Difference between revisions of "Hausdorff measure"
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===Generalizations=== | ===Generalizations=== | ||
− | The definition of the Hausdorff measures is just a special case of a more general construction due to Caratheodory, which starting from a generic (nonnegative) [[Set function|set function]] $\nu$ with $\nu (\emptyset) =0$ builds an outer measure $\mu$ (we refer to [[Outer measure]] for a decription of Caratheodory's method). A generalization of the usual Hausdorff measures replaces $ | + | The definition of the Hausdorff measures is just a special case of a more general construction due to Caratheodory, which starting from a generic (nonnegative) [[Set function|set function]] $\nu$ with $\nu (\emptyset) =0$ builds an outer measure $\mu$ (we refer to [[Outer measure]] for a decription of Caratheodory's method). A generalization of the usual Hausdorff measures replaces $\omega_\alpha ({\rm diam}\, (E_i))^\alpha$ in \ref{e:hausdorff_m} with $h ({\rm diam}\, (E_i))$, where $h: \mathbb R^+\to \mathbb R^+$ is a nondecreasing function (often called ''gauge function''). See for instance {{Cite|Ma}}. |
The construction of Caratheodory allows for several other outer measures in the Euclidean space, most of which coincide with the Hausdorff $k$-dimensional measures for $C^1$ submanifolds when $k$ is an integer, but differ on general sets. One example is the [[Favard measure]], also called integralgeometric measure. See {{Cite|Fe}} and {{Cite|KP}}. | The construction of Caratheodory allows for several other outer measures in the Euclidean space, most of which coincide with the Hausdorff $k$-dimensional measures for $C^1$ submanifolds when $k$ is an integer, but differ on general sets. One example is the [[Favard measure]], also called integralgeometric measure. See {{Cite|Fe}} and {{Cite|KP}}. | ||
− | In | + | In some common generalizations of the Hausdorff measures one restricts the class of admissible coverings in \ref{e:hausdorff_m}. For instance one can use coverings by balls (and the resulting outer measure is then called ''spherical Hausdorff measure'') or by cylinders (''cylindrical Hausdorff measure''). |
==Measure-theoretic properties== | ==Measure-theoretic properties== | ||
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If $E\subset X$ is $\mathcal{H}^\alpha$ measurable and $\mathcal{H}^\alpha (E)<\infty$, then the measure | If $E\subset X$ is $\mathcal{H}^\alpha$ measurable and $\mathcal{H}^\alpha (E)<\infty$, then the measure | ||
\[ | \[ | ||
− | \mu (A) := \mathcal{H}^\alpha (A\cap E) \qquad \mbox{for | + | \mu (A) := \mathcal{H}^\alpha (A\cap E) \qquad \mbox{for } A\subset X \;\, \mathcal{H}^\alpha\text{-measurable} |
\] | \] | ||
− | is a [[Radon measure]] (see p. 57 of {{Cite|Ma}}). | + | is a [[Radon measure]] (see p. 57 of {{Cite|Ma}}). |
==$\mathcal{H}^n$ for $n$ integer== | ==$\mathcal{H}^n$ for $n$ integer== | ||
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===$n$-dimensional volume=== | ===$n$-dimensional volume=== | ||
− | On the euclidean space $\mathbb R^n$ $\mathcal{H}^n$ coincides with the [[Lebesgue measure|Lebesgue outer measure]] (see Theorem 2 in Section 2.2 of {{Cite|EG}}. More generally, in a Riemannian manifold of dimension $n$, $\mathcal{H}^n$ coincides with the standard volume | + | On the euclidean space $\mathbb R^n$ $\mathcal{H}^n$ coincides with the [[Lebesgue measure|Lebesgue outer measure]] (see Theorem 2 in Section 2.2 of {{Cite|EG}}). More generally, in a Riemannian manifold $M$ of dimension $n$, $\mathcal{H}^n$ coincides with the standard volume. Thus, If $\Sigma$ is a $C^1$ submanifold of $\mathbb R^N$ of dimension $n$, then $\mathcal{H}^n (\Gamma)$ is the usual $n$-dimensional volume of $\Gamma$. In this case a useful tool to compute the Hausdorff measure is the [[Area formula]]. |
====Rectifiable sets==== | ====Rectifiable sets==== | ||
− | For several applications, the class of Borel sets of $\mathbb R^N$ with finite $\mathcal{H}^n$ measure is too large to be an appropriate generalization of smooth $n$-dimensional surfaces. An intermediate class which has wide applications is that of [[Rectifiable set|rectifiable sets]]. | + | For several applications, the class of Borel sets of $\mathbb R^N$ with finite $\mathcal{H}^n$ measure is too large to be an appropriate generalization of smooth $n$-dimensional surfaces. An intermediate class which has wide applications is that of [[Rectifiable set|rectifiable sets]]. |
==Relations to density== | ==Relations to density== | ||
− | Especially in the euclidean space there is a strong link between various concepts of ''densities'' of measures and sets and the Hausdorff measures (see [[Density of a set]]). This relation, pioneered by Besicovitch and his school (cf. {{Cite|Ro}}), plays a fundamental role in [[Geometric measure theory]] (see for instance {{Cite|Fe}}, {{Cite|KP}} or {{Cite|Si}}. | + | Especially in the euclidean space there is a strong link between various concepts of ''densities'' of measures and sets and the Hausdorff measures (see [[Density of a set]]). This relation, pioneered by Besicovitch and his school (cf. {{Cite|Ro}}), plays a fundamental role in [[Geometric measure theory]] (see for instance {{Cite|Fe}}, {{Cite|KP}} or {{Cite|Si}}). |
==Relevance== | ==Relevance== |
Latest revision as of 09:43, 16 August 2013
2020 Mathematics Subject Classification: Primary: 28A [MSN][ZBL]
Definition
The term Hausdorff measures is used for a class of outer measures (introduced for the first time by Hausdorff in [Ha]) on subsets of a generic metric space $(X,d)$, or for their restrictions to the corresponding measurable sets.
