| 11. | Where the { \ delta } / { \ delta } t-derivative is the fundamental mean curvature tensor.
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| 12. | There, he turned to differential geometry, in particular problems of mean curvature flows and applications in general relativity.
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| 13. | Moreover, they also deduced the importance of mean curvature in the creation of excess pressure in the fluid thread.
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| 14. | Observe that the mean curvature is a trace, or average, of the second fundamental form, for any given component.
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| 15. | This definition uses that the mean curvature is half of the umbilic, in which case it is a piece of a sphere.
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| 16. | :"'Mean curvature flow definition "': Minimal surfaces are the critical points for the mean curvature flow.
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| 17. | :"'Mean curvature flow definition "': Minimal surfaces are the critical points for the mean curvature flow.
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| 18. | I think the articles about minimal surface are really underdeveloped at the moment, and even worse for surfaces of constant mean curvature.
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| 19. | This can be fixed by supposing that the sphere has the same mean curvature as " S " at the point of contact.
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| 20. | Where H is the mean curvature of \ Sigma _ t and \ nu is the unit vector opposite of the mean curvature direction, then
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