Killing Fields on Compact m-Quasi-Einstein Manifolds
Abstract
We show that given a compact, connected m-quasi Einstein manifold (M,g,X) without boundary, the potential vector field X is Killing if and only if (M, g) has constant scalar curvature. This extends a result of Bahuaud-Gunasekaran-Kunduri-Woolgar, where it is shown that X is Killing if X is incompressible. We also provide a sufficient condition for a compact, non-gradient m-quasi Einstein metric to admit a Killing field. We do this by following a technique of Dunajski and Lucietti, who prove that a Killing field always exists in this case when m=2. This condition provides an alternate proof of the aforementioned result of Bahuaud-Gunasekaran-Kunduri-Woolgar. This alternate proof works in the m = -2 case as well, which was not covered in the original proof.
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