Maximal bottom of spectrum or volume entropy rigidity in Alexandrov geometry

Abstract

In LiWang2001complete1,LiWang2001complete2, Li-Wang proved a splitting theorem for an n-dimensional Riemannian manifold with Ric≥slant -(n-1) and the bottom of spectrum λ0(M)=(n-1)24. For an n-dimensional compact manifold M with Ric≥slant-(n-1) with the volume entropy h(M)=n-1, Ledrappier-Wang LeW2010volent proved that the universal cover M is isometric to the hyperbolic space Hn. We will prove analogue theorems for Alexandrov spaces.