On biharmonic submanifolds in non-positively curved manifolds

Abstract

In the biharmonic submanifolds theory there is a generalized Chen's conjecture which states that biharmonic submanifolds in a Riemannian manifold with non-positive sectional curvature must be minimal. This conjecture turned out false by a counter example of Y. L. Ou and L. Tang in Ou-Ta. However it remains interesting to find out sufficient conditions which guarantee this conjecture to be true. In this note we prove that: 1. Any complete biharmonic submanifold (resp. hypersurface) (M, g) in a Riemannian manifold (N, h) with non-positive sectional curvature (resp. Ricci curvature) which satisfies an integral condition: for some p∈ (0, +∞), ∫M|H|pdug<+∞, where H is the mean curvature vector field of M N, must be minimal. This generalizes the recent results due to N. Nakauchi and H. Urakawa in Na-Ur1 and Na-Ur2. 2. Any complete biharmonic submanifold (resp. hypersurface) in a Reimannian manifold of at most polynomial volume growth whose sectional curvature (resp. Ricci curvature) is non-positive must be minimal. 3. Any complete biharmonic submanifold (resp. hypersurface) in a non-positively curved manifold whose sectional curvature (resp. Ricci curvature) is smaller that -ε for some ε>0 which satisfies that ∫B(x0)|H|p+2dμg(p≥0) is of at most polynomial growth of , must be minimal. We also consider -superbiharmonic submanifolds defined recently in Wh by G. Wheeler and prove similar results for -superbiharmonic submanifolds, which generalize the result in Wh.