mperez32
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Registered User
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Dec 10 |
awarded | ● Scholar |
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Dec 7 |
awarded | ● Supporter |
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Dec 7 |
awarded | ● Student |
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Dec 7 |
comment |
Is the set of all smoothed closed simple curves on $\mathbb{R}^2$ a manifold? Thank you for the comments. I edited the questions to reflect your concerns. So is there no way to embed $M$ locally in $\mathbb{R}^n$ for some $n$? If not is it possible to model M as a Banach Manifold. I see how it is a Frechet Manifold. |
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Dec 7 |
awarded | ● Editor |
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Dec 7 |
revised |
Is the set of all smoothed closed simple curves on $\mathbb{R}^2$ a manifold? added 21 characters in body; edited title |
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Dec 7 |
asked | Is the set of all smoothed closed simple curves on $\mathbb{R}^2$ a manifold? |
