Difference between revisions of "User:Camillo.delellis/sandbox"
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+ | {{MSC|49Q15|49Q20,49Q05,28A75,32C30,58A25,58C35}} | ||
+ | [[Category:Classical measure theory]] | ||
+ | {{TEX|done}} | ||
+ | An area of analysis concerned with solving geometric problems via measure-theoretic techniques. The canonical motivating physical problem is probably that investigated experimentally by J. Plateau in the nineteenth century: Given a boundary wire, how does one find the (minimal) soap film which spans it? In mathematical terms: Given a boundary curve, find the surface of minimal area spanning it. (Cf. also [[Plateau problem|Plateau problem]].) The many different approaches to solving this problem have found utility in most areas of modern mathematics and geometric measure theory is no exception: techniques and ideas from geometric measure theory have been found useful in the study of partial differential equations, the calculus of variations, geometric analysis, harmonic analysis, and fractals. | ||
+ | Many variational problems (cf. also [[Variational calculus|Variational calculus]]) are solved by enlarging the allowed class of solutions, showing that in this enlarged class a solution exists, and then showing that the solution possesses more regularity than an arbitrary element of the enlarged class. Much of the work in geometric measure theory has been directed towards placing this informal description on a formal footing appropriate for the study of surfaces. | ||
− | + | =History= | |
− | [[ | + | =Measure theoretic concepts= |
+ | One of the central issues of geometric measure theory is to define the concepts of volume, area | ||
+ | and length in the uttermost generality. The roots of them are obviously in measure theory. In particular, the concept of [[Outer measure|outer measure]] in a [[Metric space|metric | ||
+ | space]] plays a fundamental role. | ||
− | + | ==Caratheodory construction== | |
+ | The following is a common construction of [[Metric outer measure|metric outer measures]] in metric spaces $(X, d)$. | ||
− | + | '''Definition 1''' | |
− | + | If $\mathcal{C}$ is a class of subsets of $X$ containing the empty set, $\nu : \mathcal{C}\to [0, \infty]$ a set function with $\nu (\emptyset) =0$ and $\delta\in ]0, \infty]$, then for every $A\subset X$ we define | |
− | |||
− | |||
− | |||
\[ | \[ | ||
− | \mu \left(\ | + | \mu^\delta (A) := \inf \left\{ \sum_i \nu (E_i) : \{E_i\}_{i\in \mathbb N} \subset \mathcal{C} \mbox{ covers } A \mbox{ and } {\rm diam}\, (E_i) \leq \delta\,\right\}\, |
\] | \] | ||
− | + | and | |
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
\[ | \[ | ||
− | \mu (A\ | + | \mu (A) := \lim_{\delta\downarrow 0}\; \mu^\delta (A)\, . |
\] | \] | ||
+ | |||
+ | Observe that the latter limit exists because $\mu^\delta (A)$ is a nonincreasing function of $\delta$. | ||
+ | This construction is often called ''Caratheodory construction''. See Section 2.1 of {{Cite|KP}} (cp. also with {{Cite|Fe}}). | ||
'''Theorem 2''' | '''Theorem 2''' | ||
− | + | Let $\nu$ and $\mu$ be as in Definition 7. Then $\mu$ is a metric outer measure. Thus there is a [[Algebra of sets|$\sigma$-algebra]] $\mathcal{A}$ which | |
− | + | contains the [[Borel set|Borel sets]] and such that the restriction of $\mu$ to $\mathcal{A}$ is $\sigma$-additive. | |
− | \mu | ||
− | |||
− | |||
− | + | (Cp. with Claims 1,2 and 3 in the proof of Theorem 1 in Section 2.1 of {{Cite|EG}}: although the reference handles the cases of Hausdorff outer measures, the proof extends verbatim to the setting above). | |
− | == | + | ===Hausdorff measures=== |
− | + | The Caratheodory construction gives several generalizations of the concept of dimension and | |
+ | volume. The most common is due to Hausdorff (cp. with {{Cite|Ha}}). | ||
'''Definition 3''' | '''Definition 3''' | ||
− | + | The [[Hausdorff measure|Hausdorff outer measure]] $\mathcal{H}^\alpha$ is given by such $\mu$ as in Definition 1 when we choose $\mathcal{C} = \mathcal{P} (X)$ and $\nu (A) = \omega_\alpha ({\rm diam}\, (A))^\alpha$, where | |
\[ | \[ | ||
− | \ | + | \omega_\alpha = \frac{\pi^{\alpha/2}}{\Gamma \left(\frac{\alpha}{2}+1\right)}\, |
\] | \] | ||
− | + | (cp. with Section 2.1 of {{Cite|EG}}). | |
+ | |||
+ | When $\alpha$ is a (positive) integer $n$, $\omega_n$ equals the Lebesgue measure of the unit ball in $\mathbb R^n$. With | ||
+ | this choice the $n$-dimensional Hausdorff outer measure on the euclidean space $\mathbb R^n$ coincides | ||
+ | with the Lebesgue measure. It must be noted, however, that some authors prefer to set the constant $\omega_\alpha$ equal to $1$ (see for instance {{Cite|Ma}}). | ||
+ | |||
+ | ====Hausdorff dimension==== | ||
+ | The following is a simple consequence of the definition (cp. with Theorem 4.7 of {{Cite|Ma}}). | ||
'''Theorem 4''' | '''Theorem 4''' | ||
− | + | For $0\leq s<t<\infty$ and $A\subset X$ we have | |
+ | * $\mathcal{H}^s (A) < \infty \Rightarrow \mathcal{H}^t (A) = 0$; | ||
+ | * $\mathcal{H}^t (A)>0 \Rightarrow \mathcal{H}^s (A) = \infty$. | ||
+ | |||
+ | The [[Hausdorff dimension]] ${\rm dim}_H (A)$ of a subset $A\subset X$ is then defined as | ||
− | + | '''Definition 5''' | |
+ | \begin{align*} | ||
+ | {\rm dim}_H (A) &= \sup \{s: \mathcal{H}^s (A)> 0\} = \sup \{s: \mathcal{H}^s (A) = \infty\}\\ | ||
+ | &=\inf \{t: \mathcal{H}^t (A) = 0\} = \inf \{t: \mathcal{H}^t (A) < \infty\}\, . | ||
+ | \end{align*} | ||
− | === | + | ===Other measures related to the volume=== |
− | + | The Caratheodory construction can be used to build other generalizations of the concept of volume, such as | |
+ | * The spherical $\alpha$-dimensional outer measures on a metric space $(X,d)$, see Section 2.1.2 of {{Cite|KP}}. | ||
+ | * The Gross outer measures, the Caratheodory outer measures, the integral-geometric outer measures (see also [[Favard measure]]) and the Gillespie outer measures in $\mathbb R^n$, see Sections 2.1.3-2.1.4-2.1.5 of {{Cite|KP}} (cp. also with 2.10.2-2.10.3-2.10.4 of {{Cite|Fe}}). | ||
