Fuzzy uniformly continuous functions

In: Tatra Mountains Mathematical Publications, vol. 14, no. 1

Vladimír Janiš

Details:

Year, pages: 1998, 177 - 180

About article:

In [1] the authors introduce a definition of fuzzy continuity that enables to claim that a real function is bounded on a compact set if and only if it is fuzzy continuous. However, some other properties, natural for continuous functions are not more valid for fuzzy continuous ones. An example of such property is the intermediate value principle. We show that if we use the methods from [1] to define fuzzy uniform continuity, we salvage this principle.

How to cite:

ISO 690:

Janiš, V. 1998. Fuzzy uniformly continuous functions. In Tatra Mountains Mathematical Publications, vol. 14, no.1, pp. 177-180. 1210-3195.

APA:

Janiš, V. (1998). Fuzzy uniformly continuous functions. Tatra Mountains Mathematical Publications, 14(1), 177-180. 1210-3195.