A sharp estimate of area for sublevel-set of Blaschke products

Abstract

Let D be the unit disk in the complex plane. Among other results, we prove the following curious result for a finite Blaschke product: B(z)=e isΠk=1d z-ak1-z ak. The Lebesgue measure of the sublevel set of B satisfies the following sharp inequality for t ∈ [0,1]: |\z∈ D:|B(z)|<t\| π t2/d, with equality at a single point t∈(0,1) if and only if ak=0 for every k. In that case the equality is attained for every t.

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