The maximal principle for properly immersed submanifolds and its applications

Abstract

In this note we consider the Liouville type theorem for a properly immersed submanifold M in a complete Riemmanian manifold N. Assume that the sectional curvature KN of N satisfies KN≥-L(1+distN(·,q0)2)α2 for some L>0, 2>α≥ 0 and q0∈ N. (i) If |H|2p-2≥ k|H|2p(p>1) for some constant k>0, then we prove that M is minimal. (ii) Let u be a smooth nonnegative function on M satisfying u≥ kua for some constant k>0 and a>1. If |H|≤ C(1+distN(·,q0)2)β2 for some C>0, 0≤β<1, then u=0 on M. As applications we get some nonexistence result for p-biharmonic submanifolds.