Sendov's Conjecture: A note on a paper of D\'egot

Abstract

Sendov's conjecture states that if all the zeroes of a complex polynomial P(z) of degree at least two lie in the unit disk, then within a unit distance of each zero lies a critical point of P(z). In a paper that appeared in 2014, D\'egot proved that, for each a∈ (0,1), there exists an integer N such that for any polynomial P(z) with degree greater than N, if P(a) = 0 and all zeroes lie inside the unit disk, the disk |z-a|≤ 1 contains a critical point of P(z). Based on this result, we derive an explicit formula N(a) for each a ∈ (0,1) and, consequently obtain a uniform bound N for all a∈ [α , β] where 0<α < β < 1. This (partially) addresses the questions posed in D\'egot's paper.