Notes on some problems of Solomon Marcus

In: Tatra Mountains Mathematical Publications, vol. 8, no. 2

Pavel Kostyrko

Detaily:

Rok, strany: 1996, 165 - 168

O článku:

In the paper a solution of two problems of Solomon Marcus is given. Let $f$ be a real function of a real variable. It is proved: 1) If $f$ is symmetrically continuous, then $f$ is uniformly continuous if and only if $f$ is uniformly symmetric continuous on a dense set; 2) There is no decomposition of the real line into a finite number of mutually disjoint anticonvex sets.

Ako citovať:

ISO 690:

Kostyrko, P. 1996. Notes on some problems of Solomon Marcus. In Tatra Mountains Mathematical Publications, vol. 8, no.2, pp. 165-168. 1210-3195.

APA:

Kostyrko, P. (1996). Notes on some problems of Solomon Marcus. Tatra Mountains Mathematical Publications, 8(2), 165-168. 1210-3195.