Submanifolds of warped product manifolds I×f Sm-1(k) from a p-harmonic viewpoint

Abstract

We study p-harmonic maps, p-harmonic morphisms, biharmonic maps, and quasiregular mappings into submanifolds of warped product Riemannian manifolds I×f Sm-1(k)\, of an open interval and a complete simply-connecteded (m-1)-dimensional Riemannian manifold of constant sectional curvature k. We establish an existence theorem for p-harmonic maps and give a classification of complete stable minimal surfaces in certain three dimensional warped product Riemannian manifolds R×f S2(k)\, , building on our previous work. When f \, Const. and k=0, we recapture a generalized Bernstein Theorem and hence the Classical Bernstein Theorem in R3. We then extend the classification to parabolic stable minimal hypersurfaces in higher dimensions.