A complete family of Alexandrov-Fenchel inequalities for convex capillary hypersurfaces in the half-space

Abstract

In this paper, we study the locally constrained inverse curvature flow for hypersurfaces in the half-space with θ-capillary boundary, which was recently introduced by Wang-Weng-Xia. Assume that the initial hypersurface is strictly convex with the contact angle θ∈ (0,π/2]. We prove that the solution of the flow remains to be strictly convex for t>0, exists for all positive time and converges smoothly to a spherical cap. As an application, we prove a complete family of Alexandrov-Fenchel inequalities for convex capillary hypersurfaces in the half-space with the contact angle θ∈(0,π/2]. Along the proof, we develop a new tensor maximum principle for parabolic equations on compact manifold with proper Neumann boundary condition.