In mathematics, a positive (or signed) measure μ defined on a σ-algebra Σ of subsets of a set X is called a finite measure if μ(X) is a finite real number (rather than ∞). A set A in Σ is of finite measure if μ(A) < ∞. The measure μ is called σ-finite if X is a countable union of measurable sets each with finite measure. A set in a measure space is said to have σ-finite measure if it is a countable union of measurable sets with finite measure. A measure being σ-finite is a weaker condition than being finite, i.e. all finite measures are σ-finite but there are (many) σ-finite measures that are not finite.
A different but related notion that should not be confused with σ-finiteness is s-finiteness.
Let
(X,l{A})
\mu
The measure
\mu
X
A1,A2,\ldots\inlA
\mu\left(An\right)<infty
n\in\N
cupnAn=X
X
B1,B2,\ldots\inlA
\mu\left(Bn\right)<infty
n\in\N
Bi\capBj=\varnothing
i ≠ j
cupnBn=X
X
C1,C2,\ldots\inl{A}
C1\subsetC2\subset …
\mu\left(Cn\right)<infty
n\in\N
cupnCn=X
f
f(x)>0
x\inX
\intf(x)\mu(dx)<infty
If
\mu
\sigma
(X,l{A},\mu)
\sigma
For example, Lebesgue measure on the real numbers is not finite, but it is σ-finite. Indeed, consider the intervals for all integers ; there are countably many such intervals, each has measure 1, and their union is the entire real line.
Alternatively, consider the real numbers with the counting measure; the measure of any finite set is the number of elements in the set, and the measure of any infinite set is infinity. This measure is not σ-finite, because every set with finite measure contains only finitely many points, and it would take uncountably many such sets to cover the entire real line. But, the set of natural numbers
N
Locally compact groups which are σ-compact are σ-finite under the Haar measure. For example, all connected, locally compact groups G are σ-compact. To see this, let V be a relatively compact, symmetric (that is V = V-1) open neighborhood of the identity. Then
H=cupnVn
is an open subgroup of G. Therefore H is also closed since its complement is a union of open sets and by connectivity of G, must be G itself. Thus all connected Lie groups are σ-finite under Haar measure.
Any non-trivial measure taking only the two values 0 and
infty
\R
A\subset\R
\mu(A)=infty
A\subset\R
\mu(A)=infty
The class of σ-finite measures has some very convenient properties; σ-finiteness can be compared in this respect to separability of topological spaces. Some theorems in analysis require σ-finiteness as a hypothesis. Usually, both the Radon–Nikodym theorem and Fubini's theorem are stated under an assumption of σ-finiteness on the measures involved. However, as shown by Irving Segal,[1] they require only a weaker condition, namely localisability.
Though measures which are not σ-finite are sometimes regarded as pathological, they do in fact occur quite naturally. For instance, if X is a metric space of Hausdorff dimension r, then all lower-dimensional Hausdorff measures are non-σ-finite if considered as measures on X.
Any σ-finite measure μ on a space X is equivalent to a probability measure on X: let Vn, n ∈ N, be a covering of X by pairwise disjoint measurable sets of finite μ-measure, and let wn, n ∈ N, be a sequence of positive numbers (weights) such that
| infty | |
| \sum | |
| n=1 |
wn=1.
The measure ν defined by
\nu(A)=
| infty | |
| \sum | |
| n=1 |
wn
| \mu\left(A\capVn\right) | |
| \mu\left(Vn\right) |
is then a probability measure on X with precisely the same null sets as μ.
A Borel measure (in the sense of a locally finite measure on the Borel
\sigma
\mu
A1,A2,\ldots
\mu\left(Ai\right)<infty
i
| infty | |
| cup | |
| i=1 |
Ai=X
Every moderate measure is a
\sigma
A measure is called a decomposable measure there are disjoint measurable sets
\left(Ai\right)i
\mu\left(Ai\right)<infty
i\inI
cupiAi=X
Every
\sigma
A measure
\mu
Every σ-finite measure is s-finite, the converse is not true. For a proof and counterexample see s-finite measure#Relation to σ-finite measures.