Special Almost Geodesic Mappings of the Second Type Between Generalized Riemannian Spaces

We deal with almost geodesic lines of manifolds with non-symmetric linear connection. Also, we consider special almost geodesic mappings of the second type between Eisenhart's generalized Riemannian spaces as well as between generalized classical (elliptic) and hyperbolic Kahler spaces. These mappings are generalizations of holomorphically projective mappings between generalized classical and hyperbolic Kahler spaces. We prove some existence theorems for special almost geodesic mappings of the second type between generalized Riemannian spaces as well as between generalized classical and hyperbolic Kahler spaces. Finally, we find some invariant geometric objects with respect to these mappings.