抄録
For the compact submanifold M immersed in the standard Euclidean sphere Sn+p or the Euclidean space Rn+p, we obtain Simons-type inequalities about the first eigenvalue λ1 and the squared norm of the second fundamental form S respectively. In particular, for the case of the ambient space is Sn+p, we need not the assumption that M is minimal. Following which, we obtain the estimate about the lower bound for S if it is constant respectively.
