Difference between revisions of "Continuity"
(There's no reason to only talk about continuity over the real numbers) |
(Put original definition in more readable notation) |
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Let <math>c\in A</math> | Let <math>c\in A</math> | ||
− | We say that <math>f</math> is continous at point <math>c</math> | + | We say that <math>f</math> is continous at point <math>c</math> if <math>\forall\varepsilon>0\;\exists\delta>0</math> such that for all <math>x\in A</math>, <cmath>|x-c|<\delta\Rightarrow |f(c)-f(x)|<\varepsilon.</cmath> |
− | If <math>f</math> is continous at <math>c</math> <math> | + | If <math>f</math> is continous at <math>c</math> for all <math>c\in A</math>, we say that <math>f</math> is '''continous over <math>A</math>'''. |
==Definition for metric spaces== | ==Definition for metric spaces== |
Revision as of 15:32, 5 September 2008
The notion of Continuity is one of the most important in real analysis, partly because continous functions most closely resemble the behaviour of observables in nature.
Although continuity and continous functions can be defined on more general sets, we will first restrict ourselves to
Definition
Let
Let
Let
We say that is continous at point if such that for all ,
If is continous at for all , we say that is continous over .
Definition for metric spaces
We can easily extend this definition to metric spaces. Let and be metric spaces. Given a function , and a point , we say that is continuous a if, for all there is a such that for all ,
If is continous at for all , we say that is continous over
Definition for Topological spaces
Perhaps the most general definition of continuity is in the context of topological spaces. If and are topological spaces, then a function is called continuous if for any open set in , it's preimage (i.e. the set ) is an open set in . Note that the image of an open set in does not have to be open.
It can be shown that if and are metric spaces under the metric space topology, that this definition of continuity coincides with the previous one.
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