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An immersion of a differentiable manifold into an almost Hermitian manifold is called a slant immersion if it has constant Wirtinger angle (3, 6). general slant immersion which is neither holomorphic nor totally real is called a proper slant immersion. the first part of this article, we prove that every general slant immersion of a compact manifold into the complex Euclidean m-space ᵐ is totally real. result generalizes the well-known fact that there exist no compact holomorphic submanifolds in any complex Euclidean space. the second part, we classify proper slant surfaces in ² when they are contained in a hypersphere S³, or contained in a hyperplane E³, or when their Gauss maps have rank <2.
Chen et al. (Sat,) studied this question.
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