+ | All these measures coincide on sufficiently regular set (in particular on [[Rectifiable set|rectifiable sets]], see below), but they are, in general, different. | ||
+ | ===Fractals=== | ||
+ | Fractals have been originally defined by B.B. Mandelbrot as point sets with non-integer Hausdorff dimension, although this name is nowadays also applied to sets of integer dimensions which are [[Purely unrectifiable set|purely unrectifiable]]. Classical examples of fractals are the [[Cantor set]], the [[Koch curve]] and the [[Julia set]] of an holomorphic function $f$. Fractals are typically self-similar. | ||
− | + | Sets with non-integer Hausdorff dimension have been objects of study of geometric measure theory since the pioneering works of Besicovitch and Marstrand. For an account of the modern mathematical theory of fractals we refer the reader to {{Cite|Fa2}}. | |
− | |||
− | |||
− | + | ==Differentiation theorem== | |
− | + | It is common in geometric measure theory to construct measures as solutions to geometric problems or to partial differential equations. In these cases measures are often considered as a suitable relaxation of $k$-dimensional surfaces. For instance, given a $k$-dimensional surface $\Gamma\subset \mathbb R^n$, one can natural | |
− | \begin{equation}\label{e: | + | associate to this surface the measure $\mu (A) := \mathcal{H}^k (A\cap \Gamma)$. It is therefore of interest to understand which assumptions guarantee that a measure has a structure as in the latter example. |
− | \mu ( | + | A fundamental tool in this direction, which is used ubiquitously in geometric measure theory, is the following theorem (cp. with [[Differentiation of measures]]), usually credited to Besicovitch (see {{Cite|Be4}} and {{Cite|Be5}}) and which |
+ | gives an explicit characterization of the [[Absolutely continuous measures|Radon-Nykodim decomposition]] for locally finite [[Radon measure|Radon measures]] on the euclidean space. | ||
+ | |||
+ | '''Theorem 6''' (cp. with Theorem 2.12 of {{Cite|Ma}} and Theorem 2 in Section 1.6 of {{Cite|EG}}) | ||
+ | Let $\mu$ and $\nu$ be two locally finite Radon measures on $\mathbb R^n$. Then, | ||
+ | * the limit | ||
+ | \[ | ||
+ | f(x) := \lim_{r\downarrow 0} \frac{\nu (B_r (x))}{\mu (B_r (x))} | ||
+ | \] | ||
+ | exists at $\mu$-a.e. $x$ and defines a $\mu$-measurable map; | ||
+ | * the set | ||
+ | \begin{equation}\label{e:singular} | ||
+ | S:= \left\{ x: \lim_{r\downarrow 0} \frac{\nu (B_r (x))}{\mu (B_r (x))} = \infty\right\} | ||
+ | \end{equation} | ||
+ | is $\nu$-measurable and a $\mu$-null set; | ||
+ | * $\nu$ can be decomposed as $\nu_a + \nu_s$, where | ||
+ | \[ | ||
+ | \nu_a (E) = \int_E f\, d\mu | ||
+ | \] | ||
+ | and | ||
+ | \[ | ||
+ | \nu_s (E) = \nu (S\cap E)\, . | ||
+ | \] | ||
+ | Moreover, for $\mu$-a.e. $x$ we have: | ||
+ | \begin{equation}\label{e:Lebesgue} | ||
+ | \lim_{r\downarrow 0} \frac{1}{\mu (B_r (x))} \int_{B_r (x)} |f(y)-f(x)|\, d\mu (y) = 0\qquad \mbox{and}\qquad \lim_{r\downarrow 0} \frac{\nu_s (B_r (x))}{\mu (B_r (x))}= 0\, . | ||
\end{equation} | \end{equation} | ||
− | + | ===Covering arguments=== | |
− | + | Theorem 6 does not hold in general metric spaces. It holds provided the metric space satisfies some properties about covering of sets with balls (cp. with [[Covering theorems (measure theory)]]). In fact, aside from their links to the differentiation of measures, both the Vitali and Besicovitch covering Lemmas (see again [[Covering theorems (measure theory)]]) and similar arguments play a pivotal role in several fundamental results of geometric measure theory. | |
+ | |||
+ | =Rectifiable sets= | ||
+ | Also called ''countably rectifiable sets'', rectifiable sets are central objects of study in [[Geometric measure theory]], cp. with [[Rectifiable set]]. Rectifiable sets of the euclidean space are fairly close to $C^1$ submanifolds, a sort of measure-theoretic counterpart of the latter. As such they have an integer Hausdorff dimension. In the special case of $1$-dimensional sets of the euclidean space, they were first introduced by Besicovitch, as a suitable generalization of [[Rectifiable curve|rectifiable curves]]. | ||
+ | In what follows we will use the terminology ''$m$-dimensional rectifiable set''. Some authors prefer the terminology ''countably $m$-rectifiable set'' or, briefly, ''$m$-rectifiable''. | ||
+ | |||
+ | Rectifiable subsets of the Euclidean space $\mathbb R^n$ can be defined in several ways, see [[Rectifiable set]]. We adopt here the following one | ||
+ | |||
+ | '''Definition 7''' (cp. with Lemma 11.1 of {{Cite|Si}}) | ||
+ | A Borel set $E\subset \mathbb R^n$ is a rectifiable subset of dimension $k$ if it has Hausdorff dimension $k$ and there is a countable family of $C^1$ $k$-dimensional submanifolds of $\mathbb R^n$ which cover $\mathcal{H}^k$-almost all $E$. | ||
+ | |||
+ | The assumption that $E$ is a Borel set might be dropped, but in this case the set might not be $\mathcal{H}^k$-measurable (see [[Rectifiable set]]). In what follows we will assume that rectifiable sets $E$ are $\mathcal{H}^k$ measurable: $\sigma$-finite $\mathcal{H}^k$-measurable sets can be decomposed into the union of a Borel set and an $\mathcal{H}^k$-null set. | ||
+ | |||
+ | ==Besicovitch's works== | ||
+ | As already mentioned, the theory of rectifiable $1$-dimensional sets was first laid down by Besicovitch in a series of works (see {{Cite|Be1}}, {{Cite|Be2}}, {{Cite|Be3}}). In these seminal papers Besicovitch considered and solved several questions which became later pivotal for rectifiable sets of higher dimension. He also introduced many useful tools (such as the Besicovitch covering theorem, see [[Covering theorems (measure theory)]]) which have been widely used in different contexts. | ||
+ | ===One-dimensional sets=== | ||
+ | The theory of one-dimensional rectifiable sets is somewhat special since much stronger theorems can be proved which fail for higher dimensions. Perhaps the most useful one is the following (cp. with Theorem 3.14 of {{Cite|Fa}}): | ||
+ | |||
+ | '''Theorem 8''' | ||
