A Necessary and Sufficient Condition for Local Maxima of Polynomial Modulus Over Unit Disc (1605.00621v1)

Abstract: An important quantity associated with a complex polynomial $p(z)$ is $\Vert p \Vert_\infty$, the maximum of its modulus over the unit disc $D$. We prove, $z_* \in D$ is a local maximum of $|p(z)|$ if and only if $a_$ satisfies, $z_=p(z_)|p'(z_)|/p'(z_)|p(z_)|$, i.e. it is proportional to its corresponding Newton direction. This explicit formula gives rise to novel iterative algorithms for computing $\Vert p \Vert_\infty$. We describe two such algorithms, including a Newton-like method and present some visualization of their performance.