Let be a normaltopological space and let be functions with upper semicontinuous, lower semicontinuous, and . Then there exists a continuous function with
This theorem has a number of applications and is the first of many classical insertion theorems. In particular it implies the Tietze extension theorem and consequently Urysohn's lemma, and so the conclusion of the theorem is equivalent to normality.
References
^Miroslav Katětov, On real-valued functions in topological spaces, Fundamenta Mathematicae 38(1951), 85–91. [1]; Correction to "On real-valued functions in topological spaces", Fundamenta Mathematicae 40(1953), 203–205. [2]
^Hing Tong, Some characterizations of normal and perfectly normal spaces, Duke Mathematical Journal 19(1952), 289–292. doi:10.1215/S0012-7094-52-01928-5