Geodesics of Sasakian Metrics on Tensor Bundles

Salimov, Arif; Gezer, Aydın; Akbulut, Kursat

doi:10.1007/s00009-009-0001-z

Cited by 31 publications

(30 citation statements)

References 7 publications

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“…For tensor bundles of type (p, q), see [18]. We now consider local 1-forms ω α in π −1 (U ) defined by…”

Section: Using (31) and (32) We Havementioning

confidence: 99%

“…The Sasaki metric on the cotangent bundle was studied by several authors, including Mok [14], Salimov and Agca [21]. In [3,11,17,18], the Sasaki metric was studied on the tensor bundles of different types (p, q) over differentiable manifolds. In [13], Mok studied the Sasaki metric on frame bundles and calculated its curvature tensor (for details, see [4]).…”

Section: Introductionmentioning

confidence: 99%

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On the geometry of the (1, 1)-tensor bundle with Sasaki type metric

Salimov

Gezer

2011

Chin. Ann. Math. Ser. B

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Curvature properties are studied for the Sasaki metric on the (1, 1) tensor bundle of a Riemannian manifold. As an application, examples of almost para-Nordenian and para-Kähler-Nordenian B-metrics are constructed on the (1, 1) tensor bundle by looking at the Sasaki metric. Also, with respect to the para-Nordenian B-structure, paraholomorphic conditions for the complete lifts of vector fields are analyzed.

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“…For tensor bundles of type (p, q), see [18]. We now consider local 1-forms ω α in π −1 (U ) defined by…”

Section: Using (31) and (32) We Havementioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

On the geometry of the (1, 1)-tensor bundle with Sasaki type metric

Salimov

Gezer

2011

Chin. Ann. Math. Ser. B

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“…Then the Lie algebra of Killing vectors on (M, g) and the Lie algebra of Killing vectors on (TM, g a,b ) are isomorphic, via the correspondence X → C X . (TM, g a,b ) An important geometric problem is to find the geodesics on the smooth manifolds with respect to the Riemannian metrics (see [21,[40][41][42][43][44]). In [21], Yano and Ishihara proved that the curves on the tangent bundles of Riemannian manifolds are geodesics with respect to certain lifts of the metric from the base manifold, if and only if the curves are obtained as certain types of lifts of the geodesics from the base manifold.…”

Section: Corollarymentioning

confidence: 99%

Some notes concerning Riemannian metrics of Cheeger Gromoll type

Gezer

Altunbaş

2012

Journal of Mathematical Analysis and Applications

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a b s t r a c tLet (M, g) be an n-dimensional Riemannian manifold and TM its tangent bundle. The purpose of the present paper is three-fold. Firstly, to study paraholomorphy property of two Riemannian metrics g a and g a,b of Cheeger Gromoll type depending on one parameter and two parameters by using compatible paracomplex structures J a and J a,b on the tangent bundle TM. Secondly, to classify Killing vector fields on the tangent bundle TM equipped with the Riemannian metric g a,b . Finally, to give a detailed description of geodesics on the tangent bundle TM with respect to the Riemannian metric g a,b .

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“…Sasakian metrics (diagonal lifts of metrics) on tangent bundles were also studied in [4,8,16]. In a more general case of tensor bundles of type (1, q), (0, q) and (p, q), Sasakian metrics and their geodesics are considered in [3,10,11]. Curvature properties for the Sasakian metric of the tangent bundle are given in [1,4,6,9,16].…”

Section: Introductionmentioning

confidence: 99%