mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

, a regular measure on a

topological space In mathematics, a topological space is, roughly speaking, a geometrical space in which closeness is defined but cannot necessarily be measured by a numeric distance. More specifically, a topological space is a set whose elements are called poin ...

is a measure for which every measurable set can be approximated from above by open measurable sets and from below by compact measurable sets.

Definition

Let (''X'', ''T'') be a topological space and let Σ be a σ-algebra on ''X''. Let ''μ'' be a measure on (''X'', Σ). A measurable subset ''A'' of ''X'' is said to be inner regular if :

\mu (A) = \sup \

and said to be outer regular if :

\mu (A) = \inf \

*A measure is called inner regular if every measurable set is inner regular. Some authors use a different definition: a measure is called inner regular if every open measurable set is inner regular. *A measure is called outer regular if every measurable set is outer regular. *A measure is called regular if it is outer regular and inner regular.

Examples

Regular measures

Lebesgue measure In measure theory, a branch of mathematics, the Lebesgue measure, named after French mathematician Henri Lebesgue, is the standard way of assigning a measure to subsets of ''n''-dimensional Euclidean space. For ''n'' = 1, 2, or 3, it coincides wi ...

on the

real line In elementary mathematics, a number line is a picture of a graduated straight line that serves as visual representation of the real numbers. Every point of a number line is assumed to correspond to a real number, and every real number to a po ...

is a regular measure: see the regularity theorem for Lebesgue measure. * Any Baire

probability measure In mathematics, a probability measure is a real-valued function defined on a set of events in a probability space that satisfies measure properties such as ''countable additivity''. The difference between a probability measure and the more ge ...

on any

locally compact In topology and related branches of mathematics, a topological space is called locally compact if, roughly speaking, each small portion of the space looks like a small portion of a compact space. More precisely, it is a topological space in which ev ...

σ-compact Hausdorff space is a regular measure. *Any Borel probability measure on a locally compact Hausdorff space with a countable base for its topology, or compact metric space, or

Radon space In the mathematical discipline of general topology, a Polish space is a separable completely metrizable topological space; that is, a space homeomorphic to a complete metric space that has a countable dense subset. Polish spaces are so named bec ...

, is regular.

Inner regular measures that are not outer regular

* An example of a measure on the real line with its usual topology that is not outer regular is the measure ''μ'' where

\mu(\emptyset) = 0

\mu\left( \\right) = 0\,\,

, and

\mu(A) = \infty\,\,

for any other set

A

. *The Borel measure on the plane that assigns to any Borel set the sum of the (1-dimensional) measures of its horizontal sections is inner regular but not outer regular, as every non-empty open set has infinite measure. A variation of this example is a disjoint union of an uncountable number of copies of the real line with Lebesgue measure. *An example of a Borel measure μ on a locally compact Hausdorff space that is inner regular, σ-finite, and locally finite but not outer regular is given by as follows. The topological space ''X'' has as underlying set the subset of the real plane given by the ''y''-axis of points (0,''y'') together with the points (1/''n'',''m''/''n''²) with ''m'',''n'' positive integers. The topology is given as follows. The single points (1/''n'',''m''/''n''²) are all open sets. A base of neighborhoods of the point (0,''y'') is given by wedges consisting of all points in ''X'' of the form (''u'',''v'') with , ''v'' − ''y'', ≤ , ''u'', ≤ 1/''n'' for a positive integer ''n''. This space ''X'' is locally compact. The measure μ is given by letting the ''y''-axis have measure 0 and letting the point (1/''n'',''m''/''n''²) have measure 1/''n''³. This measure is inner regular and locally finite, but is not outer regular as any open set containing the ''y''-axis has measure infinity.

Outer regular measures that are not inner regular

*If ''μ'' is the inner regular measure in the previous example, and ''M'' is the measure given by ''M''(''S'') = inf_{''U''⊇''S''} ''μ''(''U'') where the inf is taken over all open sets containing the Borel set ''S'', then ''M'' is an outer regular locally finite Borel measure on a locally compact Hausdorff space that is not inner regular in the strong sense, though all open sets are inner regular so it is inner regular in the weak sense. The measures ''M'' and ''μ'' coincide on all open sets, all compact sets, and all sets on which ''M'' has finite measure. The ''y''-axis has infinite ''M''-measure though all compact subsets of it have measure 0. *A measurable cardinal with the discrete topology has a Borel probability measure such that every compact subset has measure 0, so this measure is outer regular but not inner regular. The existence of measurable cardinals cannot be proved in ZF set theory but (as of 2013) is thought to be consistent with it.

Measures that are neither inner nor outer regular

*The space of all ordinals at most equal to the first uncountable ordinal Ω, with the topology generated by open intervals, is a compact Hausdorff space. The measure that assigns measure 1 to Borel sets containing an unbounded closed subset of the countable ordinals and assigns 0 to other Borel sets is a Borel probability measure that is neither inner regular nor outer regular.

References

* * (See chapter 2) * {{Measure theory Measures (measure theory)