Title of article :
INTEGER MULTIPLIERS OF REAL POLYNOMIALS WITHOUT NONNEGATIVE ROOTS
Author/Authors :
Brunotte, Horst Haus-Endt-Straße 88 D-40593 D¨usseldorf, Germany
Abstract :
For a given real polynomial f without nonnegative roots we study
monic integer polynomials g such that the product gf has positive (nonnegative, respectively) coefficients. We show that monic integer polynomials g
with these properties can effectively be computed, and we give lower and upper bounds for their degrees.
Keywords :
Real polynomial , integer polynomial , factorization
Journal title :
International Electronic Journal of Algebra
