Abstract
AbstractAccording to the Gauss–Lucas theorem, the critical points of a complex polynomial$$p(z):=\sum_{j=0}^{n}a_{j}z^{j}$$where$$a_{j}\in\mathbb{C}$$always lie in the convex hull of its zeros. In this paper, we prove certain relations between the distribution of zeros of a polynomial and its critical points. Using these relations, we prove the well-known Sendov’s conjecture for certain special cases.
Subject
Applied Mathematics,Control and Optimization,Analysis