Hausdorff Dimension of Anosov Subgroups' Limit Sets with Special Self-Affine Complexity

Abstract

Let ⊂ PGL(d,R) be an irreducible projective Anosov subgroup and let 1() be its projective limit set. Viewing 1() as an analogue of a self-affine set, we investigate the Hausdorff dimension of 1() under specific assumptions regarding its affine complexity: 1. If 1() is of full Hausdorff dimension, then d= 2 and is a cocompact lattice. 2. If d = 3 and is the image of a closed surface group under an irreducible Anosov representation, then 1() never has Hausdorff dimension 1 unless the representation is Hitchin. 3. If the limit set 1() exhibits a partial quasi-self-similarity (in the sense of Falconer~falconerselfsimilar1) -- which can be implied by the ``regular distortion property'' of -- then the Hausdorff dimension of 1() equals the critical exponent of the first simple root. An application of this result is the computation of the Hausdorff dimension of the limit set for arbitrary -positive representations of convex cocompact Fuchsian groups.