On the trace of the integers of a number field

Abstract

Let Tr denote the trace Z-module homomorphism defined on the ring OL of the integers of a number field L. We show that Tr(OL) Z if and only if there is a prime factor p of the degree of L such that if 1e1... ses is the prime factorization of the ideal pOL in OL, then p divides all powers e1,...,es. Also, we prove that the equality Tr(OL)=Z holds when L is the compositum of certain number fields.

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