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Chebyshevskii Sbornik, 2023, Volume 24, Issue 5, Pages 153–166
DOI: https://doi.org/10.22405/2226-8383-2023-24-5-153-166
(Mi cheb1379)
 

Nearly trans-Sasakian almost $C(\lambda)$-manifolds

A. R. Rustanova, G. V. Teplyakovab, S. V. Kharitonovab

a Institute of Digital Technologies and Modeling in Construction, Moscow State University of Civil Engineering (Moscow)
b Institute of Mathematics and Digital Technologies, Orenburg State University (Orenburg)
References:
Abstract: The nearly trans-Sasakian manifolds, which are almost $C(\lambda)$-manifolds, are considered. On the space of the adjoint G-structure, the components of the Riemannian curvature tensor, the Ricci tensor of the nearly trans-Sasakian manifolds, and the almost $C(\lambda)$-manifolds are obtained. Identities are obtained that are satisfied by the Ricci tensor of nearly trans-Sasakian manifolds. It is proved that a Ricci-flat almost $C(\lambda)$-manifold is locally equivalent to the product of a Ricci-flat Kähler manifold and a real line. Identities are obtained that are satisfied by the Ricci tensor of an almost $C(\lambda)$-manifold. It is proved that the Ricci curvature of an almost $C(\lambda)$-manifold in the direction of the structure vector is equal to zero if and only if it is cosymplectic, and hence locally equivalent to the product of a Kähler manifold and a real line. An identity is obtained that is satisfied by the Riemannian curvature tensor of a nearly trans-Sasakian manifold, which is an almost $C(\lambda)$-manifold. It is proved that for a nearly trans-Sasakian manifold M the following conditions are equivalent: 1) the manifold M is an almost $C(\lambda)$-manifold; 2) the manifold M is a closely cosymplectic manifold; 3) the manifold M is locally equivalent to the product of a nearly Kähler manifold and the real line. In the case when the manifold M is a trans-Sasakian almost $C(\lambda)$-manifold, the manifold M is cosymplectic, and hence locally equivalent to the product of a Kähler manifold and a real line. For an NTS-manifold of dimension greater than three, which is almost a $C(\lambda)$-manifold, the pointwise constancy of the $\Phi$-holomorphic sectional curvature implies global constancy. A complete classification of such manifolds is obtained.
Keywords: nearly trans-Sasakian manifold, almost $C(\lambda)$-manifold, Kenmotsu manifold, cosymplectic manifold, Sasakian manifold.
Received: 03.09.2023
Accepted: 21.12.2023
Document Type: Article
UDC: 514.76
Language: Russian
Citation: A. R. Rustanov, G. V. Teplyakova, S. V. Kharitonova, “Nearly trans-Sasakian almost $C(\lambda)$-manifolds”, Chebyshevskii Sb., 24:5 (2023), 153–166
Citation in format AMSBIB
\Bibitem{RusTepKha23}
\by A.~R.~Rustanov, G.~V.~Teplyakova, S.~V.~Kharitonova
\paper Nearly trans-Sasakian almost $C(\lambda)$-manifolds
\jour Chebyshevskii Sb.
\yr 2023
\vol 24
\issue 5
\pages 153--166
\mathnet{http://mi.mathnet.ru/cheb1379}
\crossref{https://doi.org/10.22405/2226-8383-2023-24-5-153-166}
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