| Abstract: | A hypersurface  of the space form  has a canonical principal direction (CPD) relative to the closed and conformal vector field Z of  if the projection  of Z to M is a principal direction of M . We show that CPD hypersurfaces with constant mean curvature are foliated by isoparametric hypersurfaces. In particular, we show that a CPD surface with constant mean curvature of space form  is invariant by the flow of a Killing vector field whose action is polar on  . As consequence we show that a compact CPD minimal surface of the sphere  is a Clifford torus. Finally, we consider the case when a CPD Euclidean hypersurface has zero Gauss–Kronecker curvature. |