+ | A [[Continuum|continuum]], i.e. a compact connected set, $E\subset\mathbb R^n$ of finite $\mathcal{H}^1$ measure is always rectifiable and arcwise connected. Indeed it is always the image of a [[Rectifiable curve|rectifiable curve]]. | ||
+ | |||
+ | We refer to {{Cite|Fa}} for a comprehensive account of the theory of rectifiable one-dimensional sets. | ||
+ | |||
+ | ==General dimension and codimension== | ||
+ | The main importance of the class of rectifiable sets is that it possesses many of the nice properties of the smooth surfaces which one is seeking to generalize. For example, although, in general, classical tangents may not exist, an $m$-rectifiable set will possess a unique approximate tangent at $\mathcal{H}^m$-almost every point (see [[Rectifiable set]]). | ||
+ | |||
+ | ===Besicovitch-Federer projection theorem=== | ||
+ | Often, one is faced with the task of showing that some set, which is a solution to the problem under investigation, is in fact rectifiable, and hence possesses some smoothness. A major concern in geometric measure theory is finding criteria which guarantee rectifiability, several of these criteria are listed in [[Rectifiable set]]. One of the most striking results in this direction is the Besicovitch–Federer projection theorem, which illustrates the stark difference between rectifiable and unrectifiable sets. This theorem characterize purely unrectifiable $m$-dimensional sets as those sets whose projections are $\mathcal{H}^m$-negligible on almost every $m$-dimensional plane (for the precise statement, we refer to [[Rectifiable set]]). This deep result was first proved for $1$-dimensional sets in the plane by A.S. Besicovitch, and later extended to higher dimensions by H. Federer. B. White in {{Cite|Wh}} has shown how the higher-dimensional version of this theorem follows via an inductive argument from the planar version. | ||
+ | |||
+ | ===Recitifiable measures=== | ||
+ | It is also possible (and useful) to define a notion of rectifiability for (locally finite) Radon measures: A [[Radon measure|Radon measure]] $\mu$ is said to be $m$-rectifiable if it is absolutely continuous (cf. also [[Absolute continuity|Absolute continuity]]) with respect to the $m$-dimensional Hausdorff measure and there is an $m$-dimensional rectifiable set $E$ for which $\mu ({\mathbb R}^n\setminus E)=0$. The complementary notion of a measure $\mu$ being purely $m$-unrectifiable is defined by requiring that $\mu$ is singular with respect to all $m$-rectifiable measures (cf. also [[Mutually-singular measures|Mutually-singular measures]]). Thus, in particular, a Borel set $E$ is $m$-rectifiable if and only if the measure $\mu$ defined by $\mu (A) := \mathcal{H}^m (A\cap E)$ (i.e. the restriction of $\mathcal{H}^m$ to $E$ is $m$-rectifiable); this allows one to study rectifiable sets through $m$-rectifiable measures. | ||
+ | |||
+ | ====Besicovitch-Marstrand-Preiss theorem==== | ||
+ | It is common in analysis to construct measures as solutions to equations, and one would like to be able to deduce something about the structure of these measures (for example, that they are rectifiable). Often, the only a priori information available is some limited metric information about the measure, perhaps how the mass of small balls grows with radius (cp. with [[Density of a set]]). Probably the strongest known result in this direction is Preiss' density theorem, which generalizes earlier results of Besicovitch and Marstrand. The following theorem summarizes both the deep results of Marstrand and Preiss (cp. with {{Cite|De}}). | ||
+ | |||
+ | '''Theorem 9''' | ||
+ | Let $\mu$ be a locally finite Radon measure in the euclidean space $\mathbb R^n$ and $\alpha$ a nonnegative real number. Then the $\alpha$-dimensional density | ||
+ | \[ | ||
+ | \lim_{r\downarrow 0} \frac{\mu (B_r (x))}{r^\alpha} | ||
+ | \] | ||
+ | exists, it is finite and positive | ||
+ | at $\mu$-a.e. $x\in \mathbb R^n$ if and only $\alpha$ is an integer $k$ and there are a rectifiable $k$-dimensional Borel set $E$ and a Borel function $f: E\to ]0, \infty[$ such that | ||
+ | \[ | ||
+ | \mu (A) = \int_{A\cap E} f\, d\mathcal{H}^k\qquad \mbox{for any Borel } A\subset \mathbb R^n\, . | ||
+ | \] | ||
+ | |||
+ | ====Tangent measures==== | ||
+ | Preiss' main tool in proving that the existence of a density implies the rectifiability of the measure was the notion of tangent measure. A non-zero Radon measure $\nu$ is a tangent measure of $\mu$ at $x$ if there are sequences $r_i\downarrow 0$ and $c_i$ such that, for all continuous real-valued functions $\phi$ with compact support, | ||
+ | \[ | ||
+ | \lim_{i\to\infty} c_i \int \phi \left(\frac{y-x}{r_i}\right)\, d\mu (y) = \int \phi (y)\, d\nu (y)\, . | ||
+ | \] | ||
+ | Thus, an $m$-rectifiable measure will, for almost-every point, have tangent measures which are multiples of $m$-dimensional Hausdorff measure restricted to the approximate tangent plane at that point (cp. with [[Rectifiable set]]); for unrectifiable measures, the set of tangent measures will usually be much richer | ||
+ | (see {{Cite|ON}}). The utility of the notion lies in the fact that tangent measures often possess more regularity than the original measure, thus allowing a wider range of analytical techniques to be used upon them. | ||
− | + | =Caccioppoli sets= | |
− | |||
− | |||
− | |||
− | + | A possible (and quite common) definition of perimeter of a measurable set $E\subset \mathbb R^n$ is | |
+ | \[ | ||
+ | {\rm Per} (E) := \inf \left\{ \liminf_k\; \mathcal{H}^{n-1} (\partial E_k):\;\{E_k\} \mbox{ is a sequence of smooth sets with } \lambda (E\bigtriangleup E_k) \to 0\right\}\, , | ||
+ | \] | ||
+ | where $\lambda$ denotes the Lebesgue measure. Measurable sets $E$ such that ${\rm Per} (E) < \infty$ are called ''sets of finite perimeter'' or ''Caccioppoli sets''. A localized notion is also possible: if $\Omega$ is an open set, it customary to define ${\rm Per} (E, \Omega)$ by replacing $\mathcal{H}^{n-1} (\partial E_k)$ with $\mathcal{H}^{n-1} ((\partial E_k)\cap \Omega)$ in the formula above. | ||
