The orbital counting problem for hyperconvex representations
Abstract
We give a precise counting result on the symmetric space of a noncompact real algebraic semisimple group G, for a class of discrete subgroups of G that contains, for example, representations of a surface group on PSL(2, R)×PSL(2, R), induced by choosing two points on the Teichm\"uller space of the surface; and representations on the Hitchin component of PSL(d, R). We also prove a mixing property for the Weyl chamber flow in this setting.
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