Filtration (probability theory)

In the theory of stochastic processes, a subdiscipline of probability theory, filtrations are totally ordered collections of subsets that are used to model the information that is available at a given point and therefore play an important role in the formalization of random (stochastic) processes.

Definition

Let $(\Omega ,{\mathcal {A}},P)$ be a probability space and let $I$ be an index set with a total order $\leq$ (often $\mathbb {N}$ , $\mathbb {R} ^{+}$ , or a subset of $\mathbb {R} ^{+}$ ).

For every $i\in I$ let ${\mathcal {F}}_{i}$ be a sub-σ-algebra of ${\mathcal {A}}$ . Then

\mathbb {F} :=({\mathcal {F}}_{i})_{i\in I}

is called a filtration, if ${\mathcal {F}}_{k}\subseteq {\mathcal {F}}_{\ell }$ for all $k\leq \ell$ . So filtrations are families of σ-algebras that are ordered non-decreasingly.^[1] If $\mathbb {F}$ is a filtration, then $(\Omega ,{\mathcal {A}},\mathbb {F} ,P)$ is called a filtered probability space.

Example

Let $(X_{n})_{n\in \mathbb {N} }$ be a stochastic process on the probability space $(\Omega ,{\mathcal {A}},P)$ . Then

{\mathcal {F}}_{n}:=\sigma (X_{k}\mid k\leq n)

is a σ-algebra and $\mathbb {F} =({\mathcal {F}}_{n})_{n\in \mathbb {N} }$ is a filtration. Here $\sigma (X_{k}\mid k\leq n)$ denotes the σ-algebra generated by the random variables $X_{1},X_{2},\dots ,X_{n}$ .

$\mathbb {F}$ really is a filtration, since by definition all ${\mathcal {F}}_{n}$ are σ-algebras and

\sigma (X_{k}\mid k\leq n)\subseteq \sigma (X_{k}\mid k\leq n+1).

This is known as the natural filtration of ${\mathcal {A}}$ with respect to $X$ .

Types of filtrations

Right-continuous filtration

If $\mathbb {F} =({\mathcal {F}}_{i})_{i\in I}$ is a filtration, then the corresponding right-continuous filtration is defined as^[2]

\mathbb {F} ^{+}:=({\mathcal {F}}_{i}^{+})_{i\in I},

with

{\mathcal {F}}_{i}^{+}:=\bigcap _{i<z}{\mathcal {F}}_{z}.

The filtration $\mathbb {F}$ itself is called right-continuous if $\mathbb {F} ^{+}=\mathbb {F}$ .^[3]

Complete filtration

Let $(\Omega ,{\mathcal {F}},P)$ be a probability space and let,

{\mathcal {N}}_{P}:=\{A\subseteq \Omega \mid A\subseteq B{\text{ for some }}B\in {\mathcal {F}}{\text{ with }}P(B)=0\}

be the set of all sets that are contained within a $P$ -null set.

A filtration $\mathbb {F} =({\mathcal {F}}_{i})_{i\in I}$ is called a complete filtration, if every ${\mathcal {F}}_{i}$ contains ${\mathcal {N}}_{P}$ . This implies $(\Omega ,{\mathcal {F}}_{i},P)$ is a complete measure space for every $i\in I.$ (The converse is not necessarily true.)

Augmented filtration

A filtration is called an augmented filtration if it is complete and right continuous. For every filtration $\mathbb {F}$ there exists a smallest augmented filtration ${\tilde {\mathbb {F} }}$ refining $\mathbb {F}$ .

If a filtration is an augmented filtration, it is said to satisfy the usual hypotheses or the usual conditions.^[3]

References

^ Klenke, Achim (2008). Probability Theory. Berlin: Springer. p. 191. doi:10.1007/978-1-84800-048-3. ISBN 978-1-84800-047-6.
^ Kallenberg, Olav (2017). Random Measures, Theory and Applications. Switzerland: Springer. p. 350-351. doi:10.1007/978-3-319-41598-7. ISBN 978-3-319-41596-3.
^ ^a ^b Klenke, Achim (2008). Probability Theory. Berlin: Springer. p. 462. doi:10.1007/978-1-84800-048-3. ISBN 978-1-84800-047-6.

[Klenke191-1] Klenke, Achim (2008). Probability Theory. Berlin: Springer. p. 191. doi:10.1007/978-1-84800-048-3. ISBN 978-1-84800-047-6.

[Kallenberg350-2] Kallenberg, Olav (2017). Random Measures, Theory and Applications. Switzerland: Springer. p. 350-351. doi:10.1007/978-3-319-41598-7. ISBN 978-3-319-41596-3.

[Klenke462-3] Klenke, Achim (2008). Probability Theory. Berlin: Springer. p. 462. doi:10.1007/978-1-84800-048-3. ISBN 978-1-84800-047-6.

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