On some classes of measurable functions with Baire property

Year, pages: 2002, 57 - 63

In this article we investigate the pointwise and the discrete convergence in the class $A$ of functions $f:Bbb R oBbb R$ such that there is a set $A(f)$ of measure zero and of the first category for which $f|(Bbb Rackslash A(f))$ is continuous. Moreover, we examine the functions $F:Bbb R² oBbb R$ continuous with respect to $y$ and with respect to the sections $F^y in A$.

Strońska, E. 2002. On some classes of measurable functions with Baire property. In Tatra Mountains Mathematical Publications, vol. 24, no.1, pp. 57-63. 1210-3195.

Strońska, E. (2002). On some classes of measurable functions with Baire property. Tatra Mountains Mathematical Publications, 24(1), 57-63. 1210-3195.