On the Power of Integers and Conductors of Quadratic Fields

Abstract

We consider the integers α of the quadratic field Q (d ) where d∈ is square-free and d 1,2,3 4. Let p be an odd prime. Using the embedding into GL(2,Z) we obtain bounds for the first ∈ such that α 1 p. For the conductor f, we then study the first integer n=n(f) such that αn∈Of. We obtain bounds for n(f) and for n(fpk). The most interesting case is that α is the fundamental unit of Q (d ).