Let $f$ be an analytic function verfifying
$f(s)=\epsilon f(2-s)$
where $\epsilon=\pm 1$. The expression of Hasse-Weil L-function $f$ is
$$f(s)=N^{s/2}(2\pi)^{-s}\Gamma(s)\sum_{n=1}^{\infty}\frac{a_{n}}{n^{s}}$$
where $N$ is an integer and $\Gamma(s)$ is the gamma function.
Let $r$ be an integer. I have a set of equations of the form
$$f^{(k)}\left(1-2\prod_{j=1}^{k}s_{j}\right)=f^{(k)}\left(1-2\prod_{j=1}^{k}t_{j}\right)$$
for all $k=1,...,r$. Here $f^{(k)}$ is the $k$-th derivative of $f$.
Can I deduce that
$$(t_1,t_2,\ldots,t_{r})=(s_1,s_2,\ldots,s_{r})$$
under some conditions on the derivatives of $f$?
The injectivity is not possible for this case.
