Conformal product structures on compact Einstein manifolds

Abstract

In this note we generalize our previous result, stating that if (M1,g1) and (M2,g2) are compact Riemannian manifolds, then any Einstein metric on the product M:=M1× M2 of the form g=e2f1g1+e2f2g2, with f1∈ C∞(M2) and f2∈ C∞(M1× M2), is a warped product metric. Namely, we show that the same conclusion holds if we replace the assumption that the manifold M is globally the product of two compact manifolds by the weaker assumption that M is compact and carries a conformal product structure.

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