− | + | This definition is in the spirit of the original work of Caccioppoli where the approximating sets instead of being smooth were required to be polytopes (cp. with {{Cite|Ca}}). It was a fundamental discovery of De Giorgi that Caccioppoli's Perimeter has indeed both a functional and measure-theoretic interpretation: the functional interpretation, given below, is indeed taken as definition by most authors, whereas the above characterization of the perimeter is then conclude. The theory of Caccioppoli set was first set forth by De Giorgi to solve the Plateau's problem in codimension 1 and study the isoperimetric problem. | |
− | |||
− | + | ==Functions of bounded variation== | |
− | If $ | + | If $E$ is a measurable set, then $E$ is a Caccioppoli set if and only if the indicator function |
\[ | \[ | ||
− | \ | + | {\bf 1}_E (x):= \left\{ |
+ | \begin{array}{ll} | ||
+ | 1 \quad \mbox{if } x\in E\\ | ||
+ | 0 \quad \mbox{otherwise} | ||
+ | \end{array} | ||
+ | \right. | ||
\] | \] | ||
− | and | + | has finite [[Variation of a function|variation]] $V ({\bf 1}_E, \Omega)$. It then turns out that |
+ | \[ | ||
+ | {\rm Per}\, (E, \Omega) = V ({\bf 1}_E, \Omega)\, . | ||
+ | \] | ||
+ | If in addition the Lebesgue measure of $E$ is finite, ${\bf 1}_E$ is a [[Function of bounded variation|function of bounded variation]]. | ||
+ | |||
+ | If $E\subset \Omega$ has a $C^1$ topological boundary $\partial E$ with $\mathcal{H}^{n-1} ((\partial E)\cap\Omega) < \infty$, then it is a Caccioppoli set and if we denote by $\nu$ the exterior unit normal field at $\partial E$, the [[Divergence|divergence theorem]] | ||
+ | implies | ||
+ | \begin{equation}\label{e:divergenza1} | ||
+ | \int {\bf 1}_E\, {\rm div}\, \varphi\, d\lambda = - \int_E {\rm div}\, \varphi\, d\lambda = \int_{\partial E} \varphi\cdot \nu\, d\mathcal{H}^{n-1}\qquad \forall \varphi\in C^1_c (\Omega,\mathbb R^n)\, . | ||
+ | \end{equation} | ||
+ | Thus $V ({\bf 1}_E, \Omega) = \mathcal{H}^{n-1} ((\partial E)\cap\Omega)$ and hence ${\bf 1}_E\in BV_{loc} (\Omega)$ (for having ${\bf 1}_E\in BV (\Omega)$ we need the additional condition $\lambda (E)<\infty$). In particular, if | ||
+ | we introduce the vector measure | ||
\[ | \[ | ||
− | \mu (A) := \ | + | \mu (A) := - \int_{A\cap E} \nu\, d\mathcal{H}^{n-1}\, , |
\] | \] | ||
+ | \eqref{e:divergenza1} is then simply the identity $D{\bf 1}_E =\mu$ in the sense of distributions. | ||
− | + | For general Caccioppoli sets, it is possible to identify an appropriate notion of ''measure-theoretic boundary'', which is rectifiable and whose Hausdorff measure coincides with the perimeter. A corresponding generalization of the divergence theorem holds. See the section '''Reduced boundary and structure theorem''' of [[Function of bounded variation]] for more details. | |
− | + | ==Plateau's problem in codimension 1== | |
+ | The Caccioppoli sets were first used by De Giorgi to formulate the Plateau's problem in codimension $1$ in the following fashion. Consider two smooth open sets $\Omega, U \subset \mathbb R^n$ such that $\partial U$ and $\partial \Omega$ intersect transversally in a smooth $(n-2)$-dimensional submanifold $\Sigma$. | ||
+ | |||
+ | '''Definition 10''' | ||
+ | A genealized solution of the Plateau problem in $U$ relative to the boundary $\Sigma$ is a Caccioppoli set $E\subset \mathbb R^n$ such that $E\setminus U = \Omega\setminus U$ and has least perimeter among all such sets. | ||
+ | |||
+ | Standard compactness properties of the space of functions of bounded variation leads then to the following fundamental existence theorem. | ||
− | '''Theorem | + | '''Theorem 11''' |
− | + | There is a generalized solution as defined above, namely the infimum of ${\rm Per}\, (E)$ among all Caccioppoli sets $E$ with $E\setminus U = \Omega\setminus U$ is attained by some set $F$. | |
− | + | ==Regularity theory== | |
+ | ===Bernstein's problem=== | ||
+ | ====Simons' cone==== | ||
+ | ===De Giorgi's $\varepsilon$-regularity theorem=== | ||
+ | ===Simons' inequality and solution of the Bernstein's problem=== | ||
+ | ====Stable surfaces==== | ||
+ | ===Federer's estimate of the singular set=== | ||
+ | ===Simon's rectifiability theorem=== | ||
+ | ==Mumford Shah conjecture== | ||
− | ''' | + | =Currents= |
− | + | ==Federer-Fleming theory== | |
+ | ===Compactness for integral currents=== | ||
+ | ===Deformation theorem=== | ||
+ | ==Plateau's problem in any codimension== | ||
+ | ==Regularity theory== | ||
+ | ===Almgren's $\varepsilon$-regularity theorem=== | ||
+ | ===Almgren's big regularity paper=== | ||
+ | ==Currents in metric spaces== | ||
+ | =Varifolds= | ||
+ | ==General theory== | ||
+ | ==Rectifiable and integral varifolds== | ||
+ | ==Regularity theory== | ||
+ | ===Allard's rectifiability theorem=== | ||
+ | ===Allard's $\varepsilon$-regularity theorem=== | ||
+ | =Calculus of variations in the large= | ||
+ | ==Pitts' theory== | ||
+ | ===Schoen-Simon curvature estimates=== | ||
+ | ===The Willmore conjecture=== | ||
+ | ==Smith's theorem and generalizations== | ||
+ | ===Applications to topology=== | ||
+ | =Uniqueness of tangent cones= | ||
+ | ==White's theorem== | ||
+ | ==Simon's theorem== | ||
+ | ===Lojasievicz inequality=== | ||
+ | =Soap films= | ||
+ | ==Almgren's $\varepsilon-\delta$ minimal sets== | ||
+ | ==Taylor's theorem== | ||
+ | ==Double-bubble conjecture== | ||
+ | =Notable applications= | ||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | + | =References= | |
{| | {| | ||
|- | |- | ||
− | |valign="top"|{{Ref| | + | |valign="top"|{{Ref|Be1}}|| A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (I). Math. Ann. Vol. 98 (1927), pp. 422-464. |
+ | |- | ||
+ | |valign="top"|{{Ref|Be2}}|| A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (II). Math. Ann. Vol. 115 (1938), pp. 296-329. | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Be3}}|| A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (III). Math. Ann. Vol. 116 (1939), pp. 349-357. | ||
|- | |- | ||
− | |valign="top"|{{Ref| | + | |valign="top"|{{Ref|Be4}}|| A. S. Besicovitch, A general form of the covering principle and relative differentiation of additive functions (I) Proc. Cambridge Phil. Soc. Vol. 41 (1945), pp. 103-110. |
