On the order modulo p of an algebraic number (for p large enough)

Abstract

Let K/Q be Galois, and let eta in K* whose conjugates are multiplicatively independent. For a prime p, unramified, prime to eta, let np be the residue degree of p and gp the number of P I p, then let o\P(eta) and o\p(eta) be the orders of eta modulo P and p, respectively.Using Frobenius automorphisms, we show that for all p0, some explicit divisors of p(np)-1 cannot realize o\P(eta) nor o\p(eta), and we give a lower bound of o\p(eta).Then we obtain that, for all p0 such that np 1, Prob(o\p(eta)p) 1/p(gp.(np-1)-epsilon)), where epsilon = O(1/(log\2(p))); under the Borel--Cantelli heuristic, this leads to o\p(eta)p for all p0 such that gp.(np-1) 2, which covers the "limit" cases of cubic fields with np=3 and quartic fields with np=gp=2, but not the case of quadratic fields with np=2. In the quadratic case, the natural conjecture is, on the contrary, that o\p(eta) p for infinitely many inert p. Some computations are given with PARI programs.