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friend
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I have a few questions about manifolds. According to Wikipedia.org, A topological manifold is a locally Euclidean Hausdorff space.
First question, does locally Euclidean mean that there are a continuous set of points in order that they can be mapped to an infinite set of coordinates in the Euclidean space? Or can a manifold consist of separate points with no point in between?
First question, does locally Euclidean mean that there are a continuous set of points in order that they can be mapped to an infinite set of coordinates in the Euclidean space? Or can a manifold consist of separate points with no point in between?
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