the limit of a uniformly convergent sequence of continuous functions is continuous


Theorem. The limit of a uniformly convergent sequence of continuous functionsMathworldPlanetmathPlanetmath is continuous.

Proof. Let fn,f:XY, where (X,ρ) and (Y,d) are metric spaces. Suppose fnf uniformly and each fn is continuous. Then given any ϵ>0, there exists N such that n>N implies d(f(x),fn(x))<ϵ3 for all x. Pick an arbitrary n larger than N. Since fn is continuous, given any point x0, there exists δ>0 such that 0<ρ(x,x0)<δ implies d(fn(x),fn(x0))<ϵ3. Therefore, given any x0 and ϵ>0, there exists δ>0 such that

0<ρ(x,x0)<δd(f(x),f(x0))d(f(x),fn(x))+d(fn(x),fn(x0))+d(fn(x0),f(x0))<ϵ.

Therefore, f is continuous.

The theorem also generalizes to when X is an arbitrary topological spaceMathworldPlanetmath. To generalize it to X an arbitrary topological space, note that if d(fn(x),f(x))<ϵ/3 for all x, then x0fn-1(Bϵ/3(fn(x0)))f-1(Bϵ(f(x0))), so f-1(Bϵ(f(x0))) is a neighbourhood of x0. Here Bϵ(y) denote the open ball of radius ϵ, centered at y.

Title the limit of a uniformly convergent sequence of continuous functions is continuous
Canonical name TheLimitOfAUniformlyConvergentSequenceOfContinuousFunctionsIsContinuous
Date of creation 2013-03-22 15:21:58
Last modified on 2013-03-22 15:21:58
Owner neapol1s (9480)
Last modified by neapol1s (9480)
Numerical id 13
Author neapol1s (9480)
Entry type Theorem
Classification msc 40A30
Related topic LimitFunctionOfSequence