Measurable function: Difference between revisions

Revision as of 17:08, 17 October 2007

In mathematics, a function f that maps each element of a measurable space $(X,{\mathcal {F}}_{X})$ to an element of another measurable space $(Y,{\mathcal {F}}_{Y})$ is said to be measurable (with respect to the sigma algebra ${\mathcal {F}}_{X}$ ) if for any set $A\in {\mathcal {F}}_{Y}$ it holds that $f^{-1}(A)\in {\mathcal {F}}_{X}$ , where $f^{-1}(A)=\{x\in X\mid f(x)\in A\}$ .

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-In [[mathematics]], a [[function]] ''f'' that maps each element of a [[measurable space]] <math>(X,\mathcal{F}_X)</math> to an element of another measure space <math>(Y,\mathcal{F}_Y)</math> is said to be '''measurable''' (with respect to the [[sigma algebra]] <math>\mathcal{F}_X</math>) if for any set <math>A \in \mathcal{F}_Y</math> it holds that <math>f^{-1}(A) \in \mathcal{F}_X</math>, where <math>f^{-1}(A)=\{x \in X \mid f(x) \in A\}</math>.
+In [[mathematics]], a [[function]] ''f'' that maps each element of a [[measurable space]] <math>(X,\mathcal{F}_X)</math> to an element of another measurable space <math>(Y,\mathcal{F}_Y)</math> is said to be '''measurable''' (with respect to the [[sigma algebra]] <math>\mathcal{F}_X</math>) if for any set <math>A \in \mathcal{F}_Y</math> it holds that <math>f^{-1}(A) \in \mathcal{F}_X</math>, where <math>f^{-1}(A)=\{x \in X \mid f(x) \in A\}</math>.
 [[Category:Mathematics_Workgroup]]
 [[Category:CZ Live]]

Measurable function: Difference between revisions

Revision as of 17:08, 17 October 2007

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