On real universality in the Birkhoff sense (Q2054585)

This article presents a version of Birkhoff's theorem for universal entire functions for the translation in the case of real \(C^\infty\) functions on \(\mathbb{R}^n\). The method of proof allows the author to show that there are linearly independent functions with the cardinality of the continuum which are all universal. Finally, Whitney's approximation theorem is used to show that there exist real analytic universal functions for translation on \(C^\infty(\mathbb{R}^n)\).