抄録
Let Mn be a closed oriented submanifold with nonzero parallel mean curvature vector field immersed into a unit sphere Sn+p. Denote by S the square of the length of the second fundamental form. We consider a pinching problem on S. We give a pinching constant C on S which depends only on n and p. It is better than one given by Xu [12]. When p=1, 2 or n≥8, we show that it is the best possible among this kind of pinching constants. We also characterize those Mn with S=C.
