Linear relations of four conjugates of an algebraic number

Abstract

We characterize all algebraic numbers α of degree d∈\4,5,6,7\ for which there exist four distinct algebraic conjugates α1, α2, α3, α4 of α satisfying the relation α1+α2=α3+α4. In particular, we prove that an algebraic number α of degree 6 satisfies this relation with α1+α2 if and only if α is the sum of a quadratic and a cubic algebraic number. Moreover, we describe all possible Galois groups of the normal closure of Q(α) for such algebraic numbers α. We also consider similar relations α1+α2+α3+α4=0 and α1+α2+α3=α4 for algebraic numbers of degree up to 7.