|- | |- | ||
− | |valign="top"|{{Ref| | + | |valign="top"|{{Ref|Be4}}|| A. S. Besicovitch, A general form of the covering principle and relative differentiation of additive functions (II) Proc. Cambridge Phil. Soc. Vol. 42 (1946), pp. 1-10. |
+ | |- | ||
+ | |valign="top"|{{Ref|Ca}}|| R. Caccioppoli, "Misura e integrazione sugli insiemei dimensionalmente orientati I, II", Rend. Acc. Naz. Lincei (8), {\bf 12} (1952) pp. 3-11 and 137-146. | ||
+ | |- | ||
+ | |valign="top"|{{Ref|De}}|| C. De Lellis, "Rectifiable sets, densities and tangent measures" Zurich Lectures in Advanced Mathematics. European Mathematical Society (EMS), Zürich, 2008. {{MR|2388959}} {{ZBL|1183.28006}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|EG}}|| L.C. Evans, R.F. Gariepy, "Measure theory and fine properties of functions" Studies in Advanced Mathematics. CRC Press, Boca Raton, FL, 1992. {{MR|1158660}} {{ZBL|0804.2800}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Fa}}|| K. J. Falconer. "The geometry of fractal sets". Cambridge Tracts in Mathematics, 85. Cambridge University Press, Cambridge, 1986. {{MR|0867284}} {{ZBL|0587.28004}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Fa2}}|| K. J. Falconer. "Fractal Geometry: Mathematical Foundations and Applications". John Wiley & Sons, 2003. | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Fe}}|| H. Federer, "Geometric measure theory". Volume 153 of Die Grundlehren der mathematischen Wissenschaften. Springer-Verlag New York Inc., New York, 1969. {{MR|0257325}} {{ZBL|0874.49001}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Ha}}|| F. Hausdorff, "Dimension and äusseres Mass" ''Math. Ann.'' , '''79''' (1918) pp. 157–179 {{MR|1511917}} {{ZBL|}} | ||
|- | |- | ||
|valign="top"|{{Ref|KP}}|| S. G. Krantz, H. Parks, "Geometric Integration Theory", Birkhäuser (2008). | |valign="top"|{{Ref|KP}}|| S. G. Krantz, H. Parks, "Geometric Integration Theory", Birkhäuser (2008). | ||
|- | |- | ||
− | |valign="top"|{{Ref|Ma}}|| | + | |valign="top"|{{Ref|Ma}}|| P. Mattila, "Geometry of sets and measures in Euclidean spaces. Fractals and rectifiability". Cambridge Studies in Advanced Mathematics, 44. Cambridge University Press, Cambridge, 1995. {{MR|1333890}} {{ZBL|0911.28005}} |
+ | |- | ||
+ | |valign="top"|{{Ref|Mu}}|| M. E. Munroe, "Introduction to Measure and Integration". Addison Wesley (1953). | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Wh}}|| B. White, "A new proof of Federer's structure theorem for $k$-dimensional subsets of $\mathbb R^n$ ''J. Amer. Math. Soc.'' , '''11''' : 3 (1998) pp. 693–701 | ||
|- | |- | ||
|} | |} |
Latest revision as of 14:54, 20 August 2013
2020 Mathematics Subject Classification: Primary: 49Q15 Secondary: 49Q2049Q0528A7532C3058A2558C35 [MSN][ZBL]
An area of analysis concerned with solving geometric problems via measure-theoretic techniques. The canonical motivating physical problem is probably that investigated experimentally by J. Plateau in the nineteenth century: Given a boundary wire, how does one find the (minimal) soap film which spans it? In mathematical terms: Given a boundary curve, find the surface of minimal area spanning it. (Cf. also Plateau problem.) The many different approaches to solving this problem have found utility in most areas of modern mathematics and geometric measure theory is no exception: techniques and ideas from geometric measure theory have been found useful in the study of partial differential equations, the calculus of variations, geometric analysis, harmonic analysis, and fractals.
Many variational problems (cf. also Variational calculus) are solved by enlarging the allowed class of solutions, showing that in this enlarged class a solution exists, and then showing that the solution possesses more regularity than an arbitrary element of the enlarged class. Much of the work in geometric measure theory has been directed towards placing this informal description on a formal footing appropriate for the study of surfaces.
History
Measure theoretic concepts
One of the central issues of geometric measure theory is to define the concepts of volume, area and length in the uttermost generality. The roots of them are obviously in measure theory. In particular, the concept of outer measure in a metric space plays a fundamental role.
Caratheodory construction
The following is a common construction of metric outer measures in metric spaces $(X, d)$.
Definition 1 If $\mathcal{C}$ is a class of subsets of $X$ containing the empty set, $\nu : \mathcal{C}\to [0, \infty]$ a set function with $\nu (\emptyset) =0$ and $\delta\in ]0, \infty]$, then for every $A\subset X$ we define \[ \mu^\delta (A) := \inf \left\{ \sum_i \nu (E_i) : \{E_i\}_{i\in \mathbb N} \subset \mathcal{C} \mbox{ covers } A \mbox{ and } {\rm diam}\, (E_i) \leq \delta\,\right\}\, \] and \[ \mu (A) := \lim_{\delta\downarrow 0}\; \mu^\delta (A)\, . \]
Observe that the latter limit exists because $\mu^\delta (A)$ is a nonincreasing function of $\delta$. This construction is often called Caratheodory construction. See Section 2.1 of [KP] (cp. also with [Fe]).
Theorem 2 Let $\nu$ and $\mu$ be as in Definition 7. Then $\mu$ is a metric outer measure. Thus there is a $\sigma$-algebra $\mathcal{A}$ which contains the Borel sets and such that the restriction of $\mu$ to $\mathcal{A}$ is $\sigma$-additive.
(Cp. with Claims 1,2 and 3 in the proof of Theorem 1 in Section 2.1 of [EG]: although the reference handles the cases of Hausdorff outer measures, the proof extends verbatim to the setting above).
Hausdorff measures
The Caratheodory construction gives several generalizations of the concept of dimension and volume. The most common is due to Hausdorff (cp. with [Ha]).
Definition 3 The Hausdorff outer measure $\mathcal{H}^\alpha$ is given by such $\mu$ as in Definition 1 when we choose $\mathcal{C} = \mathcal{P} (X)$ and $\nu (A) = \omega_\alpha ({\rm diam}\, (A))^\alpha$, where \[ \omega_\alpha = \frac{\pi^{\alpha/2}}{\Gamma \left(\frac{\alpha}{2}+1\right)}\, \] (cp. with Section 2.1 of [EG]).
