In this paper we investigate the Hausdorff dimension of limit sets of Anosov representations. In this context we revisit and extend the framework of hyperconvex representations and establish a convergence property for them, analogue to a differentiability property. As an application of this convergence, we prove that the Hausdorff dimension of the limit set of a hyperconvex representation is equal to a suitably chosen critical exponent. In the appendix, in collaboration with M. Bridgeman, we extend a classical result on the Hessian of the Hausdorff dimension on purely imaginary directions.
SEEK ID: https://publications.h-its.org/publications/966
Research Groups: Groups and Geometry
Publication type: Misc
Journal: arXiv,math.DG,1902.01303
Citation: arXiv,math.DG,1902.01303
Date Published: 2019
URL: https://arxiv.org/abs/1902.01303
Registered Mode: imported from a bibtex file
Views: 6215
Created: 30th Jan 2020 at 09:49
Last updated: 5th Mar 2024 at 21:24
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