Entropy of Hilbert metrics and length spectrum of Hitchin representations in PSL(3,R)

Abstract

We prove a sharp inequality between the Blaschke and Hilbert distance on a proper convex domain: for any two points x and y, \[dB(x,y) < dH(x,y) +1.\] We obtain two interesting consequences: the first one is the volume entropy rigidity for Hilbert geometries : for any proper convex domain of RPn, the volume of a ball of radius R grows at most like e(n-1)R. The second consequence is the following fact: for any Hitchin representation of a surface group into PSL(3,R), there exists a Fuchsian representation j in PSL(2,R) such that the length spectrum of j is uniformly smaller than the length spectrum of .