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Sendov's conjecture for sufficiently high degree polynomials

Sendov&#39;s conjecture asserts that if a complex polynomial $f$ of degree $n \geq 2$ has all of its zeroes in closed unit disk $\{ z: |z| \leq 1 \}$, then for each such zero $λ_0$ there is a zero of the derivative $f&#39;$ in the closed unit disk $\{ z: |z-λ_0| \leq 1 \}$. This conjecture is known for $n < 9$, but only partial results are available for higher $n$. We show that there exists a constant $n_0$ such that Sendov&#39;s conjecture holds for $n \geq n_0$. For $λ_0$ away from the origin and the unit circle we can appeal to the prior work of Dégot and Chalebgwa; for $λ_0$ near the unit circle we refine a previous argument of Miller (and also invoke results of Chijiwa when $λ_0$ is extremely close to the unit circle); and for $λ_0$ near the origin we introduce a new argument using compactness methods, balayage, and the argument principle.