Quantitative properties of convex representations
Abstract
Let be a discrete subgroup of PGL(d,) and fix some euclidean norm \|\ \| on d. Let N(t) be the number of elements in whose operator norm is ≤ t. In this article we prove an asymptotic for the growth of N(t) when t∞ for a class of 's which contains, in particular, Hitchin representations of surface groups and groups dividing a convex set of (d). We also prove analogue counting theorems for the growth of the spectral radii. More precise information is given for Hitchin representations.
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