The probability of non-isomorphic group structures of isogenous elliptic curves in finite field extensions, I

Abstract

Let be a prime number and let E and E' be -isogenous elliptic curves defined over a finite field k of characteristic p . Suppose the groups E(k) and E'(k) are isomorphic, but E(K) E'(K), where K is an -power extension of k. In a previous work we have shown that, under mild rationality hypotheses, the case of interest is when =2 and K is the unique quadratic extension of k. In this paper we study the likelihood of such an occurrence by fixing a pair of 2-isogenous elliptic curves E, E' over Q and asking for the proportion of primes p for which E(Fp) E'(Fp) and E(Fp2) E'(Fp2).