An example of non-embeddability of the Ricci flow
Abstract
For an evolution of metrics (M,gt) there is a t-smooth family of embeddings et:MN inducing gt, but in general there is no family of embeddings extending a given initial embedding e0. We give an example of this phenomenon when gt is the evolution of g0 under the Ricci flow. We show that there are embeddings e0 inducing g0 which do not admit of t-smooth extensions to et inducing gt for any t>0. We also find hypersurfaces of dim>2 that will not remain a hypersurface under Ricci flow for any positive time.
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