Rigidity for Einstein Manifolds under Bounded Covering Geometry

Journal of Mathematical Study
Vol. 58 No. 2 (2025), pp. 145-163
DOI: 10.4208/jms.v58n2.25.02
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Author(s)
,
    Shicheng Xu
    Capital Normal Univ, Sch Math Sci, Beijing 100089, Peoples R China Capital Normal Univ, Acad Multidisciplinary Studies, Beijing 100089, Peoples R China
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1 Capital Normal Univ, Sch Math Sci, Beijing 100089, Peoples R China
2 Capital Normal Univ, Acad Multidisciplinary Studies, Beijing 100089, Peoples R China
Abstract

In this note, we prove three rigidity results for Einstein manifolds with bounded covering geometry. (1) An almost flat manifold $(M,g)$ must be flat if it is Einstein, i.e. ${\rm Ric}_g =λg$ for some real number $λ.$ (2) A compact Einstein manifold with a non-vanishing and almost maximal volume entropy is hyperbolic. (3) A compact Einstein manifold admitting a uniform local rewinding almost maximal volume is isometric to a space form.

Keywords
Einstein rigidity almost nonnegative Ricci curvature bounded covering geometry space forms.
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