Almost-Schur lemma
Abstract
Schur's lemma states that every Einstein manifold of dimension n≥ 3 has constant scalar curvature. Here (M,g) is defined to be Einstein if its traceless Ricci tensor :=-Rng is identically zero. In this short note we ask to what extent the scalar curvature is constant if the traceless Ricci tensor is assumed to be small rather than identically zero.
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