On the rigidity of generalized m-quasi-Einstein manifolds of Yamabe-type

Abstract

Motivated by the concept of almost Yamabe solitons, a special class of generalized m-quasi-Einstein manifolds is investigated in this paper. We refer to these Riemannian manifolds as generalized m-quasi-Einstein manifolds of Yamabe-type. We study the rigidity properties for the potential (or defining) vector field associated to these manifolds in both the compact and non-compact settings. We show that under certain natural assumptions the potential vector field either vanishes identically or become a non-trivial Killing vector field.

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