A sharp quantitative version of Alexandrov's theorem via the method of moving planes

Abstract

We prove the following quantitative version of the celebrated Soap Bubble Theorem of Alexandrov. Let S be a C2 closed embedded hypersurface of Rn+1, n≥1, and denote by osc(H) the oscillation of its mean curvature. We prove that there exists a positive , depending on n and upper bounds on the area and the C2-regularity of S, such that if osc(H) ≤ then there exist two concentric balls Bri and Bre such that S ⊂ Bre Bri and re -ri ≤ C \, osc(H), with C depending only on n and upper bounds on the surface area of S and the C2 regularity of S. Our approach is based on a quantitative study of the method of moving planes and the quantitative estimate on re-ri we obtain is optimal. As a consequence of this theorem, we also prove that if osc(H) is small then S is diffeomorphic to a sphere and give a quantitative bound which implies that S is C1-close to a sphere.