Doob–Dynkin lemma

In probability theory, the Doob–Dynkin lemma, named after Joseph L. Doob and Eugene Dynkin, characterizes the situation when one random variable is a function of another by the inclusion of the $\sigma$ -algebras generated by the random variables. The usual statement of the lemma is formulated in terms of one random variable being measurable with respect to the $\sigma$ -algebra generated by the other.

The lemma plays an important role in the conditional expectation in probability theory, where it allows replacement of the conditioning on a random variable by conditioning on the $\sigma$ -algebra that is generated by the random variable.

Notations and introductory remarks

In the lemma below, ${\overline {\mathbb {R} }}=\mathbb {R} \cup \{-\infty \}\cup \{+\infty \}$ is the extended real number line, and ${\mathcal {B}}({\overline {\mathbb {R} }})$ is the $\sigma$ -algebra of Borel sets on ${\overline {\mathbb {R} }}.$ The notation $g:(X,{\mathcal {X}})\rightarrow (Y,{\mathcal {Y}})$ indicates that $g$ is a function from $X$ to $Y,$ and that $g$ is measurable relative to the $\sigma$ -algebras ${\mathcal {X}}$ and ${\mathcal {Y}}.$

Furthermore, if $T:X\to Y,$ and $(Y,{\mathcal {Y}})$ is a measurable space, we define

\sigma (T)=\{T^{-1}(S)\mid S\in {\mathcal {Y}}\}.

One can easily check that $\sigma (T)$ is the minimal $\sigma$ -algebra on $X$ under which $T$ is measurable, i.e.

T:(X,\sigma (T))\to (Y,{\mathcal {Y}}).

Statement of the lemma

Let $T:\Omega \rightarrow \Omega '$ be a function from a set $\Omega$ to a measurable space $(\Omega ',{\mathcal {A}}'),$ and $\operatorname {Im} T$ is ${\mathcal {A}}'$ -measurable. Further, let $f:\Omega \rightarrow {\overline {\mathbb {R} }}$ be a scalar function on $\Omega$ . Then $f$ is $\sigma (T)$ -measurable if and only if $f=g\circ T,$ for some measurable function $g:(\Omega ',{\mathcal {A}}')\rightarrow ({\overline {\mathbb {R} }},{\mathcal {B}}({\overline {\mathbb {R} }})).$

Note. The "if" part simply states that the composition of two measurable functions is measurable. The "only if" part is proven below.

Proof.

Let $f$ be $\sigma (T)$ -measurable.

Step 1: assume that $f$ is a simple function, i.e. $\textstyle f=\sum _{i=1}^{n}f_{i}\,\cdot {\mathbf {1} }_{A_{i}},$ for some non-empty pairwise disjoint sets $\{A_{i}\}_{i=1}^{n}$ from $\sigma (T).$ If $A_{i}=T^{-1}(A_{i}'),$ then the function $g=\textstyle \sum _{i=1}^{n}f_{i}\,\cdot {\mathbf {1} }_{A_{i}'}$ suits the requirement.

Step 2: if $f\geq 0$ , then $f$ is a pointwise limit of a non-decreasing sequence $f_{n}$ of simple functions (see the article on simple functions for the proof). Step 1 guarantees that $f_{n}=g_{n}\circ T.$ This equality, in turn, implies that the sequence $g_{n}(x)$ is non-decreasing, as long as $x\in \operatorname {Im} T,$ so the function

{\widetilde {g}}(x)=\lim _{n\to \infty }g_{n}(x)

is well defined (finite or infinite) for every $x\in \operatorname {Im} T.$ As a pointwise limit of measurable ${\overline {\mathbb {R} }}$ -valued functions, ${\widetilde {g}}$ is itself measurable (see the article on measurable functions). Define

g(x)={\begin{cases}{\widetilde {g}}(x)&\quad {\text{if }}x\in \operatorname {Im} T\\[1mm]0&\quad {\text{if }}x\notin \operatorname {Im} T.\end{cases}}

The measurability of $g$ is based on the assumption that $\operatorname {Im} T\in {\mathcal {A}}'.$ Thus, $g$ suits the requirement.

Step 3: every measurable function $f$ is the difference of its positive and negative parts, i.e. $f=f^{+}-f^{-},$ where both $f^{+}$ and $f^{-}$ are measurable and non-negative. Step 2 guarantees that $f^{+}=g^{+}\circ T$ and $f^{-}=g^{-}\circ T.$ Define

g(x)={\begin{cases}g^{+}(x)-g^{-}(x)&\quad {\text{if }}x\in \operatorname {Im} T\\[1mm]0&\quad {\text{if }}x\notin \operatorname {Im} T.\end{cases}}

Since it is not possible that $f^{+}(x)>0$ and $f^{-}(x)>0$ for the same $x,$ the equality $g^{+}(x)=g^{-}(x)=\infty$ never holds, and hence $g$ is well defined.

Being the difference of two measurable functions, $g^{+}-g^{-}$ is also measurable. Since $\operatorname {Im} T$ is measurable, so is $g.$ Thus, $g$ suits the requirement.

By definition, $f$ being $\sigma (T)$ -measurable is the same as $f^{-1}(S)\in \sigma (T)$ for every Borel set $S$ , which is the same as $\sigma (f)\subseteq \sigma (T)$ . So, the lemma can be rewritten in the following, equivalent form.

Lemma. Let $f$ and $T$ be as above. Then $f=g\circ T,$ for some Borel function $g,$ if and only if $\sigma (f)\subseteq \sigma (T)$ .

References

A. Bobrowski: Functional analysis for probability and stochastic processes: an introduction, Cambridge University Press (2005), ISBN 0-521-83166-0
M. M. Rao, R. J. Swift : Probability Theory with Applications, Mathematics and Its Applications, vol. 582, Springer-Verlag (2006), ISBN 0-387-27730-7 doi:10.1007/0-387-27731-5

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Doob–Dynkin lemma

Notations and introductory remarks

Statement of the lemma

See also

References