On unique range sets for holomorphic maps sharing hypersurfaces without counting multiplicity (Q991562)

The classical \(5\)-values theorem of Nevanlinna was generalized by \textit{H. Fujimoto} in 1975 [Nagoya Math. J. 58, 1--23 (1975; Zbl 0313.32005)]. Fujimoto proved a uniqueness result for \(3n+2\) hypersurfaces in \({\mathbb P}_n\). In the article under review a uniqueness theorem is proved which (unlike Fujimotos result) allows for ignoring multiplicities. However, in compensation a rather large number of hypersurfaces is needed. Already for \(n=2\) at least \(36868\) hypersurfaces are needed and this number grows exponentially with \(n\).