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Volumes > Volume 3 > No. 2
 
   

A Study on Ricci Solitons in almost C(λ) Manifolds
PP: 83-88
doi:10.18576/sjm/030206        
Author(s)
S. R. Ashoka, C. S. Bagewadi, Gurupadavva Ingalahalli,
Abstract
We show that C(λ) manifold is cone if the Ricci Solitons (g,V,λ1), n3 is expanding and t -curvature tensor is zero where t is a generalized curvature tensor and consists of Riemannian, Conformal, quasi-conformal, Conharmonic, Concircular, Pseudoprojetive, Projective and M-Projective etc., curvature tensors. Also it is shown that Ricci Solitons of C(λ) manifolds are shrinking when C−Bochner curvature tensor is Zero.

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