We embed compact $C^infty$ manifolds into $mathbb C^n$ as totally realmanifolds with prescribed polynomial hulls. As a consequence we show that anycompact $C^infty$ manifold of dimension $d$ admits a totally real embeddinginto $mathbb C^{lfloor rac{3d}{2}floor}$ with non-trivial polynomial hullwithout complex structure.
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机译:我们将Compact $ C ^ idty $歧管嵌入$ MATHBB C ^ N $中,作为具有规定的多项式船体的完全真实宗地。因此,我们展示了剩余的$ C ^ infty $ d $ d $ d $ cancits ancape incomed $ d $ cancits and inceal embeddinginto $ mathbb c ^ { lfloor fracoor {3d} {2} rfloor} $与非琐碎的多项式hullwithout复杂结构。
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