Local singularities of compact multiply warped Ricci flow solutions
Abstract
We demonstrate that any four-dimensional shrinking Ricci soliton ( B × S2, g), where B is any two-dimensional complete noncompact surface and g is a warped product metric over the base B, has to be isometric to the generalized cylinder R2× S2 equipped with the standard cylindrical metric. After completing this classification, we study Ricci flow solutions that are multiply warped products -- but not products -- and provide rigorous examples of the formation of generalized cylinder singularity models Rk× S.
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