A strong type of continuity natural for compact spaces

Rok, strany: 1998, 17 - 27

We show that every continuous function defined on a compact has a continuity property which is often stronger than the continuity. This type of continuity — firm continuity — is defined in purely topological terms. A metric space $X$ is compact iff every continuous function $f:X\to\Bbb R$ is firmly continuous.

ISO 690:

Kupka, I. 1998. A strong type of continuity natural for compact spaces. In Tatra Mountains Mathematical Publications, vol. 14, no.1, pp. 17-27. 1210-3195.

APA:

Kupka, I. (1998). A strong type of continuity natural for compact spaces. Tatra Mountains Mathematical Publications, 14(1), 17-27. 1210-3195.