At last,a uniform spherical parameterization is generated by a Moebius transformation.

In this paper we investigate the conformal Gauss map of submanifolds in sphere space and get, by Moebius invariants, the condition for this kind of map to be harmonic.

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.

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.

This paper,proves the following main theorem:Let x:M→S n+1 be a hypersurface in S n+1 without umbilic point,n3,Q and K are respectively the infimum of Ricci curvature and normalized scalar curvature with respect to the Moebius Metric,if the Moebius form Φ is parallel and Q-K(n-2n) 2,then n is even and x is Moebius equavalent to the Clifford minimal torus :S n2 (12)×S n2 (12)→S n+1 .

In this paper, we prove the reduction of codinemsion for the surfaces in Sn with vanishing Moebius form and flat Moebius normal bundle, and classify this sort of surfaces.

In this paper,We prove the following theorem:Let α:M→S~3 be an umbilic-free surface in S~3,then α:M→S~3 is minimal if and only if x is Moebius minimal surface with constant mean Curvature.