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Holomorphically projective mappings and their generalizations
Abstract: Diffeomorphisms and automorphisms of geometrically generalized spaces constitute one of the current main directions in differential geometry. A large number of works are devoted to geodesic, holomorphicalty projective, almost geodesic, and other mappings.On the other hand, one line of thought is now the most important one, namely, the investigation of special, affine-eonnected Riemannian, and Ks spaces. Symmetric spaces a~d their generalizations play the most significant part among them.Symmetric and, in impli…
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Cited by 106 publications
(97 citation statements)
References 22 publications
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“…Further we notice that for holomorphically projective mappings between e-Kähler manifolds K n andK n of class C 3 holds the following third set of equations [6,8,9,15,10,16]:…”
Section: On Holomorphically Projective Mappings Of E-kähler Manifoldsmentioning
confidence: 99%
“…Further we notice that for holomorphically projective mappings between e-Kähler manifolds K n andK n of class C 3 holds the following third set of equations [6,8,9,15,10,16]:…”
Section: On Holomorphically Projective Mappings Of E-kähler Manifoldsmentioning
confidence: 99%
“…We present well known facts, which were proved by Domashev, Kurbatova, Mikeš, Prvanović, Otsuki, Tashiro etc., see [2,3,6,7,8,9,10,11,12,15,16,17,18,19]. In these results no details about the smoothness class of the metric were stressed.…”
Section: Introductionmentioning
confidence: 98%
“…It is known that Riemannian spaces of constant curvature form a closed class with respect to geodesic mappings (Beltrami's theorem, see [36]). In 1978 (see [14,15,22,23]), J. Mikeš proved that under the conditions V n ,V n ∈ C 3 the following theorems hold (locally). Theorem 3.9.…”
Section: Geodesic Mappings Of Einstein Manifoldsmentioning
confidence: 96%
“…Concircular fields play an important role in the theories of geodesic mappings and projective and conformal transformations. They were studied by a number of geometers: N. S. Sinyukov [35], A. V. Aminova [1], J. Mikeš [22,23], I. G. Shandra [31][32][33][34], etc.…”
Section: Definition 35mentioning
confidence: 99%
“…Kählerian spaces and their mappings were investigated by many authors, for example T. Otsuki and Y. Tasiro [18], [25], K. Yano [26], J. Mikeš, V. V. Domashev [1], [6], [7], [8], [9], [10], [11], [22], M. Prvanović [19], N. Pušić [21], S. S. Pujar [20], M. S. Stanković at al. [16], [24], and many others.…”
Section: Generalizedmentioning
confidence: 99%
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