Sums of Darboux-like functions defined on \(\mathbf R^n\) (Q1978822)

This is an abstract of a conference talk, presented at the 21st Summer Symposium on Real Analysis, Chattanooga, June 1997. The author introduces a cardinal function called a general additivity for families of functions and computes general additivity for the classes of Darboux functions \(f:\mathbf R^n\to \mathbf R^m\), connectivity functions and extendable functions \(f:\mathbf R^n\to \mathbf R\). As an application one obtains that the repeatability of the system of Darboux functions \(f:\mathbf R^n\to \mathbf R^m\) is \(n+1\). This solves a problem posed by Cieselski and Wojciechowski. The results are stated without proofs.