Equidistribution of α pθ with a Chebotarev condition and applications to extremal primes

Abstract

We establish a joint distribution result concerning the fractional part of α pθ for θ ∈ (0,1), \ α>0, where p is a prime satisfying a Chebotarev condition in a fixed finite Galois extension over Q. As an application, for a fixed non-CM elliptic curve E/Q, an asymptotic formula is given for the number of primes at the extremes of the Sato-Tate measure modulo a large prime . These are precisely the primes p for which the Frobenius trace ap(E) satisfies the congruence ap(E) [2p] . We assume a zero-free region hypothesis for Dedekind zeta functions of number fields.