2010
DOI: 10.1016/s0252-9602(10)60039-2
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Slant submanifolds of a Riemannian product manifold

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Cited by 15 publications
(19 citation statements)
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“…Similarly, for any Z ∈ Γ(T M ⊥ ), we can write that FZ = t ⊥ Z + n ⊥ Z where t ⊥ Z and n ⊥ Z are tangent and normal components of FZ , respectively. Now, we can investigate the theorem which characterize slant Riemannian manifolds (see [3] for Riemannian). 1] such that t 2 = µI.…”
Section: Slant Riemannian Submanifoldsmentioning
confidence: 99%
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“…Similarly, for any Z ∈ Γ(T M ⊥ ), we can write that FZ = t ⊥ Z + n ⊥ Z where t ⊥ Z and n ⊥ Z are tangent and normal components of FZ , respectively. Now, we can investigate the theorem which characterize slant Riemannian manifolds (see [3] for Riemannian). 1] such that t 2 = µI.…”
Section: Slant Riemannian Submanifoldsmentioning
confidence: 99%
“…1] such that t 2 = µI. If θ is slant angle of M , the equation is true for µ = cos 2 θ (see [3] for Riemannian).…”
Section: Slant Riemannian Submanifoldsmentioning
confidence: 99%
“…A slant submanifold that is neither an invariant nor antiinvariant submanifold is called a proper slant submanifold( [1]). …”
Section: Example 44 Define a Map π : R 4 → R 2 Bymentioning
confidence: 99%
“…Later, U. C. De et al [7] studied and characterized pseudo-slant submanifolds of trans Sasakian manifolds. Recently, in [1][2][3], Atçeken et al studied slant and pseudo-slant submanifold in various manifolds.…”
Section: Introductionmentioning
confidence: 99%