On Darboux $Bbb Q$-differentiable functions and Darboux wright convex function

Year, pages: 2004, 29 - 33

It is shown that for each function $f:Bbb R o Bbb R$ there is an additive almost continuous function $g$ (an additive function $h$) such that the sum $f + g$ ($f + h$) is almost continuous in the sense of Stallings (does not have the Darboux property).

Grande, Z. 2004. On Darboux $Bbb Q$-differentiable functions and Darboux wright convex function. In Tatra Mountains Mathematical Publications, vol. 28, no.1, pp. 29-33. 1210-3195.

Grande, Z. (2004). On Darboux $Bbb Q$-differentiable functions and Darboux wright convex function. Tatra Mountains Mathematical Publications, 28(1), 29-33. 1210-3195.