A lower bound for L2 length of second fundamental form on minimal hypersurfaces

Abstract

We prove a weak version of the Perdomo Conjecture, namely, there is a positive constant δ(n)>0 depending only on n such that on any closed embedded, non-totally geodesic, minimal hypersurface Mn in Sn+1, ∫MS ≥ δ(n) Vol(Mn), where S is the squared length of the second fundamental form of Mn. The Perdomo Conjecture asserts that δ(n)=n which is still open in general. As byproducts, we also obtain some integral inequalities and Simons-type pinching results on closed embedded (or immersed) minimal hypersurfaces, with the first positive eigenvalue λ1(M) of the Laplacian involved.