Linear relations of four conjugates of an algebraic number of degree eight

Abstract

We characterize all algebraic numbers α of degree 8 for which there exist four distinct algebraic conjugates α1, α2, α3, α4 of α satisfying the linear relation α1=α2+α3+α4. Analogous characterization is obtained for the linear relation α1+α2+α3+α4=0. In particular, when an algebraic number α of degree 8 has a non-even minimal polynomial and possesses exactly six distinct linear relations of the form αi1+αi2+αi3+αi4=0, we prove that α is a sum of a quadratic and a quartic algebraic number.