When $\alpha$ is a (positive) integer $n$, $\omega_n$ equals the Lebesgue measure of the unit ball in $\mathbb R^n$. With this choice the $n$-dimensional Hausdorff outer measure on the euclidean space $\mathbb R^n$ coincides with the Lebesgue measure. It must be noted, however, that some authors prefer to set the constant $\omega_\alpha$ equal to $1$ (see for instance [Ma]).
Hausdorff dimension
The following is a simple consequence of the definition (cp. with Theorem 4.7 of [Ma]).
Theorem 4 For $0\leq s<t<\infty$ and $A\subset X$ we have
- $\mathcal{H}^s (A) < \infty \Rightarrow \mathcal{H}^t (A) = 0$;
- $\mathcal{H}^t (A)>0 \Rightarrow \mathcal{H}^s (A) = \infty$.
The Hausdorff dimension ${\rm dim}_H (A)$ of a subset $A\subset X$ is then defined as
Definition 5 \begin{align*} {\rm dim}_H (A) &= \sup \{s: \mathcal{H}^s (A)> 0\} = \sup \{s: \mathcal{H}^s (A) = \infty\}\\ &=\inf \{t: \mathcal{H}^t (A) = 0\} = \inf \{t: \mathcal{H}^t (A) < \infty\}\, . \end{align*}
The Caratheodory construction can be used to build other generalizations of the concept of volume, such as
- The spherical $\alpha$-dimensional outer measures on a metric space $(X,d)$, see Section 2.1.2 of [KP].
- The Gross outer measures, the Caratheodory outer measures, the integral-geometric outer measures (see also Favard measure) and the Gillespie outer measures in $\mathbb R^n$, see Sections 2.1.3-2.1.4-2.1.5 of [KP] (cp. also with 2.10.2-2.10.3-2.10.4 of [Fe]).
All these measures coincide on sufficiently regular set (in particular on rectifiable sets, see below), but they are, in general, different.
Fractals
Fractals have been originally defined by B.B. Mandelbrot as point sets with non-integer Hausdorff dimension, although this name is nowadays also applied to sets of integer dimensions which are purely unrectifiable. Classical examples of fractals are the Cantor set, the Koch curve and the Julia set of an holomorphic function $f$. Fractals are typically self-similar.
Sets with non-integer Hausdorff dimension have been objects of study of geometric measure theory since the pioneering works of Besicovitch and Marstrand. For an account of the modern mathematical theory of fractals we refer the reader to [Fa2].
Differentiation theorem
It is common in geometric measure theory to construct measures as solutions to geometric problems or to partial differential equations. In these cases measures are often considered as a suitable relaxation of $k$-dimensional surfaces. For instance, given a $k$-dimensional surface $\Gamma\subset \mathbb R^n$, one can natural associate to this surface the measure $\mu (A) := \mathcal{H}^k (A\cap \Gamma)$. It is therefore of interest to understand which assumptions guarantee that a measure has a structure as in the latter example. A fundamental tool in this direction, which is used ubiquitously in geometric measure theory, is the following theorem (cp. with Differentiation of measures), usually credited to Besicovitch (see [Be4] and [Be5]) and which gives an explicit characterization of the Radon-Nykodim decomposition for locally finite Radon measures on the euclidean space.
Theorem 6 (cp. with Theorem 2.12 of [Ma] and Theorem 2 in Section 1.6 of [EG]) Let $\mu$ and $\nu$ be two locally finite Radon measures on $\mathbb R^n$. Then,
- the limit
\[ f(x) := \lim_{r\downarrow 0} \frac{\nu (B_r (x))}{\mu (B_r (x))} \] exists at $\mu$-a.e. $x$ and defines a $\mu$-measurable map;
- the set
\begin{equation}\label{e:singular} S:= \left\{ x: \lim_{r\downarrow 0} \frac{\nu (B_r (x))}{\mu (B_r (x))} = \infty\right\} \end{equation} is $\nu$-measurable and a $\mu$-null set;
- $\nu$ can be decomposed as $\nu_a + \nu_s$, where
\[ \nu_a (E) = \int_E f\, d\mu \] and \[ \nu_s (E) = \nu (S\cap E)\, . \] Moreover, for $\mu$-a.e. $x$ we have: \begin{equation}\label{e:Lebesgue} \lim_{r\downarrow 0} \frac{1}{\mu (B_r (x))} \int_{B_r (x)} |f(y)-f(x)|\, d\mu (y) = 0\qquad \mbox{and}\qquad \lim_{r\downarrow 0} \frac{\nu_s (B_r (x))}{\mu (B_r (x))}= 0\, . \end{equation}
Covering arguments
Theorem 6 does not hold in general metric spaces. It holds provided the metric space satisfies some properties about covering of sets with balls (cp. with Covering theorems (measure theory)). In fact, aside from their links to the differentiation of measures, both the Vitali and Besicovitch covering Lemmas (see again Covering theorems (measure theory)) and similar arguments play a pivotal role in several fundamental results of geometric measure theory.
Rectifiable sets
Also called countably rectifiable sets, rectifiable sets are central objects of study in Geometric measure theory, cp. with Rectifiable set. Rectifiable sets of the euclidean space are fairly close to $C^1$ submanifolds, a sort of measure-theoretic counterpart of the latter. As such they have an integer Hausdorff dimension. In the special case of $1$-dimensional sets of the euclidean space, they were first introduced by Besicovitch, as a suitable generalization of rectifiable curves. In what follows we will use the terminology $m$-dimensional rectifiable set. Some authors prefer the terminology countably $m$-rectifiable set or, briefly, $m$-rectifiable.
Rectifiable subsets of the Euclidean space $\mathbb R^n$ can be defined in several ways, see Rectifiable set. We adopt here the following one
Definition 7 (cp. with Lemma 11.1 of [Si]) A Borel set $E\subset \mathbb R^n$ is a rectifiable subset of dimension $k$ if it has Hausdorff dimension $k$ and there is a countable family of $C^1$ $k$-dimensional submanifolds of $\mathbb R^n$ which cover $\mathcal{H}^k$-almost all $E$.
The assumption that $E$ is a Borel set might be dropped, but in this case the set might not be $\mathcal{H}^k$-measurable (see Rectifiable set). In what follows we will assume that rectifiable sets $E$ are $\mathcal{H}^k$ measurable: $\sigma$-finite $\mathcal{H}^k$-measurable sets can be decomposed into the union of a Borel set and an $\mathcal{H}^k$-null set.
