Short average distribution of a prime counting function over families of elliptic curves

Abstract

Let E be an elliptic curve defined over Q and let N be a positive integer. Now, ME(N) counts the number of primes p such that the group Ep(Fp) is of order N. In an earlier joint work with Balasubramanian, we showed that ME(N) follows Poisson distribution when an average is taken over a family of elliptic curve with parameters A and B where A,\, B N2( N)1+γ and AB>N32( N)2+γ for a fixed integer and any γ>0. In this paper, we show that for sufficiently large N, the same result holds even if we take A and B in the range (Nε220) A, B>Nε and AB>N32( N)6+γ for any ε>0.