Nonlocal mean curvature and Nonlocal mean curvature flow: Difference between pages

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(Created page with "The nonlocal mean curvature flow refers to an evolution equation for surfaces for which the normal velocity equals its nonlocal mean curvature. This flow was fist constructe...")
 
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#REDIRECT [[Nonlocal minimal surfaces]]
The nonlocal mean curvature flow refers to an evolution equation for surfaces for which the normal velocity equals its [[nonlocal mean curvature]].
 
This flow was fist constructed by Caffarelli and Souganidis <ref name="CS"/>.
 
== References ==
{{reflist|refs=
<ref name="CS">{{Citation | last1=Caffarelli | first1=Luis A. | last2=Souganidis | first2=P. E. | title=Convergence of nonlocal threshold dynamics approximations to front propagation | publisher=[[Springer-Verlag]] | location=Berlin, New York | year=2010 | journal=Archive for Rational Mechanics and Analysis | issn=0003-9527 | volume=195 | issue=1 | pages=1–23}}</ref>
}}
 
 
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Latest revision as of 00:17, 7 February 2012

The nonlocal mean curvature flow refers to an evolution equation for surfaces for which the normal velocity equals its nonlocal mean curvature.

This flow was fist constructed by Caffarelli and Souganidis [1].

References

  1. Caffarelli, Luis A.; Souganidis, P. E. (2010), "Convergence of nonlocal threshold dynamics approximations to front propagation", Archive for Rational Mechanics and Analysis (Berlin, New York: Springer-Verlag) 195 (1): 1–23, ISSN 0003-9527 


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