*-Conformal {\eta}-Ricci Soliton on Sasakian manifold

Soumendu Roy; Santu Dey; Arindam Bhattacharyya; Shyamal Kumar Hui

arXiv:1909.01318·math.DG·May 18, 2021

*-Conformal {\eta}-Ricci Soliton on Sasakian manifold

Soumendu Roy, Santu Dey, Arindam Bhattacharyya, Shyamal Kumar Hui

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TL;DR

This paper investigates *-Conformal {\

Contribution

It introduces new curvature conditions and characterizations of *-Conformal {\

Findings

01

Derived conditions for *-Conformal {\

02

Identified curvature properties related to Ricci solitons on Sasakian manifolds

03

Provided an explicit example of a 5-dimensional Sasakian manifold satisfying the conditions

Abstract

In this paper we study *-Conformal {\eta}-Ricci soliton on Sasakian manifolds. Here, we discuss some curvature properties on Sasakian manifold admitting *-Conformal {\eta}-Ricci soliton. We obtain some significant results on *-Conformal {\eta}-Ricci soliton in Sasakian manifolds satisfying R({\xi},X).S = 0, S({\xi},X).R = 0, {\overline}P({\xi},X).S = 0, where {\overline}P is Pseudo-projective curvature tensor.The conditions for *-Conformal {\eta}-Ricci soliton on {\Phi}-conharmonically flat and {\Phi}-projectively flat Sasakian manifolds have been obtained in this article. Lastly we give an example of 5-dimensional Sasakian manifolds satisfying *-Conformal {\eta}-Ricci soliton.

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