On non-compact quasi-Einstein manifolds

Date/heure
1 avril 2019
14:00 - 15:00

Oratrice ou orateur
Marcos Ranieri

Catégorie d'évènement
Séminaire de géométrie différentielle


Résumé

In this talk, we will show some results about quasi-Einstein manifolds. Quasi-Einstein manifolds can be characterized as bases of Einstein warped products. On the first part, we investigated the infinity structure of a complete non-compact quasi-Einstein manifolds. In particular, we show that if M is a base of a Ricci-flat warped product then M is connected at infinity. When M is the basis of an Einstein warped product with Einstein constant λ < 0, there are examples with more than one end. In this case, we show that M is non-parabolic and, on a given hypothesis about scalar curvature, M has only one end f-non-parabolic. In addition, we obtain two estimates for the volume of the geodesic balls of M. On the second part, we will show that Bach-flat non-compact quasi-Einstein manifolds with λ = 0 and positive Ricci curvature are isometric to a rotationally symmetric metric whose fiber is a Einstein manifold.

This is joint work with R. Batista and E. Ribeiro Jr.