$D_{a}$-Homothetic Deformation and Ricci Solitons in $(k, \mu)-$ Contact Metric Manifolds

Year 2019, Volume: 7 Issue: 1, 122 - 127, 15.04.2019

Nagaraja H. G. , Kiran Kumar D. L. , Prakasha D. G.

https://izlik.org/JA86DN46JG

Abstract

In this paper, we study $(k,\mu)$-contact metric manifold under $D_a$-homothetic deformation. It is proved that a $D_3$-homothetic deformed locally symmetric $(1, -4)$-contact metric manifold is a Sasakian manifold and the Ricci soliton is shrinking. Further, $\xi^*$-projectively flat and $h$-projectively semisymmetric $(k, \mu)$-contact metric manifolds under $D_a$-homothetic deformation are studied and obtained interesting results.

Keywords

$D_{a}$-homothetic deformation , Ricci solitons , projective curvature tensor , $D_{a}$-homothetic deformation , Ricci solitons , projective curvature tensor

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