Finite Diffeomorphism Theorem for manifolds with lower Ricci curvature and bounded energy
Abstract
In this paper we prove that the space (n,,D,):=\(Mn,g) closed : ~~ -(n-1),~(M) >0, (M) D and ∫M||n/2 \ has at most C(n,,D,) many diffeomorphism types. This removes the upper Ricci curvature bound of Anderson-Cheeger's finite diffeomorphism theorem in AnCh. Furthermore, if M is K\"ahler surface, the Riemann curvature L2 bound could be replaced by the scalar curvature L2 bound.
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