Let $(X,d)$ be a metric space. In what follows, for any subset $E\subset X$, ${\rm diam}\, (E)$ will denote the diameter of $E$.
Definition 1 For any $E\subset X$, any $\delta \in ]0, \infty]$ and any $\alpha\in [0, \infty[$ we consider the outer measure \begin{equation}\label{e:hausdorff_m} \mathcal{H}^\alpha_\delta (E) := \omega_\alpha \inf \left\{ \sum_{i=1}^\infty ({\rm diam}\, E_i)^\alpha : E\subset \bigcup_i E_i \quad\mbox{and}\quad {\rm diam}\, (E_i) < \delta\right\}\, , \end{equation} where $\omega_\alpha$ is a positive factor (see below for the precise definition).
The $\mathcal{H}^\alpha_\delta$ defined above are outer measures and they are called Hausdorff premeasures by some authors. Moreover, in \eqref{e:hausdorff_m} the infimum can be taken over open coverings or closed coverings without changing the result.
The map $\delta\mapsto \mathcal{H}^\alpha_\delta (E)$ is monotone nonincreasing and thus we can define the Hausdorff $\alpha$-dimensional measure (or Hausdorff $\alpha$-dimensional outer measure) of $E$ as \[ \mathcal{H}^\alpha (E) := \lim_{\delta\downarrow 0} \mathcal{H}^\alpha_\delta (E)\, . \]
Remark 2 The normalization constant $\omega_\alpha$ is equal to \[ \omega_\alpha = \frac{\pi^{\alpha/2}}{\Gamma \left(\frac{\alpha}{2}+1\right)}\, \] (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. However some authors set $\omega_\alpha =1$ (see for instance [Ma]).
Hausdorff dimension
The following is a simple consequence of the definition (cp. with Theorem 4.7 of [Ma]).
Theorem 3 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 4 \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*}
Generalizations
The definition of the Hausdorff measures is just a special case of a more general construction due to Caratheodory, which starting from a generic (nonnegative) set function $\nu$ with $\nu (\emptyset) =0$ builds an outer measure $\mu$ (we refer to Outer measure for a decription of Caratheodory's method). A generalization of the usual Hausdorff measures replaces $\omega_\alpha ({\rm diam}\, (E_i))^\alpha$ in \ref{e:hausdorff_m} with $h ({\rm diam}\, (E_i))$, where $h: \mathbb R^+\to \mathbb R^+$ is a nondecreasing function (often called gauge function). See for instance [Ma].
The construction of Caratheodory allows for several other outer measures in the Euclidean space, most of which coincide with the Hausdorff $k$-dimensional measures for $C^1$ submanifolds when $k$ is an integer, but differ on general sets. One example is the Favard measure, also called integralgeometric measure. See [Fe] and [KP].
In some common generalizations of the Hausdorff measures one restricts the class of admissible coverings in \ref{e:hausdorff_m}. For instance one can use coverings by balls (and the resulting outer measure is then called spherical Hausdorff measure) or by cylinders (cylindrical Hausdorff measure).
Measure-theoretic properties
The Hausdorff measures $\mathcal{H}^\alpha$ satisfy Caratheodory's criterion. Therefore, the $\sigma$-algebra of $\mathcal{H}^\alpha$-measurable sets (see Outer measure for the definition) contains the Borel sets (i.e. $\mathcal{H}^\alpha$ is a Borel outer measure). The Hausdorff measures are also Borel regular, in the sense that, for any set $A\subset X$ there is a Borel set $B\supset A$ with $\mathcal{H}^\alpha (B) = \mathcal{H}^\alpha (A)$ (see Corollary 4.5 in [Ma]).
Remark 5 The premeasures $\mathcal{H}^\alpha_\delta$ do not satisfy Caratheodory's criterion and, moreover, they are not necessarily Borel outer measures: this property fails already in the Euclidean spaces (see [Si]).
