Geodesic Mappings of Equiaffine and Ricci Symmetric Spaces

被引：2

作者：

Berezovskii, V. E. ^{[1
]}

Guseva, N. I. ^{[2
,3
]}

Mikes, J. ^{[4
]}

机构：

[1] Uman Natl Univ Hort, UA-20305 Uman, Ukraine

[2] Moscow State Pedag Univ, Moscow 119882, Russia

[3] Russian Acad Sci, All Russian Inst Sci & Tech Informat, Moscow 125190, Russia

[4] Palacky Univ, Olomouc 77147, Czech Republic

来源：

MATHEMATICAL NOTES | 2021年 / 110卷 / 1-2期

关键词：

geodesic mapping; Ricci symmetric space; equiaffine space; Cauchy-type system in covariant derivatives;

D O I：

10.1134/S0001434621070312

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

[No abstract available]

引用

页码：293 / 296

页数：4

共 50 条

[1] Geodesic Mappings of Equiaffine and Ricci Symmetric Spaces
V. E. Berezovskii
N. I. Guseva
J. Mikeš
[J]. Mathematical Notes, 2021, 110 : 293 - 296
[2] Geodesic and almost geodesic mappings onto Ricci symmetric spaces
Berezovskii, V
Peska, P.
Mikes, J.
[J]. MATHEMATICS, INFORMATION TECHNOLOGIES AND APPLIED SCIENCES 2017, 2017, : 43 - 49
[3] GEODESIC RICCI MAPPINGS OF 2-SYMMETRIC RIEMANN SPACES
MIKESH, I
[J]. MATHEMATICAL NOTES, 1980, 28 (1-2) : 622 - 624
[4] Geodesic Mappings of Spaces with Affine Connnection onto Generalized Ricci Symmetric Spaces
Berezovski, V. E.
Mikes, Josef
Ryparova, Lenka
[J]. FILOMAT, 2019, 33 (14) : 4475 - 4480
[5] Geodesic Mappings of Spaces with Affine Connections onto Generalized Symmetric and Ricci-Symmetric Spaces
Berezovski, Volodymyr
Cherevko, Yevhen
Hinterleitner, Irena
Peska, Patrik
[J]. MATHEMATICS, 2020, 8 (09)
[6] Geodesic Mappings onto Generalized m-Ricci-Symmetric Spaces
Berezovski, Volodymyr
Cherevko, Yevhen
Hinterleitner, Irena
Peska, Patrik
[J]. MATHEMATICS, 2022, 10 (13)
[7] RICCI GENERALIZED-SYMMETRIC RIEMANNIAN SPACES ALLOW THE NONTRIVIAL GEODESIC MAPPINGS
SOBCHUK, VS
[J]. DOKLADY AKADEMII NAUK SSSR, 1982, 267 (04): : 793 - 795
[8] Canonical Almost Geodesic Mappings of the First Type onto Generalized Ricci Symmetric Spaces
Berezovski, Vladimir
Cherevko, Yevhen
Hinterleitner, Irena
Mikes, Josef
[J]. FILOMAT, 2022, 36 (04) : 1089 - 1097
[9] Geodesic mappings of equiaffine and anti-equiaffine general affine connection spaces preserving torsion
Stankovic, Mica S.
Ciric, Marija S.
Zlatanovic, Milan Lj.
[J]. FILOMAT, 2012, 26 (03) : 439 - 451
[10] On geodesic mappings of Riemannian spaces with cyclic Ricci tensor
Bacso, Sandor
Tornai, Robert
Horvath, Zoltan
[J]. ANNALES MATHEMATICAE ET INFORMATICAE, 2014, 43 : 13 - 17

← 1 2 3 4 5 →