Absence of bubbling phenomena for non convex anisotropic nearly umbilical and quasi Einstein hypersurfaces

Abstract

We prove that, for every closed (not necessarily convex) hypersurface in Rn+1 and every p>n, the Lp-norm of the trace-free part of the anisotropic second fundamental form controls from above the W2,p-closeness of to the Wulff shape. In the isotropic setting, we provide a simpler proof. This result is sharp since in the subcritical regime p≤ n, the lack of convexity assumptions may lead in general to bubbling phenomena. Moreover, we obtain a stability theorem for quasi Einstein (not necessarily convex) hypersurfaces and we improve the quantitative estimates in the convex setting.