Harmonic maps to Hadamard spaces and a universal higher Teichmüller space

Abstract

We give a sufficient criterion, which we call stability, for a coarse Lipschitz map f from a complete manifold X with Ricci curvature bounded below to a proper Hadamard space Y to be within bounded distance of a harmonic map. We prove uniqueness of the harmonic map under additional assumptions on X and Y. Using this criterion, we prove a significant generalization of the Schoen-Li-Wang conjecture on quasi-isometric embeddings between rank 1 symmetric spaces. In particular, under a natural generalization of the quasi-isometric condition, we remove the assumption that the target has rank 1. This allows us to define a universal Hitchin component for each PGLd(R), generalizing universal Teichmüller space, and show that it can be described both as a space of quasi-symmetric positive maps from RP1 to the flag variety, and as a space of harmonic maps.