Abstract
We define symmetric continuity for functions defined on arbitrary subsets of $\mathbb{R}$. The main result is that when a symmetrically continuous function is defined on a measurable set (a set with the Baire property), then it is continuous almost everywhere (on a residual set, respectively). This generalizes the known result for functions defined on the whole real line.
Citation
Marcin Szyszkowski. "Symmetrically Continuous Functions on Various Subsets of the Real Line." Real Anal. Exchange 25 (2) 547 - 564, 1999/2000.
Information
