Hypersurfaces with capillary boundary evolving by volume preserving power mean curvature flow.

In this paper, we introduce a volume- or area-preserving curvature flow for hypersurfaces with capillary boundary in the half-space, with speed given by a positive power of the mean curvature with a non-local averaging term. We demonstrate that for any convex initial hypersurface with a capillary boundary, the flow exists for all time and smoothly converges to a spherical cap as t → + ∞ . [ABSTRACT FROM AUTHOR]