On geodesic mappings of equidistant generalized Riemannian spaces (Q428055)

The notion of \textit{generalized Riemannian space} was introduced by Eisenhart in 1951 as a manifold endowed with a non-symmetric metric tensor \(g=(g_{ij})\). Such a space is called \textit{equidistant} if there exists a \(1\)-form whose covariant derivative is proportional to the symmetric part of \(g\). Using old results of Siniukov, the authors obtain a pair of generalized Riemannian spaces admitting a geodesic mapping.