Almost maximal volume entropy rigidity for integral Ricci curvature in the non-collapsing case

Abstract

In this note we will show the almost maximal volume entropy rigidity for manifolds with lower integral Ricci curvature bound in the non-collapsing case: Given n, d, p>n2, there exist δ(n, d, p), ε(n, d, p)>0, such that for δ<δ(n, d, p), ε<ε(n, d, p), if a compact n-manifold M satisfies that the integral Ricci curvature has lower bound k(-1, p)≤ δ, the diameter diam(M)≤ d and volume entropy h(M)≥ n-1-ε, then the universal cover of M is Gromov-Hausdorff close to a hyperbolic space form Hk, k≤ n; If in addition the volume of M, vol(M)≥ v>0, then M is diffeomorphic and Gromov-Hausdorff close to a hyperbolic manifold where δ, ε also depends on v.