was proved that the Fermat equations with coefficients \[3xp + 8yp + 21zp =0 and 3xp + 4yp + 5zp=0 \] do not admit non-trivial solutions for a set of exponents p with Dirichlet density 1/4 and 1/8, respectively. In this note, using a recent criterion to decide if two elliptic curves over Q with certain types of additive reduction at 2 have symplectically isomorphic p-torsion modules, we improve these densities to 3/8.
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