The limit cone and bounds on the growth indicator function

Abstract

Given a real semisimple Lie group G with finite center and a discrete subgroup ⊂ G whose limit cone is disjoint from two facets of the Weyl chamber we show that Quint's growth indicator function is bounded by the half sum of positive roots , i.e. it has slow growth, implying that the representation L2( G) is tempered. In particular, this holds for each I-Anosov subgroup provided that I contains at least two distinct simple roots that are not interchanged by the opposition involution.

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