Uniform continuity

Definition

Let $(X,d_1)$ and $(Y,d_2)$ be metric spaces and let $f:X\rightarrow Y$ be a map between them. We say $f$ is uniformly continuous if^[1]:

• $\forall\epsilon>0\exists\delta>0\forall x,y\in X\big[d_1(x,y)<\delta\implies d_2(f(x),f(y))<\epsilon\big]$
  • For comparison: continuity at $x\in X$ (in a map between metric spaces) is $\forall\epsilon>0\exists\delta>0\forall y\in X\big[d_1(x,y)<\delta\implies d_2(f(x),f(y))<\epsilon\big]$ - uniform continuity differs by supposing given an $\epsilon >0$ there is some $\delta>0$ that'll "work" for all $x,y\in X$, not just for a fixed-before-$\epsilon$ $x$.

References

1. Jump up ↑ Functional Analysis - Volume 1: A gentle introduction - Dzung Minh Ha