Difference between revisions of "User:Luca.Spolaor/sandbox"
Luca.Spolaor (talk | contribs) |
Luca.Spolaor (talk | contribs) |
||
Line 9: | Line 9: | ||
'''Definition 1''' | '''Definition 1''' | ||
− | Let $U \subset \mathbb R^n$. A [[Rectifiable varifold]] of dimension $m | + | Let $U \subset \mathbb R^n$. A [[Rectifiable varifold]] of dimension $m in $U$ is a couple $(M, \theta)$, where $M\subset U$ is an $m$-dimensional [[Rectifiable set]] and $\theta\colon M \to \mathbb R_+$ is a $\mathcal H^m$ measurable function, called density function. A varifold is called integral rectifiable if $\theta$ is integer valued. |
Revision as of 10:00, 11 September 2012
2020 Mathematics Subject Classification: Primary: 49Q15 [MSN][ZBL]
Rectifiable varifolds are a generalization of rectifiable sets in the sense that they allow for a density function to be defined on the set. They are also strictly connected to rectifiable currents, in fact to such a current one can always associate a varifold by putting aside the orientation.
Definitions
Definition 1 Let $U \subset \mathbb R^n$. A Rectifiable varifold of dimension $m in $U$ is a couple $(M, \theta)$, where $M\subset U$ is an $m$-dimensional [[Rectifiable set]] and $\theta\colon M \to \mathbb R_+$ is a $\mathcal H^m$ measurable function, called density function. A varifold is called integral rectifiable if $\theta$ is integer valued.
First Variation and Stationariety
Allard's Regularity Theorem
References
[Sim] | Leon Simon, "Lectures on Geometric Measure Theory". Proceedings of the centre for Mathematical Analysis. Australian National University, Canberra, 1983. MR0756417Zbl 0546.49019 |
[FX] | Lin Fanghua, Yang Xiaoping, "Geometric Measure Theory-An Introduction". Advanced Mathematics Vol.1. International Press, Boston, 2002. MR2030862Zbl 1074.49011 |
Luca.Spolaor/sandbox. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Luca.Spolaor/sandbox&oldid=27893