Some properties of the distribution of the numbers of points on elliptic curves over a finite prime field

Abstract

Let p ≥ 5 be a prime and for a, b ∈ Fp, let Ea,b denote the elliptic curve over Fp with equation y2=x3+a\,x + b. As usual define the trace of Frobenius ap,\,a,\,b by equation* \#Ea,b(Fp) = p+1 -ap,\,a,\,b. equation* We use elementary facts about exponential sums and known results about binary quadratic forms over finite fields to evaluate the sums Σt∈Fp ap,\, t,\, b, Σ t ∈ Fp ap,\,a,\, t, Σt=0p-1ap,\,t,\,b2, Σt=0p-1ap,\,a,\,t2 and Σt=0p-1ap,\,t,\,b3 for primes p in various congruence classes. As an example of our results, we prove the following: Let p 5 (mod 6) be prime and let b ∈ Fp*. Then equation* Σt=0p-1ap,\,t,\,b3= -p((p-2)(-2p) +2p)(bp). equation*