On the p-isogenies of elliptic curves with multiplicative reduction over quadratic fields

Abstract

Let q > 5 be a prime and K a quadratic number field. In this article we extend a previous result of Najman and the author and prove that if E/K is an elliptic curve with potentially multiplicative reduction at all primes q q, then E does not have prime isogenies of degree greater than 71 and different from q. As an application to our main result, we present a variant of the asymptotic version of Fermat's Last Theorem over quadratic imaginary fields of class number one.