Continuity: Difference between revisions
imported>Hendra I. Nurdin m (→Continuos function: typo) |
imported>Jitse Niesen (→Continuos function: remove last sentence. "a function which maps open sets to open sets" means U open \implies f(U) open, which is not the same as continuous) |
||
Line 7: | Line 7: | ||
==Continuous function== | ==Continuous function== | ||
If the function ''f'' is continuous at every point <math>x \in X</math> then it is said to be a '''continuous function'''. An important ''equivalent'' definition, but perhaps less convenient to work with directly, is that a function <math>f:(X,O_X) \rightarrow (Y,O_Y)</math> is continuous if for any open (respectively, closed) set <math>U \in O_Y</math> the set <math>f^{-1}(U)=\{ x \in X \mid f(x) \in U\}</math> is an open (respectively, closed) set in <math>O_x</math> | If the function ''f'' is continuous at every point <math>x \in X</math> then it is said to be a '''continuous function'''. An important ''equivalent'' definition, but perhaps less convenient to work with directly, is that a function <math>f:(X,O_X) \rightarrow (Y,O_Y)</math> is continuous if for any open (respectively, closed) set <math>U \in O_Y</math> the set <math>f^{-1}(U)=\{ x \in X \mid f(x) \in U\}</math> is an open (respectively, closed) set in <math>O_x</math>. | ||
[[Category:Mathematics_Workgroup]] | [[Category:Mathematics_Workgroup]] | ||
[[Category:CZ Live]] | [[Category:CZ Live]] |
Revision as of 23:34, 21 September 2007
In mathematics, the notion of continuity of a function relates to the idea that the "value" of the function should not jump abruptly for any vanishingly "small" variation to its argument. Another way to think about a continuity of a function is that any "small" change in the argument of the function can only effect a correspondingly "small" change in the value of the function.
Formal definition of continuity
A function f from a topological space to another topological space , usually written as , is said to be continuous at the point if for every open set containing the point y=f(x), there exists an open set containing x such that . Here . In a variation of this definition, instead of being open sets, and can be taken to be, respectively, a neighbourhood of x and a neighbourhood of .
This definition corresponds to a generalization of the formalism which are usually taught in first year calculus courses to, among other things, define limits and continuity for functions which map the set of real numbers to itself.
Continuous function
If the function f is continuous at every point then it is said to be a continuous function. An important equivalent definition, but perhaps less convenient to work with directly, is that a function is continuous if for any open (respectively, closed) set the set is an open (respectively, closed) set in .