An inequality is made for estimating the lower bound of the sectional curvature by means of calculating and estimating Laplacian of the square of the length of the second fundamental form.

An integral inequality and a pinching theorem on the square length of the second fundamental form are obtained.

Some sufficient conditions arc obtained, under which the Square length of the second fundamental form of the immerse hypcrsurfaces is a constant.

By using an inequality relation between a scalar curvature and the length of the second fundamental form,it is proved that sectional curvatures of a submanifold must be nonnegative (or positive).

If the second fundamental form S satifies S≤nH 2+JB<2*[SX(*812(n-1)SX)KF(n 3(n-1)H 2-4n(n-1) 2KF)-SX(*8n(n-2)2KF(n(n-1)KF)SX)HJB>2*] 2 ,we can classify the complete submanifold M n completely.

This note deals with the compact minimal submanifolds in a unit sphere, the Laplaciano f the square of the length of the second fundamental form is calculated and estimated.

Four basic invariants of x under the Moebius transformation group in S~(n+1) are:a Riemannian metric g called Moebius metric,a 1-formΦcalled Moebius form,a symmetric (0,2) tensor A called Blaschke tensor and a symmetric (0,2) tensor B called Moebius second fundamental form.

Moebius second fundamental form is important Moebills invariable on the unit sphere of submanifolds,In this paper,we classify the surface in S~3 with semi—parallel Moebius second fundamental form.