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Keywords:
non-symmetric affine connection; almost geodesic mapping; $G$-almost geodesic mapping; property of reciprocity; almost geodesic mapping of the second type
non-symmetric affine connection; almost geodesic mapping; $G$-almost geodesic mapping; property of reciprocity; almost geodesic mapping of the second type
Summary:
We study $G$-almost geodesic mappings of the second type $\underset \theta \to \pi _2(e)$, $\theta =1,2$ between non-symmetric affine connection spaces. These mappings are a generalization of the second type almost geodesic mappings defined by N. S. Sinyukov (1979). We investigate a special type of these mappings in this paper. We also consider $e$-structures that generate mappings of type $\underset \theta \to \pi _2(e)$, $\theta =1,2$. For a mapping $\underset \theta \to \pi _2(e,F)$, $\theta =1,2$, we determine the basic equations which generate them.
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