Ricci Flow and Gromov Almost Flat Manifolds
Abstract
We employ the Ricci flow to derive a new theorem about Gromov almost flat manifolds, which generalizes and strengthens the celebrated Gromov--Ruh Theorem. In our theorem, the condition diam2 |K| ≤ εn in the Gromov--Ruh Theorem is replaced by the substantially weaker condition \|Rm\|n/2 CS2 ≤ n.
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