Willmore submanifolds in a sphere
Abstract
Let x:M Sn+p be an n-dimensional submanifold in an (n+p)-dimensional unit sphere Sn+p, x:M Sn+p is called a Willmore submanifold to the following Willmore functional: ∫M(S-nH2)n2dv, where S=Σα,i,j(hαij)2 is the square of the length of the second fundamental form, H is the mean curvature of M. In [13], author proved an integral inequality of Simon's type for n-dimensional compact Willmore hypersurfaces in Sn+1 and gave a characterization of Willmore tori. In this paper, we generalize this result to n-dimensional compact Willmore submanifolds in Sn+p. In fact, we obtain an integral inequality of Simon's type for compact Willmore submanifolds in Sn+p and give a characterization of willmore tori and Veronese surface by use of integral inequality.
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