Two notes on generalized Darboux properties and related features of additive functions

Abstract

We present two results on generalized Darboux properties of additive real functions. The first results deals with a weak continuity property, called Q-continuity, shared by all additive functions. We show that every Q-continuous function is the uniform limit of a sequence of Darboux functions. The class of Q-continuous functions includes the class of Jensen convex functions. We discuss further connections with related concepts, such as Q-differentiability. Next, given a Q-vector space A⊂eq R of cardinality c we consider the class DH*(A) of additive functions such that for every interval I⊂eq R, f(I)=A. We show that every function in class DH*(A) can be written as the sum of a linear (additive continuous) function and an additive function with the Darboux property if and only if A= R. We apply this result to obtain a relativization of a certain hierarchy of real functions to the class of additive functions.