Open Mathematics (Aug 2022)

Geometry of conformal η-Ricci solitons and conformal η-Ricci almost solitons on paracontact geometry

  • Li Yanlin,
  • Dey Santu,
  • Pahan Sampa,
  • Ali Akram

DOI
https://doi.org/10.1515/math-2022-0048
Journal volume & issue
Vol. 20, no. 1
pp. 574 – 589

Abstract

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We prove that if an η\eta -Einstein para-Kenmotsu manifold admits a conformal η\eta -Ricci soliton then it is Einstein. Next, we proved that a para-Kenmotsu metric as a conformal η\eta -Ricci soliton is Einstein if its potential vector field VV is infinitesimal paracontact transformation or collinear with the Reeb vector field. Furthermore, we prove that if a para-Kenmotsu manifold admits a gradient conformal η\eta -Ricci almost soliton and the Reeb vector field leaves the scalar curvature invariant then it is Einstein. We also construct an example of para-Kenmotsu manifold that admits conformal η\eta -Ricci soliton and satisfy our results. We also have studied conformal η\eta -Ricci soliton in three-dimensional para-cosymplectic manifolds.

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