Besicovitch's works
As already mentioned, the theory of rectifiable $1$-dimensional sets was first laid down by Besicovitch in a series of works (see [Be1], [Be2], [Be3]). In these seminal papers Besicovitch considered and solved several questions which became later pivotal for rectifiable sets of higher dimension. He also introduced many useful tools (such as the Besicovitch covering theorem, see Covering theorems (measure theory)) which have been widely used in different contexts.
One-dimensional sets
The theory of one-dimensional rectifiable sets is somewhat special since much stronger theorems can be proved which fail for higher dimensions. Perhaps the most useful one is the following (cp. with Theorem 3.14 of [Fa]):
Theorem 8 A continuum, i.e. a compact connected set, $E\subset\mathbb R^n$ of finite $\mathcal{H}^1$ measure is always rectifiable and arcwise connected. Indeed it is always the image of a rectifiable curve.
We refer to [Fa] for a comprehensive account of the theory of rectifiable one-dimensional sets.
General dimension and codimension
The main importance of the class of rectifiable sets is that it possesses many of the nice properties of the smooth surfaces which one is seeking to generalize. For example, although, in general, classical tangents may not exist, an $m$-rectifiable set will possess a unique approximate tangent at $\mathcal{H}^m$-almost every point (see Rectifiable set).
Besicovitch-Federer projection theorem
Often, one is faced with the task of showing that some set, which is a solution to the problem under investigation, is in fact rectifiable, and hence possesses some smoothness. A major concern in geometric measure theory is finding criteria which guarantee rectifiability, several of these criteria are listed in Rectifiable set. One of the most striking results in this direction is the Besicovitch–Federer projection theorem, which illustrates the stark difference between rectifiable and unrectifiable sets. This theorem characterize purely unrectifiable $m$-dimensional sets as those sets whose projections are $\mathcal{H}^m$-negligible on almost every $m$-dimensional plane (for the precise statement, we refer to Rectifiable set). This deep result was first proved for $1$-dimensional sets in the plane by A.S. Besicovitch, and later extended to higher dimensions by H. Federer. B. White in [Wh] has shown how the higher-dimensional version of this theorem follows via an inductive argument from the planar version.
Recitifiable measures
It is also possible (and useful) to define a notion of rectifiability for (locally finite) Radon measures: A Radon measure $\mu$ is said to be $m$-rectifiable if it is absolutely continuous (cf. also Absolute continuity) with respect to the $m$-dimensional Hausdorff measure and there is an $m$-dimensional rectifiable set $E$ for which $\mu ({\mathbb R}^n\setminus E)=0$. The complementary notion of a measure $\mu$ being purely $m$-unrectifiable is defined by requiring that $\mu$ is singular with respect to all $m$-rectifiable measures (cf. also Mutually-singular measures). Thus, in particular, a Borel set $E$ is $m$-rectifiable if and only if the measure $\mu$ defined by $\mu (A) := \mathcal{H}^m (A\cap E)$ (i.e. the restriction of $\mathcal{H}^m$ to $E$ is $m$-rectifiable); this allows one to study rectifiable sets through $m$-rectifiable measures.
Besicovitch-Marstrand-Preiss theorem
It is common in analysis to construct measures as solutions to equations, and one would like to be able to deduce something about the structure of these measures (for example, that they are rectifiable). Often, the only a priori information available is some limited metric information about the measure, perhaps how the mass of small balls grows with radius (cp. with Density of a set). Probably the strongest known result in this direction is Preiss' density theorem, which generalizes earlier results of Besicovitch and Marstrand. The following theorem summarizes both the deep results of Marstrand and Preiss (cp. with [De]).
Theorem 9 Let $\mu$ be a locally finite Radon measure in the euclidean space $\mathbb R^n$ and $\alpha$ a nonnegative real number. Then the $\alpha$-dimensional density \[ \lim_{r\downarrow 0} \frac{\mu (B_r (x))}{r^\alpha} \] exists, it is finite and positive at $\mu$-a.e. $x\in \mathbb R^n$ if and only $\alpha$ is an integer $k$ and there are a rectifiable $k$-dimensional Borel set $E$ and a Borel function $f: E\to ]0, \infty[$ such that \[ \mu (A) = \int_{A\cap E} f\, d\mathcal{H}^k\qquad \mbox{for any Borel } A\subset \mathbb R^n\, . \]
Tangent measures
Preiss' main tool in proving that the existence of a density implies the rectifiability of the measure was the notion of tangent measure. A non-zero Radon measure $\nu$ is a tangent measure of $\mu$ at $x$ if there are sequences $r_i\downarrow 0$ and $c_i$ such that, for all continuous real-valued functions $\phi$ with compact support, \[ \lim_{i\to\infty} c_i \int \phi \left(\frac{y-x}{r_i}\right)\, d\mu (y) = \int \phi (y)\, d\nu (y)\, . \] Thus, an $m$-rectifiable measure will, for almost-every point, have tangent measures which are multiples of $m$-dimensional Hausdorff measure restricted to the approximate tangent plane at that point (cp. with Rectifiable set); for unrectifiable measures, the set of tangent measures will usually be much richer (see [ON]). The utility of the notion lies in the fact that tangent measures often possess more regularity than the original measure, thus allowing a wider range of analytical techniques to be used upon them.
Caccioppoli sets
A possible (and quite common) definition of perimeter of a measurable set $E\subset \mathbb R^n$ is \[ {\rm Per} (E) := \inf \left\{ \liminf_k\; \mathcal{H}^{n-1} (\partial E_k):\;\{E_k\} \mbox{ is a sequence of smooth sets with } \lambda (E\bigtriangleup E_k) \to 0\right\}\, , \] where $\lambda$ denotes the Lebesgue measure. Measurable sets $E$ such that ${\rm Per} (E) < \infty$ are called sets of finite perimeter or Caccioppoli sets. A localized notion is also possible: if $\Omega$ is an open set, it customary to define ${\rm Per} (E, \Omega)$ by replacing $\mathcal{H}^{n-1} (\partial E_k)$ with $\mathcal{H}^{n-1} ((\partial E_k)\cap \Omega)$ in the formula above.
This definition is in the spirit of the original work of Caccioppoli where the approximating sets instead of being smooth were required to be polytopes (cp. with [Ca]). It was a fundamental discovery of De Giorgi that Caccioppoli's Perimeter has indeed both a functional and measure-theoretic interpretation: the functional interpretation, given below, is indeed taken as definition by most authors, whereas the above characterization of the perimeter is then conclude. The theory of Caccioppoli set was first set forth by De Giorgi to solve the Plateau's problem in codimension 1 and study the isoperimetric problem.
Functions of bounded variation
If $E$ is a measurable set, then $E$ is a Caccioppoli set if and only if the indicator function \[ {\bf 1}_E (x):= \left\{ \begin{array}{ll} 1 \quad \mbox{if } x\in E\\ 0 \quad \mbox{otherwise} \end{array} \right. \] has finite variation $V ({\bf 1}_E, \Omega)$. It then turns out that \[ {\rm Per}\, (E, \Omega) = V ({\bf 1}_E, \Omega)\, . \] If in addition the Lebesgue measure of $E$ is finite, ${\bf 1}_E$ is a function of bounded variation.
