Rigidity of critical points of hydrophobic capillary functionals

Abstract

We prove the rigidity, among sets of finite perimeter, of volume-preserving critical points of the capillary energy in the half space, in the case where the prescribed interior contact angle is between 90 and 120. No structural or regularity assumption is required on the finite perimeter sets. Assuming that the ``tangential'' part of the capillary boundary is Hn-null, this rigidity theorem extends to the full hydrophobic regime of interior contact angles between 90 and 180. Furthermore, we establish the anisotropic counterpart of this theorem under the assumption of lower density bounds.