I have the following optimization problem: $$\text{find } x= \min_{a} \max_{\lambda\in\Lambda} |R(h\lambda)|$$ where $\Lambda$ is some finite, fixed set of complex numbers and $R(z)$ is a polynomial of the form $$R(z) = 1 + z + \sum_{j=2}^{s}a_j z^j$$ where $h>0$ is fixed and the real coefficients $a_j$ are the decision variables. Can it be shown that $x$ is a differentiable function of $h$? Are there general tools that might be useful for proving this type of property?