Let $\Lambda$ be a sequence of real numbers and $B\left(\Lambda \right)$ the associated normal set, i.e. the set of all real numbers $x$ such that $x\Lambda$ is uniformely distributed modulo one. Our main problem is the following : for a given $A\subset ℝ$, does there exist a bounded sequence $\Lambda$ such that $A=B\left(\Lambda \right)$? In some particular cases, when $A\subset \mathbb{Z}$, we give an estimate of the minimal length of a bounded subinterval $I$ of $ℝ$ in which $\Lambda$ can be taken. We prove that to obtain such an estimate, we have to study the following problem on polynomials : for a given polynomial $P$ with no positive root, find the minimal degree $\delta Q$ of those polynomials $Q$ such that the product $P.Q$ has only positive coefficients.