Document Zbl 1499.53202

Belova, Olga; Mikeš, Josef; Strambach, Karl

About almost geodesic curves. (English) Zbl 1499.53202

Filomat 33, No. 4, 1013-1018 (2019).

MSC:

53C22	Geodesics in global differential geometry
53B05	Linear and affine connections
53B20	Local Riemannian geometry
53B30	Local differential geometry of Lorentz metrics, indefinite metrics

Keywords:

affine connection; almost geodesic

Cite Review PDF

Full Text: DOI

References:

[1]	O. Belova, J. Mikeˇs, K. Strambach, Complex curves as lines of geometries, Results Math. 71:1-2 (2017) 145-165. · Zbl 1433.52026
[2]	O. Belova, J. Mikeˇs, K. Strambach, Geodesics and almost geodesics curves, Results Math. 73:154 (2018) doi: 10.1007/s00025-0180917-3. · Zbl 1408.53054
[3]	V.E. Berezovskii, J. Mikeˇs, H. Chud´a, O.Y. Chepurna, On canonical almost geodesic mappings which preserve the Weyl projective tensor, Russ. Math. 61:6 (2017) 1-5; transl. from Izv. Vyssh. Uchebn. Zaved., Mat. 6 (2017) 3-8. · Zbl 1385.53007
[4]	D. Betten, Topological shift spaces, Adv. Geom. 5:1 (2005) 107-118. · Zbl 1067.51007
[5]	E. Kamke, Differentialgleichungen reeller Funktionen, Akademische Verlagsgesellschaft, Leipzig, 1956. · Zbl 0073.07802
[6]	E. Kasner, The generalized Beltrami problem concerning geodesic representation, American M. S. Trans. 4:2 (1903) 149-152. · JFM 34.0656.04
[7]	J. Mikeˇs et al., Differential geometry of special mappings, Palacky University, Olomouc, 2nd ed. 2019 · Zbl 1440.53001
[8]	J. Mikeˇs, K. Strambach, Differentiable structures on elementary geometries, Results Math. 53:1-2 (2009) 153-172. · Zbl 1179.51009
[9]	J. Mikeˇs, K. Strambach, Gr ¨unwald shift spaces, Publ. Math. Debrecen 83:1-2 (2013) 85-96. · Zbl 1289.51008
[10]	J. Mikeˇs, K. Strambach, Shells of monotone curves, Czechosl. Math. J. 65(140): 3 (2015) 677-699. · Zbl 1363.53033
[11]	S.M. Minˇci´c, M.S. Stankovi´c, Lj.S. Velimirovi´c, Generalized Riemannian spaces and spaces of non-symmetric affine connection, Faculty of Science and Maths, Niˇs, 2013.
[12]	M.Z. Petrovi´c, Special almost geodesic mappings of the second type between generalized Riemannian spaces, Bull. Malays. Math. Sci. Soc. (2), doi: 10.1007/s40840-017-0509-5. · Zbl 1419.53015
[13]	M.Z. Petrovi´c, M.S. Stankovi´c, Special almost geodesic mappings of the first type of non-symmetric affine connection spaces, Bull. Malays. Math. Sci. Soc. (2) 40:3 (2017) 1353-1362. · Zbl 1377.53019
[14]	H. Salzmann, D. Betten, T. Grundh ¨ofer, H. H¨ahl, R. L ¨owen and M. Stroppel, Compact projective planes: with an introduction to octonion geometry. De Gruyter Expositions in Mathematics 21, De Gruyter, Berlin, 1995.
[15]	N.S. Sinyukov, Geodesic mappings of Riemannian spaces, (Russian) Nauka, Moscow, 1979. · Zbl 0637.53020
[16]	N.O. Vesi´c, M.S. Stankovi´c, Invariants of special second-type almost geodesic mappings of generalized Riemannian space, Mediterr. J. Math. 15:60 (2018) · Zbl 1391.53015

This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.