Generalized Quasi-Einstein Metrics and Contact Geometry

Gour Gopal Biswas; Uday Chand De; Ahmet Yıldız

doi:10.5666/KMJ.2022.62.3.485

Article

Kyungpook Mathematical Journal 2022; 62(3): 485-495

Published online September 30, 2022

Generalized Quasi-Einstein Metrics and Contact Geometry

Gour Gopal Biswas, Uday Chand De^*, Ahmet Yıldız

Department of Mathematics, University of Kalyani, Kalyani-741235, West Bengal, India
e-mail : ggbiswas6@gmail.com

Department of Pure Mathematics, University of Calcutta, 35 Ballygaunge Circular Road, Kolkata -700019, West Bengal, India
e-mail : uc_de@yahoo.com

Education Faculty, Department of Mathematics, Inonu University, 44280, Malatya, Turkey
e-mail : a.yildiz@inonu.edu.tr

Received: February 15, 2021; Revised: January 30, 2022; Accepted: February 10, 2022

Abstract

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Abstract

The aim of this paper is to characterize K-contact and Sasakian manifolds whose metrics are generalized quasi-Einstein metric. It is proven that if the metric of a K-contact manifold is generalized quasi-Einstein metric, then the manifold is of constant scalar curvature and in the case of a Sasakian manifold the metric becomes Einstein under certain restriction on the potential function. Several corollaries have been provided. Finally, we consider Sasakian 3-manifold whose metric is generalized quasi-Einstein metric.

Keywords: GQE metrics, Almost contact manifolds, Contact manifolds, K-contact manifolds, Sasakian manifolds