Weakly measurable function

In mathematics—specifically, in functional analysis—a weakly measurable function taking values in a Banach space is a function whose composition with any element of the dual space is a measurable function in the usual (strong) sense. For separable spaces, the notions of weak and strong measurability agree.

Definition

If ( X , Σ ) {\displaystyle (X,\Sigma )} is a measurable space and B {\displaystyle B} is a Banach space over a field K {\displaystyle \mathbb {K} } (which is the real numbers R {\displaystyle \mathbb {R} } or complex numbers C {\displaystyle \mathbb {C} } ), then f : X B {\displaystyle f:X\to B} is said to be weakly measurable if, for every continuous linear functional g : B K , {\displaystyle g:B\to \mathbb {K} ,} the function

g f : X K  defined by  x g ( f ( x ) ) {\displaystyle g\circ f\colon X\to \mathbb {K} \quad {\text{ defined by }}\quad x\mapsto g(f(x))}
is a measurable function with respect to Σ {\displaystyle \Sigma } and the usual Borel σ {\displaystyle \sigma } -algebra on K . {\displaystyle \mathbb {K} .}

A measurable function on a probability space is usually referred to as a random variable (or random vector if it takes values in a vector space such as the Banach space B {\displaystyle B} ). Thus, as a special case of the above definition, if ( Ω , P ) {\displaystyle (\Omega ,{\mathcal {P}})} is a probability space, then a function Z : Ω B {\displaystyle Z:\Omega \to B} is called a ( B {\displaystyle B} -valued) weak random variable (or weak random vector) if, for every continuous linear functional g : B K , {\displaystyle g:B\to \mathbb {K} ,} the function

g Z : Ω K  defined by  ω g ( Z ( ω ) ) {\displaystyle g\circ Z\colon \Omega \to \mathbb {K} \quad {\text{ defined by }}\quad \omega \mapsto g(Z(\omega ))}
is a K {\displaystyle \mathbb {K} } -valued random variable (i.e. measurable function) in the usual sense, with respect to Σ {\displaystyle \Sigma } and the usual Borel σ {\displaystyle \sigma } -algebra on K . {\displaystyle \mathbb {K} .}

Properties

The relationship between measurability and weak measurability is given by the following result, known as Pettis' theorem or Pettis measurability theorem.

A function f {\displaystyle f} is said to be almost surely separably valued (or essentially separably valued) if there exists a subset N X {\displaystyle N\subseteq X} with μ ( N ) = 0 {\displaystyle \mu (N)=0} such that f ( X N ) B {\displaystyle f(X\setminus N)\subseteq B} is separable.

Theorem (Pettis, 1938) — A function f : X B {\displaystyle f:X\to B} defined on a measure space ( X , Σ , μ ) {\displaystyle (X,\Sigma ,\mu )} and taking values in a Banach space B {\displaystyle B} is (strongly) measurable (that equals a.e. the limit of a sequence of measurable countably-valued functions) if and only if it is both weakly measurable and almost surely separably valued.

In the case that B {\displaystyle B} is separable, since any subset of a separable Banach space is itself separable, one can take N {\displaystyle N} above to be empty, and it follows that the notions of weak and strong measurability agree when B {\displaystyle B} is separable.

See also

References

  • Pettis, B. J. (1938). "On integration in vector spaces". Trans. Amer. Math. Soc. 44 (2): 277–304. doi:10.2307/1989973. ISSN 0002-9947. MR 1501970.
  • Showalter, Ralph E. (1997). "Theorem III.1.1". Monotone operators in Banach space and nonlinear partial differential equations. Mathematical Surveys and Monographs 49. Providence, RI: American Mathematical Society. p. 103. ISBN 0-8218-0500-2. MR 1422252.
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