Some remarks on the non-real roots of polynomials

Abstract

Let f ∈ R ( t) [x] be given by f(t, x) = xn + t · g(x) and β1 < … < βm the distinct real roots of the discriminant (f, x) (t) of f(t, x) with respect to x. Let γ be the number of real roots of g(x)=Σk=0s ts-k xs-k. For any > | βm |, if n-s is odd then the number of real roots of f(, x) is γ+1, and if n-s is even then the number of real roots of f(, x) is γ, γ+2 if ts>0 or ts < 0 respectively. A special case of the above result is constructing a family of totally complex polynomials which are reducible over Q.