Finding closed form expression for the roots of $f(x) = \sum_{i=1}^K \frac{\alpha_i \gamma_i \sin(x-\theta_i)}{1+\gamma_i[1+\cos(x-\theta_i) ]}$

Question

Let us define function $f:[0~ 2\pi] \rightarrow R$ as follows:

\begin{align} f(x)\triangleq \sum_{i=1}^K \frac{\alpha_i \gamma_i \sin(x-\theta_i)}{1+\gamma_i[1+\cos(x-\theta_i) ]}, \end{align} where anything except $x$ is a given parameter and we have $\alpha_i >0, \forall i$ and $\gamma_i >0, \forall i$. I am trying to find the closed form solutions of $f(x)=0$ in interval $[0~2\pi]$. Does anybody know how to do that? If it is not possible to find a closed form solution, can we say something about the number of solutions? Is there finite number of solutions?

Any help would be appreciated.

Answer 1

Even for the case $K=2$, closed form solutions seem hopeless. Counting the number of solutions should be possible, though. Expand the sines and cosines and put everything over a common denominator: the numerator will be a trigonometric polynomial $P(\sin(x), \cos(x))$. Let $R(s)$ be the resultant of $P(s,c)$ and $s^2 + c^2-1$ with respect to $c$. This is a polynomial in $s$ whose roots are the values of $s$ where $P(s,c)$ and $s^2+c^2-1$ have a common solution. Use Sturm's theorem to count the number of such $s$ in $[-1,1]$. This may not be quite the number of solutions, because a given value of $\sin(x)$ may correspond to either one or two solutions with $\cos(x) = \pm \sqrt{1-\sin^2(x)}$, but that shouldn't be too hard to handle.