Bochner measurable function

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

Function f is almost surely separably valued (or essentially separably valued) if there exists a subset N ⊆ X with μ(N) = 0 such that f(X \ N) ⊆ B is separable.

A function f  : X → B defined on a measure space (X, Σ, μ) and taking values in a Banach space B is (strongly) measurable (with respect to Σ and the Borel algebra on B) if and only if it is both weakly measurable and almost surely separably valued.

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

• {{annotated link|Bochner integral}}
• {{annotated link|Bochner space}}
• {{annotated link|Measurable function}}
• {{annotated link|Measurable space}}
• {{annotated link|Pettis integral}}
• {{annotated link|Vector measure}}
• {{annotated link|Weakly measurable function}}

• {{cite book

| last = Showalter

| first = Ralph E.

| title = Monotone operators in Banach space and nonlinear partial differential equations

| url = https://archive.org/details/monotoneoperatio00show

| url-access = limited

| series = Mathematical Surveys and Monographs 49

| publisher = American Mathematical Society

| location = Providence, RI

| year = 1997

| page = [https://archive.org/details/monotoneoperatio00show/page/n109 103]

| isbn = 0-8218-0500-2

| mr = 1422252

| contribution = Theorem III.1.1}}.

{{Functional analysis}}

{{Analysis in topological vector spaces}}

Category:Functional analysis

Category:Measure theory

Category:Types of functions