Bernstein type properties of two-sided hypersurfaces immersed in a Killing warped product (Q2809362)

Bernstein-type properties for two-sided CMC hypersurfaces of a Killing warped product \(M\times _{\rho }\mathbb{R}\) are obtained by applying suitable maximum principles under the concavity of the warping function \(\rho \) and certain curvature constraints on \(M\). For example, in the weaker case in which the given hypersurface is stochastically complete, the weak Omori-Yau maximum principle is used. A more general setting is provided by the \(L^1\)-Liouville property for \(M\).