The Pompeiu problem and discrete groups (Q387554)

In the paper under review some necessary and sufficient conditions are given for a finite collection of finite subsets of a discrete abelian group, whose torsion free rank is less than the cardinal of the continuum, to have the Pompeiu property. A similar result for nonabelian free groups is also provided. A sufficient condition is given that guaranties the harmonicity of a function on a nonabelian free group if it satisfies the mean-value property over two spheres. As regards the Pompeiu property and two-radii theorems in a definitive form see the books 1. [\textit{Val. V. Volchkov}, Integral geometry and convolution equations. Dordrecht: Kluwer Academic Publishers (2003; Zbl 1043.53003)]. 2. [\textit{Val. V. Volchkov} and \textit{Vit. V. Volchkov}, Harmonic analysis of mean periodic functions on symmetric spaces and the Heisenberg group. Berlin: Springer (2009; Zbl 1192.43007)]. 3. [\textit{V. V. Volchkov} and \textit{V. V. Volchkov}, Harmonic analysis of mean periodic functions on symmetric spaces and the Heisenberg group. 2nd edition. Berlin: Springer (2011)] 4. [\textit{Val. V. Volchkov} and \textit{Vit. V. Volchkov}, Offbeat integral geometry on symmetric spaces. Basel: Birkhäuser (2013; Zbl 1277.53002)] and the bibliography therein.