Asymptotic properties of infinitesimal characters and applications

Abstract

Inspired by Benoist, we study objects linked to integrable tangent vectors on the character variety of a semi-group with values in a semi-simple real-algebraic group G. We prove the cone of Jordan variations has non-empty interior and, when G is split, establish non-empty interior of the set of length-normalized variations. We apply these techniques to pressure forms on Anosov representations and higher-rank Teichm\"uller spaces. We identify an explicit functional ∈ a* whose pressure form is compatible with Goldman's symplectic form at Fuchsian points in the Hitchin component. Finally, we show the degeneration of the Hausdorff dimension of higher-quasi-circles is governed by a Diophantine equation.