Stable (r+1)-th capillary hypersurfaces
Abstract
In this paper, we propose a new definition of stable (r+1)-th capillary hypersurfaces from variational perspective for any 1≤ r≤ n-1. More precisely, we define stable (r+1)-th capillary hypersurfaces to be smooth local minimizers of a new energy functional under volume-preserving and contact angle-preserving variations. Using the new concept of the stable (r+1)-th capillary hypersurfaces, we generalize the stability results of Souam Souam in a Euclidean half-space and Guo-Wang-Xia GWX in a horoball in hyperbolic space for capillary hypersurface to (r+1)-th capillary hypersurface case.
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