EUDML

We study $G$ -almost geodesic mappings of the second type $\underset{θ}{\to} π_{2} (e)$ , $θ = 1, 2$ 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 $\underset{θ}{\to} π_{2} (e)$ , $θ = 1, 2$ . For a mapping $\underset{θ}{\to} π_{2} (e, F)$ , $θ = 1, 2$ , we determine the basic equations which generate them.

On equitorsion holomorphically projective mappings of generalized Kählerian spaces

Mića S. Stanković; Svetislav M. Minčić; Ljubica S. Velimirović — 2004

Czechoslovak Mathematical Journal

In this paper we investigate holomorphically projective mappings of generalized Kählerian spaces. In the case of equitorsion holomorphically projective mappings of generalized Kählerian spaces we obtain five invariant geometric objects for these mappings.

Infinitesimal deformations and Lie derivative of a non-symmetric affine connection space

Ljubica S. Velimirović; Svetislav M. Minčić; Mića S. Stanković — 2003

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

Equitorsion holomorphically projective mappings of generalized Kählerian space of the first kind

Mića S. Stanković; Milan Lj. Zlatanović; Ljubica S. Velimirović — 2010

Czechoslovak Mathematical Journal

In this paper we define generalized Kählerian spaces of the first kind $(G {\underset{1}{K}}_{N})$ given by (2.1)–(2.3). For them we consider hollomorphically projective mappings with invariant complex structure. Also, we consider equitorsion geodesic mapping between these two spaces ( $G {\underset{1}{K}}_{N}$ and $G {\underset{1}{\bar{K}}}_{N}$ ) and for them we find invariant geometric objects.

Equitorsion conform mappings of generalized Riemannian spaces

Mića S. Stanković; Ljubica S. Velimirović; Svetislav M. Minčić; Milan Lj. Zlatanović — 2009

Matematički Vesnik

On equitorsion geodesic mappings of general affine connection spaces

Mića S. Stanković; Svetislav M. Minčić; Ljubica S. Velimirović; Milan Lj. Zlatanović — 2010

Rendiconti del Seminario Matematico della Università di Padova

Page 1

Download Results (CSV)

Advanced Search

Formula preview

Currently displaying 1 – 11 of 11

On a special almost geodesic mapping of third type of affine spaces.

First type almost geodesic mappings of general affine connection spaces.

On geodesic mappings of general affine connexion spaces and of generalized Riemannian spaces.

Equitorsion geodesic mappings of generalized Riemannian spaces.

On holomorphically projective mappings of generalized Kählerian spaces.

Basic equations of $G$ -almost geodesic mappings of the second type, which have the property of reciprocity

On equitorsion holomorphically projective mappings of generalized Kählerian spaces

Infinitesimal deformations and Lie derivative of a non-symmetric affine connection space

Equitorsion holomorphically projective mappings of generalized Kählerian space of the first kind

Equitorsion conform mappings of generalized Riemannian spaces

On equitorsion geodesic mappings of general affine connection spaces