Helicoids and Catenoids in M×R

Abstract

Given an arbitrary C∞ Riemannian manifold Mn, we consider the problem of introducing and constructing minimal hypersurfaces in M×R which have the same fundamental properties of the standard helicoids and catenoids of Euclidean space R3=R2×R. Such hypersurfaces are defined by imposing conditions on their height functions and horizontal sections, and then called vertical\, helicoids and vertical \, catenoids. We establish that vertical helicoids in M×R have the same fundamental uniqueness properties of the helicoids in R3. We provide several examples of vertical helicoids in the case where M is one of the simply connected space forms. Vertical helicoids which are entire graphs of functions on Nil3 and Sol3 are also presented. We give a local characterization of hypersurfaces of M×R which have the gradient of their height functions as a principal direction. As a consequence, we prove that vertical catenoids exist in M×R if and only if M admits families of isoparametric hypersurfaces. If so, they can be constructed through the solutions of a certain first order linear differential equation. Finally, we give a complete classification of the hypersurfaces of M×R whose angle function is constant.