L2 Harmonic 1-forms on submanifolds with finite total curvature

Abstract

Let x:Mm M, with m≥ 3, be an isometric immersion of a complete noncompact manifold M in a complete simply-connected manifold M with sectional curvature satisfying -c2≤ K M≤ 0, for some constant c. Assume that the immersion has finite total curvature. If c≠ 0, assume further that the first eigenvalue of the Laplacian of M is bounded from below by a suitable constant. We prove that the space of the L2 harmonic 1-forms on M has finite dimension. Moreover there exists a constant >0, explicitly computed, such that if the total curvature is bounded from above by then there is no nontrivial L2-harmonic 1-forms on M.