Difference between revisions of "Real-valued function"

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==See also==
 
==See also==
 
* [[Extended-real-valued function]]
 
* [[Extended-real-valued function]]
* [[Class of smooth real-valued functions|The class of smooth real-valued functions on R-n]]
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* [[Extended real value|Extended-real-value]]
* [[Class of k-differentiable real-valued functions|The class of {{M|k}}-differentiable real-valued functions on R-n]]
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* [[Class of smooth real-valued functions on R-n|The class of smooth real-valued functions on {{M|\mathbb{R}^n}}]]
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* [[Class of k-differentiable real-valued functions on R-n|The class of {{M|k}}-differentiable real-valued functions on {{M|\mathbb{R}^n}}]]
 
==References==
 
==References==
 
<references/>
 
<references/>
 
{{Definition|Measure Theory|Manifolds|Differential Geometry|Functional Analysis}}
 
{{Definition|Measure Theory|Manifolds|Differential Geometry|Functional Analysis}}

Latest revision as of 23:15, 21 October 2015

Definition

A function is said to be real-valued if the co-domain is the set of real numbers, [ilmath]\mathbb{R} [/ilmath][1]. That is to say any function ( [ilmath]f[/ilmath] ) and any set ( [ilmath]U[/ilmath] ) such that:

  • [ilmath]f:U\rightarrow\mathbb{R} [/ilmath]

See also

References

  1. Introduction to Smooth Manifolds - Second Edition - John M. Lee - Springer GTM