The zero-dimensional Hausdorff measure is the number of points in the set (if the set is finite) or ∞ if the set is infinite. Likewise, the one-dimensional Hausdorff measure of a simple curve in is equal to the length of the curve, and the two-dimensional Hausdorff measure of a Lebesgue-measurable subset of is proportional to the area of the set. Thus, the concept of the Hausdorff measure generalizes the Lebesgue measure and its notions of counting, length, and area. It also generalizes volume. In fact, there are d-dimensional Hausdorff measures for any d ≥ 0, which is not necessarily an integer. These measures are fundamental in geometric measure theory. They appear naturally in harmonic analysis or potential theory.
Definition
Let be a metric space. For any subset , let denote its diameter, that is
Let be any subset of and a real number. Define
where the infimum is over all countable covers of by sets satisfying .
Note that is monotone nonincreasing in since the larger is, the more collections of sets are permitted, making the infimum not larger. Thus, exists but may be infinite. Let
In the above definition the sets in the covering are arbitrary. However, we can require the covering sets to be open or closed, or in normed spaces even convex, that will yield the same numbers, hence the same measure. In restricting the covering sets to be balls may change the measures but does not change the dimension of the measured sets.
Properties of Hausdorff measures
Note that if d is a positive integer, the d-dimensional Hausdorff measure of is a rescaling of the usual d-dimensional Lebesgue measure, which is normalized so that the Lebesgue measure of the unit cube [0,1]d is 1. In fact, for any Borel set E,
Remark. Some authors adopt a definition of Hausdorff measure slightly different from the one chosen here, the difference being that the value defined above is multiplied by the factor , so that Hausdorff d-dimensional measure coincides exactly with Lebesgue measure in the case of Euclidean space.
It turns out that may have a finite, nonzero value for at most one . That is, the Hausdorff Measure is zero for any value above a certain dimension and infinity below a certain dimension, analogous to the idea that the area of a line is zero and the length of a 2D shape is in some sense infinity. This leads to one of several possible equivalent definitions of the Hausdorff dimension:
where we take
and
.
Note that it is not guaranteed that the Hausdorff measure must be finite and nonzero for some d, and indeed the measure at the Hausdorff dimension may still be zero; in this case, the Hausdorff dimension still acts as a change point between measures of zero and infinity.
Generalizations
In geometric measure theory and related fields, the Minkowski content is often used to measure the size of a subset of a metric measure space. For suitable domains in Euclidean space, the two notions of size coincide, up to overall normalizations depending on conventions. More precisely, a subset of is said to be -rectifiable if it is the image of a bounded set in under a Lipschitz function. If , then the -dimensional Minkowski content of a closed -rectifiable subset of is equal to times the -dimensional Hausdorff measure (Federer 1969, Theorem 3.2.29).
In fractal geometry, some fractals with Hausdorff dimension have zero or infinite -dimensional Hausdorff measure. For example, almost surely the image of planar Brownian motion has Hausdorff dimension 2 and its two-dimensional Hausdorff measure is zero. In order to "measure" the "size" of such sets, the following variation on the notion of the Hausdorff measure can be considered:
In the definition of the measure is replaced with where is any monotone increasing set function satisfying
This is the Hausdorff measure of with gauge function or -Hausdorff measure. A -dimensional set may satisfy but with an appropriate Examples of gauge functions include
The former gives almost surely positive and -finite measure to the Brownian path in when , and the latter when .