If $E\subset X$ is $\mathcal{H}^\alpha$ measurable and $\mathcal{H}^\alpha (E)<\infty$, then the measure \[ \mu (A) := \mathcal{H}^\alpha (A\cap E) \qquad \mbox{for } A\subset X \;\, \mathcal{H}^\alpha\text{-measurable} \] is a Radon measure (see p. 57 of [Ma]).
$\mathcal{H}^n$ for $n$ integer
For $n$ integer the Hausdorff measures are suitable measure-theoretic generalizations of the concept of $n$-dimensional volume of a smooth Riemannian manifold.
The counting measure
In any metric space $(X,d)$ and for any set $E\subset X$, $\mathcal{H}^0 (E)$ equals the cardinality of $E$ if $E$ is a finite set and it equals infinity if not. $\mathcal{H}^0$ is called, therefore, the counting measure.
Length
In any metric space $(X,d)$, if $\gamma: [0,1]\to X$ is an injective Lipschitz function, then $\mathcal{H}^1 (\gamma ([0,1])$ is the length of the curve (see Rectifiable curve for the relevant definition).
$n$-dimensional volume
On the euclidean space $\mathbb R^n$ $\mathcal{H}^n$ coincides with the Lebesgue outer measure (see Theorem 2 in Section 2.2 of [EG]). More generally, in a Riemannian manifold $M$ of dimension $n$, $\mathcal{H}^n$ coincides with the standard volume. Thus, If $\Sigma$ is a $C^1$ submanifold of $\mathbb R^N$ of dimension $n$, then $\mathcal{H}^n (\Gamma)$ is the usual $n$-dimensional volume of $\Gamma$. In this case a useful tool to compute the Hausdorff measure is the Area formula.
Rectifiable sets
For several applications, the class of Borel sets of $\mathbb R^N$ with finite $\mathcal{H}^n$ measure is too large to be an appropriate generalization of smooth $n$-dimensional surfaces. An intermediate class which has wide applications is that of rectifiable sets.
Relations to density
Especially in the euclidean space there is a strong link between various concepts of densities of measures and sets and the Hausdorff measures (see Density of a set). This relation, pioneered by Besicovitch and his school (cf. [Ro]), plays a fundamental role in Geometric measure theory (see for instance [Fe], [KP] or [Si]).
Relevance
Hausdorff measures play an important role in several areas of mathematics
- They are fundamental in Geometric measure theory, especially in the solution of the Plateau problem (see also Minimal surface).
- They are a fundamental notion in the theory of fractals, see [Fa].
- In the theory of stochastic processes they have a crucial role in the fine study of the paths of the Wiener process and others (cf. [lG]).
Through the study of exceptional sets they are widely used in
- Harmonic analysis (see for instance [KS])
- Potential theory (see for instance [Ca]; Hausdorff measures are closely linked to capacities, cp. with [De]).
- The metric theory of continued fractions (cf. with [Ro]).
- In complex analysis (cp. with Painleve problem and [Ch]).
- In partial differential equations and differential geometry.
References
[Ca] | L. Carleson, "Selected problems on exceptional sets" , v. Nostrand (1967) MR0225986 Zbl 0189.10903 |
[Ch] | E.M. Chirka, "Complex analytic sets" , Kluwer (1989) (Translated from Russian) MR1111477 Zbl 0683.32002 |
[De] | C. Dellacherie, "Ensembles analytiques, capacités, mesures de Hausdorff" , Lect. notes in math. , 295 , Springer (1972) MR0492152 Zbl 0259.31001 |
[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 Univ. Press (1985) MR0867284 Zbl 0587.28004 |
[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 |
[HW] | W. Hurevicz, G. Wallman, "Dimension theory" , Princeton Univ. Press (1948) |
[KP] | S. G. Krantz, H. Parks, "Geometric Integration Theory", Birkhäuser (2008). |
[KS] | J.-P. Kahane, R. Salem, "Ensembles parfaits et séries trigonométriques" , Hermann (1963) pp. 142 MR0160065 Zbl 0112.29304 |
[lG] | J.-F. le Gall, "Temps locaux d'intersection et points multiples des processus de Lévy" , Sem. Probab. XXI , Lect. notes in math. , 1247 , Springer (1987) pp. 341–374 Zbl 0621.60077 |
[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). MR1528565 MR0053186 Zbl 0050.05603 |
[Ro] | C.A. Rogers, "Hausdorff measures" , Cambridge Univ. Press (1970) MR0281862 Zbl 0204.37601 |
[Si] | L. Simon, "Lectures on geometric measure theory" , Proc. Centre Math. Anal. Austral. National Univ. , Centre Math. Anal. 3 Austral. National Univ., Canberra (1983) MR0756417 Zbl 0546.49019 |
Hausdorff measure. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hausdorff_measure&oldid=29156