Bierlein's measure extension theorem

Bierlein's measure extension theorem is a result from measure theory and probability theory on extensions of probability measures. The theorem makes a stament about when one can extend a probability measure to a larger σ-algebra. It is of particular interest for infinite dimensional spaces.

The theorem is named after the German mathematician Dietrich Bierlein, who proved the statement for countable families in 1962.^[1] The general case was shown by Albert Ascherl and Jürgen Lehn in 1977.^[2]

A measure extension theorem of Bierlein edit

Let $(X,{\mathcal {A}},\mu )$ be a probability space and ${\mathcal {S}}\subset {\mathcal {P}}(X)$ be a σ-algebra, then in general $\mu$ can not be extended to $\sigma ({\mathcal {A}}\cup {\mathcal {S}})$ . For instance when ${\mathcal {S}}$ is countably infinite, this is not always possible. Bierlein's extension theorem says, that it is always possible for disjoint families.

Statement of the theorem edit

Bierlein's measure extension theorem is

Let $(X,{\mathcal {A}},\mu )$ be a probability space, $I$ an arbitrary index set and $(A_{i})_{i\in I}$ a family of disjoint sets from $X$ . Then there exists a extension $\nu$ of $\mu$ on $\sigma ({\mathcal {A}}\cup \{A_{i}\colon i\in I\})$ .

Related results and generalizations edit

Bierlein gave a result which stated an implication for uniqueness of the extension.^[1] Ascherl and Lehn gave a condition for equivalence.^[2]

Zbigniew Lipecki proved in 1979 a variant of the statement for group-valued measures (i.e. for "topological hausdorff group"-valued measures).^[3]

References edit

^ ^a ^b Bierlein, Dietrich (1962). "Über die Fortsetzung von Wahrscheinlichkeitsfeldern". Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete. 1 (1): 28–46. doi:10.1007/BF00531770.
^ ^a ^b Ascherl, Albert; Lehn, Jürgen (1977). "Two principles for extending probability measures". Manuscripta Math. 21 (21): 43–50. doi:10.1007/BF01176900.
^ Lipecki, Zbigniew (1980). "A generalization of an extension theorem of Bierlein to group-valued measures". Bulletin Polish Acad. Sci. Math. 28: 441–445.

[db-1] Bierlein, Dietrich (1962). "Über die Fortsetzung von Wahrscheinlichkeitsfeldern". Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete. 1 (1): 28–46. doi:10.1007/BF00531770.

[al-2] Ascherl, Albert; Lehn, Jürgen (1977). "Two principles for extending probability measures". Manuscripta Math. 21 (21): 43–50. doi:10.1007/BF01176900.

[3] Lipecki, Zbigniew (1980). "A generalization of an extension theorem of Bierlein to group-valued measures". Bulletin Polish Acad. Sci. Math. 28: 441–445.

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