细胞复合物和欧几里得空间的嵌入:莫比乌斯带、环面和投影面

Anthony Fraga
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摘要

在代数拓扑学中,我们通常用单元复数来表示曲面。这种表示法是内在的,但需要通过等价关系来识别一些点。另一方面,将曲面嵌入欧几里得空间不是内在的,但不需要识别点。在本文中,我们对莫比乌斯带、环和实投影面感兴趣。更确切地说,我们构建了从蜂窝复数到三维欧几里得空间(对于莫比乌斯带和环面)和四维欧几里得空间(对于实射影平面)表面的解释同构及其反演。所有的嵌入都是已知的,但我们不知道它们的反演是否存在明确的公式。
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Cellular complexes and embeddings into Euclidean spaces: Möbius strip, torus, and projective plane
In algebraic topology, we usually represent surfaces by mean of cellular complexes. This representation is intrinsic, but requires to identify some points through an equivalence relation. On the other hand, embedding a surface in a Euclidean space is not intrinsic but does not require to identify points. In the present paper, we are interested in the M\"obius strip, the torus, and the real projective plane. More precisely, we construct explicit homeomorphisms, as well as their inverses, from cellular complexes to surfaces of 3-dimensional (for the M\"obius strip and the torus) and 4-dimensional (for the projective plane) Euclidean spaces. All the embeddings were already known, but we are not aware if explicit formulas for their inverses exist.
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