Generalized m-quasi-Einstein manifolds of Yamabe-type have potential vector fields that vanish or are non-trivial Killing fields under natural assumptions in compact and non-compact settings.
On Generalized Quasi-Einstein Manifolds
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abstract
In this paper, we study generalized $m$-quasi-Einstein $(M^n,g,X,\lambda)$ under natural conditions on the potential vector field. We show that, under suitable integral assumptions, the potential vector field is Killing, extending earlier results of Sharma to the generalized setting. Moreover, we show that divergence-free vector fields are Killing in this context, and we derive consequences under sign conditions on $m$ and $\lambda$, including triviality results. We also revisit a recent theorem of Ghosh \cite{ghosh}, discuss a subtle issue in the argument, and provide a new formulation and proof. Finally, we establish rigidity results for manifolds with geodesic potential vector fields.
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math.DG 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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On the rigidity of generalized $m$-quasi-Einstein manifolds of Yamabe-type
Generalized m-quasi-Einstein manifolds of Yamabe-type have potential vector fields that vanish or are non-trivial Killing fields under natural assumptions in compact and non-compact settings.