Geometrical and physical characteristics of a class of conformal mappings

“…Obviously, the condition (3) is weaker than the condition (4) and it is independent of condition (5).…”

“…A mapping between two generalized Riemannian spaces is said to be a conformal mapping if it preserves angles between curves of these spaces. Some physical characteristics of conformal mappings were given in [5]. Geodesic mappings and their generalizations is an active research field, see for instance [6][7][8][9][10][11][12][13][14][15].…”

On Conformal and Concircular Diffeomorphisms of Eisenhart’s Generalized Riemannian Spaces

“…Obviously, the condition (3) is weaker than the condition (4) and it is independent of condition (5).…”

“…A mapping between two generalized Riemannian spaces is said to be a conformal mapping if it preserves angles between curves of these spaces. Some physical characteristics of conformal mappings were given in [5]. Geodesic mappings and their generalizations is an active research field, see for instance [6][7][8][9][10][11][12][13][14][15].…”

On Conformal and Concircular Diffeomorphisms of Eisenhart’s Generalized Riemannian Spaces

“…Invariants of different geometrical mappings and their exact presentations are some of research subjects which results are used in different applications (for example, see [5]). Expressions of projective curvature tensors E k i jmn , Eq.…”

Some properties of ET-projective tensors obtained from Weyl projective tensor

“…In [10,17], a projective(projective-like) invariant of a quarter-symmetric metric connections was obtained. Afterwards, some properties of several types of a quarter-symmetric metric connection were studied ( [7,11,20,[23][24][25][27][28][29][30][31]). Recently, Han, Fu and Zhao [12,13] studied similar problems in Sub-Riemannian manifolds.…”

Geometries of manifolds equipped with a Ricci (projection-Ricci) quarter-symmetric connection