Symmetry gaps in Riemannian geometry and minimal orbifolds

Abstract: Abstract. We study the size of the isometry group Isom(M, g) of Riemannian manifolds (M, g) as g varies. For M not admitting a circle action, we show that the order of Isom(M, g) can be universally bounded in terms of the bounds on Ricci curvature, diameter, and injectivity radius of M . This generalizes results known for negative Ricci curvature to all manifolds.More generally we establish a similar universal bound on the index of the deck group π1(M ) in the isometry group Isom( M , g) of the universal cover… Show more

“…From the works of Deng-Hou [11] and Zhong-Zhong [36], we know that a compact Finsler manifold with negative Ricci curvature has a finite isometry group. Van Limbeek [32] estimated the order of the isometry group for manifolds on which circle actions do not exist. The list above is far from complete and can go on and on.…”

The Measure Preserving Isometry Groups of Metric Measure Spaces

“…From the works of Deng-Hou [11] and Zhong-Zhong [36], we know that a compact Finsler manifold with negative Ricci curvature has a finite isometry group. Van Limbeek [32] estimated the order of the isometry group for manifolds on which circle actions do not exist. The list above is far from complete and can go on and on.…”

The Measure Preserving Isometry Groups of Metric Measure Spaces

“…However, as in many mathematical theories, the presence of symmetries may cause further rigidity. For example in geometry, if a closed manifold has non-positive curvature or is aspherical, non-discreteness of the isometry group of the universal covering of a compact manifold forces the metric to be locally symmetric [Ebe80,Ebe82,FW08,vL13,vL14].…”

On the work of Rodriguez Hertz on rigidity in dynamics

“…From the works of Deng-Hou [11] and Zhong-Zhong [37], we know that a compact Finsler manifold with negative Ricci curvature has a finite isometry group. Van Limbeek [31] estimated the order of isometry group for manifolds on which a circle action does not exist. The list above is far from complete and can go on and on.…”

The Measure Preserving Isometry Groups of Metric Measure Spaces