Contraction properties for holomorphic functions via isoperimetric stability on the Bergman ball

Abstract

We prove a local contraction property for holomorphic functions that are nearly constant, relating weighted Bergman spaces Apα(n) and Aqβ(n). Our approach converts geometric information on weighted superlevel sets into analytic deficit inequalities and rests crucially on a quantitative stability result (of Fuglede type) for the isoperimetric inequality in the Bergman ball. As an application, along the contractive line q/p=β/α, we obtain a deficit contraction near the extremizer f 1: if f=1+φ with φ small and its weighted level sets are nearly spherical (after recentering), then the Aqβ-deficit is controlled by the Apα-deficit, and the same deficit quantitatively controls the deviation of the level sets from spheres.

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