Analysis MOC

Uniform continuity

Uniform continuity1 is a stronger notion than continuity in metric spaces. A function 𝑓 :𝑋 β†’π‘Œ between metric spaces is uniformly continuous iff for every πœ– >0 there exists 𝛿(πœ–) >0 such that #m/def/anal

𝑑𝑋(π‘₯,𝑦)<𝛿(πœ–)βŸΉπ‘‘π‘Œ(𝑓(π‘₯),𝑓(𝑦))<πœ–

Properties


#state/tidy | #lang/en | #SemBr

Footnotes

  1. German gleichmÀßige Stetigkeit. ↩