If $E\subset \Omega$ has a $C^1$ topological boundary $\partial E$ with $\mathcal{H}^{n-1} ((\partial E)\cap\Omega) < \infty$, then it is a Caccioppoli set and if we denote by $\nu$ the exterior unit normal field at $\partial E$, the divergence theorem implies \begin{equation}\label{e:divergenza1} \int {\bf 1}_E\, {\rm div}\, \varphi\, d\lambda = - \int_E {\rm div}\, \varphi\, d\lambda = \int_{\partial E} \varphi\cdot \nu\, d\mathcal{H}^{n-1}\qquad \forall \varphi\in C^1_c (\Omega,\mathbb R^n)\, . \end{equation} Thus $V ({\bf 1}_E, \Omega) = \mathcal{H}^{n-1} ((\partial E)\cap\Omega)$ and hence ${\bf 1}_E\in BV_{loc} (\Omega)$ (for having ${\bf 1}_E\in BV (\Omega)$ we need the additional condition $\lambda (E)<\infty$). In particular, if we introduce the vector measure \[ \mu (A) := - \int_{A\cap E} \nu\, d\mathcal{H}^{n-1}\, , \] \eqref{e:divergenza1} is then simply the identity $D{\bf 1}_E =\mu$ in the sense of distributions.
For general Caccioppoli sets, it is possible to identify an appropriate notion of measure-theoretic boundary, which is rectifiable and whose Hausdorff measure coincides with the perimeter. A corresponding generalization of the divergence theorem holds. See the section Reduced boundary and structure theorem of Function of bounded variation for more details.
Plateau's problem in codimension 1
The Caccioppoli sets were first used by De Giorgi to formulate the Plateau's problem in codimension $1$ in the following fashion. Consider two smooth open sets $\Omega, U \subset \mathbb R^n$ such that $\partial U$ and $\partial \Omega$ intersect transversally in a smooth $(n-2)$-dimensional submanifold $\Sigma$.
Definition 10 A genealized solution of the Plateau problem in $U$ relative to the boundary $\Sigma$ is a Caccioppoli set $E\subset \mathbb R^n$ such that $E\setminus U = \Omega\setminus U$ and has least perimeter among all such sets.
Standard compactness properties of the space of functions of bounded variation leads then to the following fundamental existence theorem.
Theorem 11 There is a generalized solution as defined above, namely the infimum of ${\rm Per}\, (E)$ among all Caccioppoli sets $E$ with $E\setminus U = \Omega\setminus U$ is attained by some set $F$.
Regularity theory
Bernstein's problem
Simons' cone
De Giorgi's $\varepsilon$-regularity theorem
Simons' inequality and solution of the Bernstein's problem
Stable surfaces
Federer's estimate of the singular set
Simon's rectifiability theorem
Mumford Shah conjecture
Currents
Federer-Fleming theory
Compactness for integral currents
Deformation theorem
Plateau's problem in any codimension
Regularity theory
Almgren's $\varepsilon$-regularity theorem
Almgren's big regularity paper
Currents in metric spaces
Varifolds
General theory
Rectifiable and integral varifolds
Regularity theory
Allard's rectifiability theorem
Allard's $\varepsilon$-regularity theorem
Calculus of variations in the large
Pitts' theory
Schoen-Simon curvature estimates
The Willmore conjecture
Smith's theorem and generalizations
Applications to topology
Uniqueness of tangent cones
White's theorem
Simon's theorem
Lojasievicz inequality
Soap films
Almgren's $\varepsilon-\delta$ minimal sets
Taylor's theorem
Double-bubble conjecture
Notable applications
References
[Be1] | A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (I). Math. Ann. Vol. 98 (1927), pp. 422-464. |
[Be2] | A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (II). Math. Ann. Vol. 115 (1938), pp. 296-329. |
[Be3] | A. S. Besicovitch, On the fundamental properties of linearly measurable plane sets of points (III). Math. Ann. Vol. 116 (1939), pp. 349-357. |
[Be4] | A. S. Besicovitch, A general form of the covering principle and relative differentiation of additive functions (I) Proc. Cambridge Phil. Soc. Vol. 41 (1945), pp. 103-110. |
[Be4] | A. S. Besicovitch, A general form of the covering principle and relative differentiation of additive functions (II) Proc. Cambridge Phil. Soc. Vol. 42 (1946), pp. 1-10. |
[Ca] | R. Caccioppoli, "Misura e integrazione sugli insiemei dimensionalmente orientati I, II", Rend. Acc. Naz. Lincei (8), {\bf 12} (1952) pp. 3-11 and 137-146. |
[De] | C. De Lellis, "Rectifiable sets, densities and tangent measures" Zurich Lectures in Advanced Mathematics. European Mathematical Society (EMS), Zürich, 2008. MR2388959 Zbl 1183.28006 |
[EG] | L.C. Evans, R.F. Gariepy, "Measure theory and fine properties of functions" Studies in Advanced Mathematics. CRC Press, Boca Raton, FL, 1992. MR1158660 Zbl 0804.2800 |
[Fa] | K. J. Falconer. "The geometry of fractal sets". Cambridge Tracts in Mathematics, 85. Cambridge University Press, Cambridge, 1986. MR0867284 Zbl 0587.28004 |
[Fa2] | K. J. Falconer. "Fractal Geometry: Mathematical Foundations and Applications". John Wiley & Sons, 2003. |
[Fe] | H. Federer, "Geometric measure theory". Volume 153 of Die Grundlehren der mathematischen Wissenschaften. Springer-Verlag New York Inc., New York, 1969. MR0257325 Zbl 0874.49001 |
[Ha] | F. Hausdorff, "Dimension and äusseres Mass" Math. Ann. , 79 (1918) pp. 157–179 MR1511917 |
[KP] | S. G. Krantz, H. Parks, "Geometric Integration Theory", Birkhäuser (2008). |
[Ma] | P. Mattila, "Geometry of sets and measures in Euclidean spaces. Fractals and rectifiability". Cambridge Studies in Advanced Mathematics, 44. Cambridge University Press, Cambridge, 1995. MR1333890 Zbl 0911.28005 |
[Mu] | M. E. Munroe, "Introduction to Measure and Integration". Addison Wesley (1953). |
[Wh] | B. White, "A new proof of Federer's structure theorem for $k$-dimensional subsets of $\mathbb R^n$ J. Amer. Math. Soc. , 11 : 3 (1998) pp. 693–701 |
Camillo.delellis/sandbox. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Camillo.delellis/sandbox&oldid=28061