Continuous function
In mathematics, a continuous function is, intuitively speaking, a function whose "value" does not jump abruptly for any vanishingly "small" variation to its argument. Another way to think about a continuous 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
A function f from a topological space to another topological space , usually written as , is a continuous function if for every point and 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 .
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 . In this definition, a continuous function is simply a function which maps open sets to open sets or, equivalently, closed sets to closed sets.
The first definition corresponds to a generalization of the argument which are usually taught in first year calculus courses to, among other things, define continuity for functions which map the real numbers to itself.