Almost Prime Orders of Elliptic Curves Over Prime Power Fields

Abstract

In 1988, Koblitz conjectured the infinitude of primes p for which |E(Fp)| is prime for elliptic curves E over Q, drawing an analogy with the twin prime conjecture. He also proposed studying the primality of |E(Fpl)| / |E(Fp)|, in parallel with the primality of (pl - 1)/(p - 1). Motivated by these problems and earlier work on |E(Fp)|, we study the infinitude of primes p such that |E(Fpl)| / |E(Fp)| has a bounded number of prime factors for primes l >= 2, considering both CM and non-CM elliptic curves over Q. In the CM case, we focus on the curve y2 = x3 - x to address gaps in the literature and present a more concrete argument. The result is unconditional and applies Huxley's large sieve inequality for the associated CM field. In the non-CM case, analogous results follow under GRH via the effective Chebotarev density theorem. For the CM curve y2 = x3 - x, we further apply a vector sieve to combine the almost prime properties of |E(Fp)| and |E(Fp2)| / |E(Fp)|, establishing a lower bound for the number of primes p <= x for which |E(Fp2)| / 32 is a square-free almost prime. We also study cyclic subgroups of finite index in E(Fp) and E(Fp2) for CM curves.

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