Small integral generators of totally complex number fields

Abstract

Let K be an algebraic number field and H the absolute Weil height. Write cK for a certain positive constant that is an invariant of K. We consider the question: does K contain an algebraic integer α such that both K = Q(α) and H(α) cK? If K has a real embedding then a positive answer was established in previous work. Here we obtain a positive answer if Tor(K×) = \ 1\, and so K has only complex embeddings. We also show that if the answer is negative, then K is totally complex, Tor(K×) = \ 1\, and K is a Galois extension of its maximal totally real subfield. Further, we show that if μ ∈ OK is not totally real, then there exists α in OK with K = Q(α) and H(α) H(μ) cK.