Let $p(x)$ be a monic polynomial over the integers. I want to count the number of roots which have the form $\zeta \cdot r$ where $\zeta$ is a root of unity and $r$ is a real number.
To count the number of real roots, one can use sturm sequence, so my idea is to take the polynomials $p_k(x)=\prod (x-a_i^k)$ where the $a_i$ are the roots of $p(x)$ and then count the real roots. The polynomials $p_k(x)$ can be computed using only the coefficients of $p(x)$. The problem is to bound $k$.
If $\zeta_k$ is a primitive $k$-th root of unity, $r$ is real and $\zeta_k r$ is a root of $p(x)$, then so is $\overline{\zeta_k r}=\zeta_k ^{-1}r$ so they both have algebraic degree at most $deg(p)$. It follows that $[\mathbb{Q}(\zeta_k r,\zeta_k^{-1}r):\mathbb{Q}]$ is at most $deg(p)^2$. The field $\mathbb{Q}(\zeta_k r,\zeta_k^{-1}r)$ contains $\zeta_k^2$, so we can add $\zeta_k$ with a degree 2 extension. We conclude that $[\mathbb{Q}[\zeta_k]:\mathbb{Q}]=\varphi(k)\leq 2deg(p)^2$, which gives an upper bound on $k$ (since $\varphi$ goes to infinity).
My questions are
- Is there an easier way to count this type of roots?
- If not, is there a better upper bound for the order of the root of unity $\zeta_k$ than the $2deg(p)^2$? Or maybe with some extra conditions on the polynomial this bound can be improved?
- Are the formulas for the coefficients of $p_k(x)$ as functions of the coefficients of $p(x)$ known? I know they exist by the fundamental theorem of symmetric polynomials, but I would be happy to see a closed formula. At least one way to compute these polynomials is to take the companion matrix of $p(x)$, take its power, and then compute the characteristic polynomial.
