Miles Simon: Expanding solutions with non-negative curvature operator coming out of cones
Monday, 30.05.2011 16:00 im Raum SR 4
We show that a Ricci flow of any complete Riemannian manifold without
boundary with bounded non-negative curvature operator and non-zero
asymptotic volume ratio exists for all time and has constant asymptotic volume ratio.
We show that there is a limit solution, obtained by scaling down this
solution at a fixed point in space, which is an expanding soliton coming
out of the asymptotic cone at infinity.
Angelegt am Wednesday, 18.05.2011 09:02 von Sandra Huppert
Geändert am Wednesday, 18.05.2011 09:02 von Sandra Huppert
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