Malte
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Registered User
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Apr 26 |
revised |
Riemannian manifolds with small geodesics and bounded curvature deleted 3 characters in body |
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Apr 26 |
revised |
Riemannian manifolds with small geodesics and bounded curvature added 157 characters in body; deleted 5 characters in body |
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Apr 26 |
revised |
Riemannian manifolds with small geodesics and bounded curvature added 210 characters in body |
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Apr 26 |
comment |
Riemannian manifolds with small geodesics and bounded curvature Thank you, Rbega. This, of course, doesn't take the length of $\gamma$ into account. (One should expect the volume of $\Omega_i$ to increase as $i_g \rightarrow 0$. |
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Apr 26 |
asked | Riemannian manifolds with small geodesics and bounded curvature |
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Mar 18 |
comment |
Does a Riemannian manifold with bounded geometry admit an isometric proper embedding into Euclidean space with uniformly thick tubular neighborhood On the off-chance of making a fool of myself: By "open", do you mean "open and complete"? Otherwise, gettig a proper embedding should be impossible. On the other hand, isn't proper automatically satisfied once you require completeness? |
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Feb 27 |
awarded | ● Nice Question |
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Jan 13 |
awarded | ● Yearling |
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Jan 12 |
comment |
Is the volume functional contiunuous for compact manifolds with lower bounds on volume? Thank you! This means that the volume functional is continuous on the set of riemannian manifolds with upper diameter bound and lower bound on Ricci curvature. Good enough, anyway. |
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Jan 12 |
revised |
Is the volume functional contiunuous for compact manifolds with lower bounds on volume? added 47 characters in body |
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Jan 12 |
revised |
Is the volume functional contiunuous for compact manifolds with lower bounds on volume? added 8 characters in body |
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Jan 12 |
asked | Is the volume functional contiunuous for compact manifolds with lower bounds on volume? |
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Dec 10 |
awarded | ● Nice Question |
