Uniform Rectifiability and Quasiminimizing Sets of Arbitrary Codimension

Uniform Rectifiability and Quasiminimizing Sets of Arbitrary Codimension

Author
Guy David, Stephen Semmes
Publisher
American Mathematical Society
Language
English
Year
2000
Page
132
ISBN
0-8218-2048-6,9780821820483
File Type
djvu
File Size
1.2 MiB

Roughly speaking, a $d$-dimensional subset of $mathbfRn$ is minimizing if arbitrary deformations of it (in a suitable class) cannot decrease its $d$-dimensional volume. For quasiminimizing sets, one allows the mass to decrease, but only in a controlled manner. To make this precise we follow Almgren's notion of 'restricted sets' [textbold 2]. Graphs of Lipschitz mappings $f:mathbfRd to mathbfRn-d$ are always quasiminimizing, and Almgren showed that quasiminimizing sets are rectifiable. Here we establish uniform rectifiability properties of quasiminimizing sets, which provide a more quantitative sense in which these sets behave like Lipschitz graphs. (Almgren also established stronger smoothness properties under tighter quasiminimality conditions.)Quasiminimizing sets can arise as minima of functionals with highly irregular 'coefficients'. For such functionals, one cannot hope in general to have much more in the way of smoothness or structure than uniform rectifiability, for reasons of bilipschitz invariance. (See also [textbold 9].) One motivation for considering minimizers of functionals with irregular coefficients comes from the following type of question. Suppose that one is given a compact set $K$ with upper bounds on its $d$-dimensional Hausdorff measure, and lower bounds on its $d$-dimensional topology.What can one say about the structure of $K$ To what extent does it behave like a nice $d$-dimensional surface A basic strategy for dealing with this issue is to first replace $K$ by a set which is minimizing for a measurement of volume that imposes a large penalty on points which lie outside of $K$. This leads to a kind of regularization of $K$, in which cusps and very scattered parts of $K$ are removed, but without adding more than a small amount from the complement of $K$. The results for quasiminimizing sets then lead to uniform rectifiability properties of this regularization of $K$

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