Results 31 to 40 of about 64 (50)
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Integrability of canonic affinor structures of homogeneous periodic Φ-spaces
Russian Mathematics, 2008zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Canonical affinor structures of classical type on regular $ \Phi$-spaces
Sbornik Mathematics, 1995Let \(G\) be a connected Lie group, \(H\) its Lie subgroup. The homogeneous space \(G/H\) is called a \(\Phi\)-space if \((G^{\Phi})^{\circ}{\i}H{\i}G^{\Phi}\), where \(\Phi\) is an automorphism of \(G\). The \(\Phi\)-space is regular if the Lie algebras \(g, h\) of \(G, H\) satisfy \(g = h \oplus\operatorname{Ker}(\varphi - \operatorname{id})\), where
V V Balashchenko +2 more
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Canonical affinor structures on regular Φ-spaces
Russian Mathematical Surveys, 1991See the review in Zbl 0734.53029.
Balashchenko, V. V., Stepanov, N. A.
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On Geodesic Curves on Quotient Manifold of Nondegenerate Affinor Fields [PDF]
Russian Mathematics, 2018 © 2018, Allerton Press, Inc. We consider the quotient manifold of the manifold of nondegenerate affinor fields on a compact manifold with respect to the action of the group of nowhere vanishing functions.
Romanova E.
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Integrable Affinor Structures and Their Plural Interpretations
Journal of Mathematical Sciences, 2002The primary goal of this paper is a review of the literature on integrable (regular/irregular) affinor structures as well as their interpretation by using the algebra of plural numbers.
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Ukrainian Mathematical Journal, 2007
Summary: We study an almost geodesic mapping of Riemann spaces with parabolic affinor structure. Some properties of parabolic Kählerian spaces admitting an almost geodesic mapping are established.
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Summary: We study an almost geodesic mapping of Riemann spaces with parabolic affinor structure. Some properties of parabolic Kählerian spaces admitting an almost geodesic mapping are established.
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Golden Ratio, Affinor Structures, and Generalized Symmetric Spaces
2019Известно, что наиболее важными аффинорными структурами на гладких многообразиях являются почти комплексные структуры, структуры почти произведения, f-структуры Кентаро Яно и некоторые другие. Однако в последнее десятилетие новый тип аффинорных структур был введен и интенсивно обсуждался в дифференциальной геометрии. Это так называемые золотые структуры,
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Metrics and Connections on the Bundle of Affinor Frames
Chinese Annals of Mathematics Series B, 2021Habil Fattayev +2 more
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The algebra of canonical affinor structures on homogeneous k-symmetric spaces
2012The commutative algebra of all canonical affinor structures on homogeneous k-symmetric spaces is completely described. It gives a classification of these spaces with respect to the algebra.
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Almost integrability of a polyaffinor structure
See the review in Zbl 0647.53024.openaire +2 more sources